2021-08-18 15:44:03 +02:00
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{
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"cells": [
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2021-08-18 16:08:25 +02:00
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{
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"cell_type": "markdown",
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"metadata": {},
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"source": [
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"# Theory\n",
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"Let $C : y^m = f(x)$. Then:\n",
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"\n",
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" - the basis of $H^0(C, \\Omega_{C/k})$ is given by:\n",
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" $$x^{i-1} dx/y^j,$$\n",
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" where $1 \\le i \\le r-1$, $1 \\le j \\le m-1$, $-mi + rj \\ge \\delta$ and $\\delta := GCD(m, r)$, $r := \\deg f$.\n",
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" \n",
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" - "
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]
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},
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{
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"cell_type": "code",
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2021-08-18 20:37:06 +02:00
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"execution_count": 3,
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2021-08-18 16:08:25 +02:00
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"metadata": {},
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"outputs": [],
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"source": [
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"# The program computes the basis of holomorphic differentials of y^m = f(x) in char p.\n",
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"# The coefficient j means that we compute the j-th eigenpart, i.e.\n",
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"# forms y^j * f(x) dx. Output is [f(x), 0]\n",
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"\n",
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"def baza_holo(m, f, j, p):\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" f = R(f)\n",
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" r = f.degree()\n",
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" delta = GCD(m, r)\n",
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" baza = {}\n",
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" k = 0\n",
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" for i in range(1, r):\n",
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" if (r*j - m*i >= delta):\n",
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" baza[k] = [x^(i-1), R(0)]\n",
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" k = k+1\n",
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" return baza"
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]
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},
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{
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"cell_type": "code",
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2021-08-18 20:37:06 +02:00
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"execution_count": 4,
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2021-08-18 16:08:25 +02:00
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"metadata": {},
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"outputs": [],
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"source": [
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"# The program computes the basis of de Rham cohomology of y^m = f(x) in char p.\n",
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"# We treat them as pairs [omega, f], where omega is regular on the affine part\n",
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"# and omega - df is regular on the second atlas.\n",
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"# The coefficient j means that we compute the j-th eigenpart, i.e.\n",
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"# [y^j * f(x) dx, g(x)/y^j]. Output is [f(x), g(x)]\n",
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"\n",
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"def baza_dr(m, f, j, p):\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" f = R(f) \n",
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" r = f.degree()\n",
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" delta = GCD(m, r)\n",
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" baza = {}\n",
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" holo = baza_holo(m, f, j, p)\n",
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" for k in range(0, len(holo)):\n",
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" baza[k] = holo[k]\n",
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" \n",
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" k = len(baza)\n",
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" \n",
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" for i in range(1, r):\n",
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" if (r*(m-j) - m*i >= delta):\n",
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" s = R(m-j)*R(x)*R(f.derivative()) - R(m)*R(i)*f\n",
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" psi = R(obciecie(s, i, p))\n",
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" baza[k] = [psi, R(m)/x^i]\n",
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" k = k+1\n",
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" return baza"
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]
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},
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{
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"cell_type": "code",
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2021-08-18 21:16:08 +02:00
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"execution_count": 155,
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2021-08-18 16:08:25 +02:00
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"metadata": {},
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"outputs": [],
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"source": [
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"#auxiliary programs\n",
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"def stopnie_bazy_holo(m, f, j, p):\n",
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" baza = baza_holo(m, f, j, p)\n",
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" stopnie = {}\n",
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" for k in range(0, len(baza)):\n",
