161 lines
4.3 KiB
Python
161 lines
4.3 KiB
Python
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"""
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The Schur number S(k) is the largest integer n for which the interval [1,n]
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can be partitioned into k sum-free sets.(https://mathworld.wolfram.com/SchurNumber.html)
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"""
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import math
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from sympy.core import S
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from sympy.core.basic import Basic
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from sympy.core.function import Function
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from sympy.core.numbers import Integer
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class SchurNumber(Function):
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r"""
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This function creates a SchurNumber object
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which is evaluated for `k \le 5` otherwise only
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the lower bound information can be retrieved.
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Examples
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========
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>>> from sympy.combinatorics.schur_number import SchurNumber
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Since S(3) = 13, hence the output is a number
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>>> SchurNumber(3)
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13
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We do not know the Schur number for values greater than 5, hence
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only the object is returned
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>>> SchurNumber(6)
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SchurNumber(6)
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Now, the lower bound information can be retrieved using lower_bound()
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method
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>>> SchurNumber(6).lower_bound()
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536
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"""
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@classmethod
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def eval(cls, k):
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if k.is_Number:
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if k is S.Infinity:
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return S.Infinity
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if k.is_zero:
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return S.Zero
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if not k.is_integer or k.is_negative:
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raise ValueError("k should be a positive integer")
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first_known_schur_numbers = {1: 1, 2: 4, 3: 13, 4: 44, 5: 160}
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if k <= 5:
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return Integer(first_known_schur_numbers[k])
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def lower_bound(self):
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f_ = self.args[0]
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# Improved lower bounds known for S(6) and S(7)
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if f_ == 6:
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return Integer(536)
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if f_ == 7:
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return Integer(1680)
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# For other cases, use general expression
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if f_.is_Integer:
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return 3*self.func(f_ - 1).lower_bound() - 1
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return (3**f_ - 1)/2
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def _schur_subsets_number(n):
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if n is S.Infinity:
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raise ValueError("Input must be finite")
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if n <= 0:
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raise ValueError("n must be a non-zero positive integer.")
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elif n <= 3:
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min_k = 1
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else:
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min_k = math.ceil(math.log(2*n + 1, 3))
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return Integer(min_k)
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def schur_partition(n):
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"""
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This function returns the partition in the minimum number of sum-free subsets
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according to the lower bound given by the Schur Number.
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Parameters
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==========
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n: a number
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n is the upper limit of the range [1, n] for which we need to find and
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return the minimum number of free subsets according to the lower bound
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of schur number
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Returns
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=======
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List of lists
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List of the minimum number of sum-free subsets
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Notes
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=====
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It is possible for some n to make the partition into less
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subsets since the only known Schur numbers are:
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S(1) = 1, S(2) = 4, S(3) = 13, S(4) = 44.
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e.g for n = 44 the lower bound from the function above is 5 subsets but it has been proven
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that can be done with 4 subsets.
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Examples
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========
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For n = 1, 2, 3 the answer is the set itself
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>>> from sympy.combinatorics.schur_number import schur_partition
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>>> schur_partition(2)
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[[1, 2]]
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For n > 3, the answer is the minimum number of sum-free subsets:
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>>> schur_partition(5)
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[[3, 2], [5], [1, 4]]
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>>> schur_partition(8)
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[[3, 2], [6, 5, 8], [1, 4, 7]]
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"""
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if isinstance(n, Basic) and not n.is_Number:
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raise ValueError("Input value must be a number")
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number_of_subsets = _schur_subsets_number(n)
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if n == 1:
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sum_free_subsets = [[1]]
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elif n == 2:
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sum_free_subsets = [[1, 2]]
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elif n == 3:
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sum_free_subsets = [[1, 2, 3]]
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else:
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sum_free_subsets = [[1, 4], [2, 3]]
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while len(sum_free_subsets) < number_of_subsets:
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sum_free_subsets = _generate_next_list(sum_free_subsets, n)
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missed_elements = [3*k + 1 for k in range(len(sum_free_subsets), (n-1)//3 + 1)]
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sum_free_subsets[-1] += missed_elements
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return sum_free_subsets
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def _generate_next_list(current_list, n):
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new_list = []
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for item in current_list:
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temp_1 = [number*3 for number in item if number*3 <= n]
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temp_2 = [number*3 - 1 for number in item if number*3 - 1 <= n]
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new_item = temp_1 + temp_2
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new_list.append(new_item)
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last_list = [3*k + 1 for k in range(len(current_list)+1) if 3*k + 1 <= n]
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new_list.append(last_list)
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current_list = new_list
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return current_list
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