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" stopnie[k] = baza[k][0].degree()\n",
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" return stopnie\n",
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"\n",
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"def stopnie_bazy_dr(m, f, j, p):\n",
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" baza = baza_dr(m, f, j, p)\n",
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" stopnie = {}\n",
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" for k in range(0, len(baza)):\n",
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" stopnie[k] = baza[k][0].degree()\n",
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" return stopnie\n",
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"\n",
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"def stopnie_drugiej_wspolrzednej_bazy_dr(m, f, j, p):\n",
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" baza = baza_dr(m, f, j, p)\n",
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" stopnie = {}\n",
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" for k in range(0, len(baza)):\n",
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" if baza[k][1] != 0:\n",
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" stopnie[k] = baza[k][1].denominator().degree()\n",
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" return stopnie\n",
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"\n",
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"def obciecie(f, i, p):\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" f = R(f)\n",
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" coeff = f.coefficients(sparse = false)\n",
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" return sum(x^(j-i-1) * coeff[j] for j in range(i+1, f.degree() + 1))\n",
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"\n",
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"\n",
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"#Any element [f dx, g] is represented as a combination of the basis vectors.\n",
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"\n",
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"def zapis_w_bazie_dr(elt, m, f, j, p):\n",
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2021-08-18 21:16:08 +02:00
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" #print(elt)\n",
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2021-08-18 16:08:25 +02:00
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" R.<x> = PolynomialRing(GF(p))\n",
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2021-08-18 21:16:08 +02:00
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" RR = FractionField(R)\n",
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2021-08-18 20:37:06 +02:00
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" f = R(f)\n",
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2021-08-18 16:08:25 +02:00
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" r = f.degree()\n",
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" delta = GCD(m, r)\n",
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" baza = baza_dr(m, f, j, p)\n",
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" wymiar = len(baza)\n",
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" zapis = vector([GF(p)(0) for i in baza])\n",
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" stopnie = stopnie_bazy_dr(m, f, j, p)\n",
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" inv_stopnie = {v: k for k, v in stopnie.items()}\n",
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" stopnie_holo = stopnie_bazy_holo(m, f, j, p)\n",
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" inv_stopnie_holo = {v: k for k, v in stopnie_holo.items()} \n",
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" \n",
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" ## zmiana\n",
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" if elt[0]== 0 and elt[1] == 0:\n",
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2021-08-18 20:37:06 +02:00
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" print('p1')\n",
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2021-08-18 16:08:25 +02:00
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" return zapis\n",
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" \n",
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" if elt[1] == 0:\n",
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2021-08-18 20:37:06 +02:00
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" print('p2')\n",
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" elt[0] = R(elt[0])\n",
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2021-08-18 16:08:25 +02:00
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" d = elt[0].degree()\n",
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" a = elt[0].coefficients(sparse = false)[d]\n",
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" k = inv_stopnie_holo[d] #ktory element bazy jest stopnia d? ten o indeksie k\n",
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" \n",
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" a1 = baza[k][0].coefficients(sparse = false)[d]\n",
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" elt1 = [R(0),R(0)]\n",
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" elt1[0] = elt[0] - a/a1 * baza[k][0]\n",
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" elt1[1] = R(0)\n",
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" return zapis_w_bazie_dr(elt1, m, f, j, p) + vector([a/a1*GF(p)(i == k) for i in range(0, len(baza))])\n",
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"\n",
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" g = elt[1]\n",
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" g1 = R(elt[1].numerator())\n",
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" g2 = R(elt[1].denominator())\n",
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" d1 = g1.degree()\n",
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" d2 = g2.degree()\n",
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" a1 = g1.coefficients(sparse = false)[d1]\n",
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" a2 = g2.coefficients(sparse = false)[d2]\n",
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" a = a1/a2\n",
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" d = d2 - d1\n",
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2021-08-18 21:16:08 +02:00
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" Rr = r/delta\n",
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" M = m/delta\n",
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"\n",
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" stopnie2 = stopnie_drugiej_wspolrzednej_bazy_dr(m, f, j, p)\n",
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" inv_stopnie2 = {v: k for k, v in stopnie2.items()} \n",
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2021-08-18 16:08:25 +02:00
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" \n",
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2021-08-18 21:16:08 +02:00
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" if (d not in inv_stopnie2):\n",
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2021-08-18 20:37:06 +02:00
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" print('p3')\n",
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2021-08-18 21:16:08 +02:00
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" if d>= 0:\n",
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" elt1 = [elt[0], RR(elt[1]) - a1/a2*1/R(x^d)]\n",
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" else:\n",
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" elt1 = [elt[0], RR(elt[1]) - a1/a2*R(x^(-d))]\n",
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2021-08-18 16:08:25 +02:00
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" return zapis_w_bazie_dr(elt1, m, f, j, p)\n",
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" \n",
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2021-08-18 20:37:06 +02:00
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" print('p4')\n",
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2021-08-18 16:08:25 +02:00
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" k = inv_stopnie2[d]\n",
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" elt1 = [R(0), R(0)]\n",
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" elt1[0] = elt[0] - a*baza[k][0]\n",
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" elt1[1] = elt[1] - a*baza[k][1]\n",
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" return zapis_w_bazie_dr(elt1, m, f, j, p) + vector([a*GF(p)(i == k) for i in range(0, len(baza))])\n",
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" \n",
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" \n",
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"def zapis_w_bazie_holo(elt, m, f, j, p):\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" f = R(f) \n",
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" r = f.degree()\n",
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" delta = GCD(m, r)\n",
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" baza = baza_holo(m, f, j, p)\n",
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" wymiar = len(baza)\n",
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" zapis = vector([GF(p)(0) for i in baza])\n",
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" stopnie = stopnie_bazy_holo(m, f, j, p)\n",
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" inv_stopnie = {v: k for k, v in stopnie.items()}\n",
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" \n",
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" if elt[0] == 0:\n",
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" return zapis\n",
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" \n",
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" d = elt[0].degree()\n",
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" a = elt[0].coefficients(sparse = false)[d]\n",
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" \n",
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" k = inv_stopnie[d] #ktory element bazy jest stopnia d? ten o indeksie k\n",
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" \n",
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" a1 = baza[k][0].coefficients(sparse = false)[d]\n",
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" elt1 = [R(0),R(0)]\n",
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" elt1[0] = elt[0] - a/a1 * baza[k][0]\n",
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" \n",
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" return zapis_w_bazie_holo(elt1, m, f, j, p) + vector([a/a1 * GF(p)(i == k) for i in range(0, len(baza))])\n"
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]
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},
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2021-08-18 20:37:06 +02:00
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{
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"cell_type": "markdown",
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"metadata": {},
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"source": [
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"We have: $V(\\omega, f) = (C(\\omega), 0)$ and $F(\\omega, f) = (0, f^p)$, where C denotes the Cartier operator. Moreover:\n",
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"\n",
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"let $t = multord_m(p)$, $M := (p^t - 1)/m$. Then: $y^{p^t - 1} = f(x)^M$ and $1/y = f(x)^M/y^{p^t}$. Thus:\n",
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"\n",
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"\n",
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"$$ C(P(x) \\, dx / y^j) = C(P(x) \\, f(x)^{M \\cdot j} \\, dx /y^{p^t \\cdot j}) = \\frac{1}{y^{p^{t - 1} \\cdot j}} C(P(x) \\, f(x)^{M \\cdot j} \\, dx) = \\frac{1}{y^{(p^{t - 1} \\cdot j) \\, mod \\, m}} \\cdot \\frac{1}{f(x)^{[p^{t - 1} \\cdot j/m]}} \\cdot C(P(x) \\, f(x)^{M \\cdot j} \\, dx)$$\n"
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]
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},
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{
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"cell_type": "code",
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2021-08-18 21:16:08 +02:00
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"execution_count": 156,
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2021-08-18 20:37:06 +02:00
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"metadata": {},
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"outputs": [],
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"source": [
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"def czesc_wielomianu(p, h):\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" h = R(h)\n",
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" wynik = R(0)\n",
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" for i in range(0, h.degree()+1):\n",
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" if (i%p) == p-1:\n",
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" potega = Integer((i-(p-1))/p)\n",
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" wynik = wynik + Integer(h[i]) * x^(potega) \n",
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" return wynik\n",
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"\n",
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"def cartier_dr(p, m, f, elt, j): #Cartier na y^m = f dla elt = [forma rozniczkowa, fkcja]\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" f = R(f)\n",
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" r = f.degree()\n",
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" delta = GCD(m, r)\n",
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" rzad = Integers(m)(p).multiplicative_order()\n",
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" M = Integer((p^(rzad)-1)/m)\n",
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" W = R(elt[0])\n",
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" h = R(W*f^(M*j))\n",
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" B = floor(p^(rzad-1)*j/m)\n",
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" g = czesc_wielomianu(p, h)/f^B\n",
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" jj = (p^(rzad-1)*j)%m\n",
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" #jj = Integers(m)(j/p)\n",
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" return [g, 0] #jest to w czesci indeksowanej jj\n",
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"\n",
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"def macierz_cartier_dr(p, m, f, j):\n",
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" baza = baza_dr(m, f, j, p)\n",
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" A = matrix(GF(p), len(baza), len(baza))\n",
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" for k in range(0, len(baza)):\n",
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" cart = cartier_dr(p, m, f, baza[k], j)\n",
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" v = zapis_w_bazie_dr(cart, m, f, j, p)\n",
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" A[k, :] = matrix(v)\n",
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" return A.transpose()"
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]
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},
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{
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"cell_type": "markdown",
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"metadata": {},
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"source": [
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"$F((\\omega, P(x) \\cdot y^j)) = (0, P(x)^p \\cdot y^{p \\cdot j}) = (0, P(x)^p \\cdot f(x)^{[p \\cdot j/m]} \\cdot y^{(p \\cdot j) \\, mod \\, m})$"
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]
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},
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{
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"cell_type": "code",
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2021-08-18 21:16:08 +02:00
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"execution_count": 157,
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2021-08-18 20:37:06 +02:00
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"metadata": {},
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"outputs": [],
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"source": [
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"def frobenius_dr(p, m, f, elt, j): #Cartier na y^m = f dla elt = [forma rozniczkowa, fkcja]\n",
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" R.<x> = PolynomialRing(GF(p))\n",
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" RR = FractionField(R)\n",
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" f = R(f)\n",
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" M = floor(j*p/m)\n",
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" return [0, f^M * RR(elt[1])^p] #eigenspace = j*p mod m\n",
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"\n",
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|
"def macierz_frob_dr(p, m, f, j):\n",
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" baza = baza_dr(m, f, j, p)\n",
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" A = matrix(GF(p), len(baza), len(baza))\n",
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" for k in range(0, len(baza)):\n",
|
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|
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" frob = frobenius_dr(p, m, f, baza[k], j)\n",
|
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" v = zapis_w_bazie_dr(frob, m, f, j, p)\n",
|
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" A[k, :] = matrix(v)\n",
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" return A.transpose()"
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]
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},
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{
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"cell_type": "code",
|
2021-08-18 21:16:08 +02:00
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"execution_count": 158,
|
2021-08-18 20:37:06 +02:00
|
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"metadata": {},
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"outputs": [
|
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{
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"data": {
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"text/plain": [
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|
"{0: [1, 0], 1: [x, 2/x]}"
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]
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},
|
2021-08-18 21:16:08 +02:00
|
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"execution_count": 158,
|
2021-08-18 20:37:06 +02:00
|
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"metadata": {},
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"output_type": "execute_result"
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}
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],
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"source": [
|
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|
|
"m = 2\n",
|
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|
|
"j = 1\n",
|
|
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|
|
"p = 5\n",
|
|
|
|
|
"f = x^3 + x+3\n",
|
|
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|
|
"baza_dr(m, f, j, p)\n",
|
|
|
|
|
"#macierz_frob_dr(p, m, f, j)"
|
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|
|
]
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|
},
|
|
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|
|
{
|
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|
|
"cell_type": "code",
|
2021-08-18 21:16:08 +02:00
|
|
|
"execution_count": 159,
|
2021-08-18 20:37:06 +02:00
|
|
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"metadata": {},
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"outputs": [
|
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{
|
|
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"data": {
|
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"text/plain": [
|
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|
|
"[0, (2*x^6 + 4*x^4 + 2*x^3 + 2*x^2 + 2*x + 3)/x^5]"
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|
]
|
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|
|
|
},
|
2021-08-18 21:16:08 +02:00
|
|
|
"execution_count": 159,
|
2021-08-18 20:37:06 +02:00
|
|
|
"metadata": {},
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"output_type": "execute_result"
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|
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}
|
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|
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],
|
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|
|
"source": [
|
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|
|
"frobenius_dr(p, m, f, [x, 2/x], j)"
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]
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},
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{
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"cell_type": "code",
|
2021-08-18 21:16:08 +02:00
|
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"execution_count": 160,
|
2021-08-18 20:37:06 +02:00
|
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"metadata": {},
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"outputs": [
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{
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"name": "stdout",
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"output_type": "stream",
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"text": [
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2021-08-18 21:16:08 +02:00
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|
|
|
|
|
"p4\n",
|
|
|
|
|
"p4\n",
|
|
|
|
|
"p4\n",
|
2021-08-18 20:37:06 +02:00
|
|
|
"p4\n"
|
|
|
|
|
]
|
|
|
|
|
},
|
|
|
|
|
{
|
2021-08-18 21:16:08 +02:00
|
|
|
"ename": "RecursionError",
|
|
|
|
|
"evalue": "maximum recursion depth exceeded while calling a Python object",
|
2021-08-18 20:37:06 +02:00
|
|
|
"output_type": "error",
|
|
|
|
|
"traceback": [
|
|
|
|
|
"\u001b[0;31m---------------------------------------------------------------------------\u001b[0m",
|
2021-08-18 21:16:08 +02:00
|
|
|
"\u001b[0;31mRecursionError\u001b[0m Traceback (most recent call last)",
|
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|
|
|
"\u001b[0;32m<ipython-input-160-b5994066838e>\u001b[0m in \u001b[0;36m<module>\u001b[0;34m()\u001b[0m\n\u001b[0;32m----> 1\u001b[0;31m \u001b[0mzapis_w_bazie_dr\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0;34m(\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m2\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m6\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m4\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m4\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m2\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m3\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m2\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m2\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m2\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mx\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m3\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m/\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m5\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mm\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mf\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mj\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m",
|
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|
"\u001b[0;32m<ipython-input-155-baa93df16142>\u001b[0m in \u001b[0;36mzapis_w_bazie_dr\u001b[0;34m(elt, m, f, j, p)\u001b[0m\n\u001b[1;32m 85\u001b[0m \u001b[0;32melse\u001b[0m\u001b[0;34m:\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 86\u001b[0m \u001b[0melt1\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0;34m[\u001b[0m\u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mRR\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m-\u001b[0m \u001b[0ma1\u001b[0m\u001b[0;34m/\u001b[0m\u001b[0ma2\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mR\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mx\u001b[0m\u001b[0;34m**\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m-\u001b[0m\u001b[0md\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 87\u001b[0;31m \u001b[0;32mreturn\u001b[0m \u001b[0mzapis_w_bazie_dr\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0melt1\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mm\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mf\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mj\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 88\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 89\u001b[0m \u001b[0mprint\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m'p4'\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n",
|
|
|
|
|
"\u001b[0;32m<ipython-input-155-baa93df16142>\u001b[0m in \u001b[0;36mzapis_w_bazie_dr\u001b[0;34m(elt, m, f, j, p)\u001b[0m\n\u001b[1;32m 92\u001b[0m \u001b[0melt1\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m-\u001b[0m \u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mk\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 93\u001b[0m \u001b[0melt1\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m-\u001b[0m \u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mk\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 94\u001b[0;31m \u001b[0;32mreturn\u001b[0m \u001b[0mzapis_w_bazie_dr\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0melt1\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mm\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mf\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mj\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mvector\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mGF\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mi\u001b[0m \u001b[0;34m==\u001b[0m \u001b[0mk\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;32mfor\u001b[0m \u001b[0mi\u001b[0m \u001b[0;32min\u001b[0m \u001b[0mrange\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mlen\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 95\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 96\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n",
|
|
|
|
|
"... last 1 frames repeated, from the frame below ...\n",
|
|
|
|
|
"\u001b[0;32m<ipython-input-155-baa93df16142>\u001b[0m in \u001b[0;36mzapis_w_bazie_dr\u001b[0;34m(elt, m, f, j, p)\u001b[0m\n\u001b[1;32m 92\u001b[0m \u001b[0melt1\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m-\u001b[0m \u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mk\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 93\u001b[0m \u001b[0melt1\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m=\u001b[0m \u001b[0melt\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m \u001b[0;34m-\u001b[0m \u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mk\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m1\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0;32m---> 94\u001b[0;31m \u001b[0;32mreturn\u001b[0m \u001b[0mzapis_w_bazie_dr\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0melt1\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mm\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mf\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mj\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;34m+\u001b[0m \u001b[0mvector\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;34m[\u001b[0m\u001b[0ma\u001b[0m\u001b[0;34m*\u001b[0m\u001b[0mGF\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mp\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mi\u001b[0m \u001b[0;34m==\u001b[0m \u001b[0mk\u001b[0m\u001b[0;34m)\u001b[0m \u001b[0;32mfor\u001b[0m \u001b[0mi\u001b[0m \u001b[0;32min\u001b[0m \u001b[0mrange\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mInteger\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0;36m0\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m,\u001b[0m \u001b[0mlen\u001b[0m\u001b[0;34m(\u001b[0m\u001b[0mbaza\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m]\u001b[0m\u001b[0;34m)\u001b[0m\u001b[0;34m\u001b[0m\u001b[0;34m\u001b[0m\u001b[0m\n\u001b[0m\u001b[1;32m 95\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n\u001b[1;32m 96\u001b[0m \u001b[0;34m\u001b[0m\u001b[0m\n",
|
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"\u001b[0;31mRecursionError\u001b[0m: maximum recursion depth exceeded while calling a Python object"
|
2021-08-18 20:37:06 +02:00
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]
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|
}
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],
|
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|
"source": [
|
|
|
|
|
"zapis_w_bazie_dr([0, (2*x^6 + 4*x^4 + 2*x^3 + 2*x^2 + 2*x + 3)/x^5], m, f, j, p)"
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]
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},
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|
{
|
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|
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|
"cell_type": "code",
|
2021-08-18 21:16:08 +02:00
|
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|
"execution_count": 106,
|
2021-08-18 20:37:06 +02:00
|
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"metadata": {},
|
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"outputs": [
|
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|
{
|
|
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"data": {
|
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|
"text/plain": [
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"4*x^4 + 4*x^3 + 4*x^2 + 4*x + 4"
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]
|
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|
|
|
},
|
2021-08-18 21:16:08 +02:00
|
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"execution_count": 106,
|
2021-08-18 20:37:06 +02:00
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"metadata": {},
|
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"output_type": "execute_result"
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}
|
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|
],
|
|
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"source": [
|
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|
|
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"h = sum(i*x^i for i in range(0, p^2))\n",
|
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"czesc_wielomianu(p, h)"
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]
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},
|
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|
|
{
|
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|
"cell_type": "code",
|
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"execution_count": 60,
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"metadata": {},
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"outputs": [
|
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|
{
|
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"data": {
|
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"text/plain": [
|
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|
"{0: [x^2, 0], 1: [x, 0], 2: [1, 0]}"
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]
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},
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"execution_count": 60,
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"metadata": {},
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"output_type": "execute_result"
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}
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],
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"source": [
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"m = 5\n",
|
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|
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"j = 1\n",
|
|
|
|
|
"p = 5\n",
|
|
|
|
|
"f = x^4 + x+2\n",
|
|
|
|
|
"baza_dr(m, f, j, p)"
|
|
|
|
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]
|
|
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|
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},
|
2021-08-18 16:08:25 +02:00
|
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{
|
|
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|
"cell_type": "code",
|
2021-08-18 20:37:06 +02:00
|
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|
"execution_count": 61,
|
2021-08-18 16:08:25 +02:00
|
|
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"metadata": {},
|
|
|
|
|
"outputs": [
|
|
|
|
|
{
|
|
|
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|
"data": {
|
|
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|
"text/plain": [
|
2021-08-18 20:37:06 +02:00
|
|
|
"[0 0 0]\n",
|
|
|
|
|
"[0 0 0]\n",
|
|
|
|
|
"[0 0 0]"
|
2021-08-18 16:08:25 +02:00
|
|
|
]
|
|
|
|
|
},
|
2021-08-18 20:37:06 +02:00
|
|
|
"execution_count": 61,
|
2021-08-18 16:08:25 +02:00
|
|
|
"metadata": {},
|
|
|
|
|
"output_type": "execute_result"
|
|
|
|
|
}
|
|
|
|
|
],
|
|
|
|
|
"source": [
|
2021-08-18 20:37:06 +02:00
|
|
|
"macierz_frob_dr(p, m, f, j)"
|
2021-08-18 16:08:25 +02:00
|
|
|
]
|
|
|
|
|
},
|
2021-08-18 15:44:03 +02:00
|
|
|
{
|
|
|
|
|
"cell_type": "code",
|
|
|
|
|
"execution_count": null,
|
|
|
|
|
"metadata": {},
|
|
|
|
|
"outputs": [],
|
|
|
|
|
"source": []
|
|
|
|
|
}
|
|
|
|
|
],
|
|
|
|
|
"metadata": {
|
|
|
|
|
"kernelspec": {
|
|
|
|
|
"display_name": "SageMath 9.1",
|
|
|
|
|
"language": "sage",
|
|
|
|
|
"name": "sagemath"
|
|
|
|
|
},
|
|
|
|
|
"language_info": {
|
|
|
|
|
"codemirror_mode": {
|
|
|
|
|
"name": "ipython",
|
|
|
|
|
"version": 3
|
|
|
|
|
},
|
|
|
|
|
"file_extension": ".py",
|
|
|
|
|
"mimetype": "text/x-python",
|
|
|
|
|
"name": "python",
|
|
|
|
|
"nbconvert_exporter": "python",
|
|
|
|
|
"pygments_lexer": "ipython3",
|
|
|
|
|
"version": "3.7.3"
|
|
|
|
|
}
|
|
|
|
|
},
|
|
|
|
|
"nbformat": 4,
|
|
|
|
|
"nbformat_minor": 2
|
|
|
|
|
}
|
