############################################################################### # # Constraints # ############################################################################### function constraints(pm::Matrix{I}, total_length=maximum(pm)) where {I<:Integer} cnstrs = [Vector{I}() for _ in 1:total_length] for i in eachindex(pm) push!(cnstrs[pm[i]], i) end return cnstrs end function orbit_constraint!(result::SparseMatrixCSC, cnstrs, orbit; val=1.0/length(orbit)) result .= zero(eltype(result)) dropzeros!(result) for constraint in cnstrs[orbit] for idx in constraint result[idx] = val end end return result end function orbit_spvector(vect::AbstractVector, orbits) orb_vector = spzeros(length(orbits)) for (i,o) in enumerate(orbits) k = vect[collect(o)] val = k[1] @assert all(k .== val) orb_vector[i] = val end return orb_vector end ############################################################################### # # Naive SDP # ############################################################################### function SOS_problem(X::GroupRingElem, orderunit::GroupRingElem; upper_bound=Inf) N = size(parent(X).pm, 1) m = JuMP.Model(); JuMP.@variable(m, P[1:N, 1:N]) JuMP.@SDconstraint(m, P >= 0) JuMP.@constraint(m, sum(P[i] for i in eachindex(P)) == 0) JuMP.@variable(m, λ) if upper_bound < Inf JuMP.@constraint(m, λ <= upper_bound) end cnstrs = constraints(parent(X).pm) for (constraint, x, u) in zip(cnstrs, X.coeffs, orderunit.coeffs) JuMP.@constraint(m, sum(P[constraint]) == x - λ*u) end JuMP.@objective(m, Max, λ) return m, λ, P end ############################################################################### # # Symmetrized SDP # ############################################################################### function SOS_problem(X::GroupRingElem, orderunit::GroupRingElem, data::OrbitData; upper_bound=Inf) Ns = size.(data.Uπs, 2) m = JuMP.Model(); P = Vector{Matrix{JuMP.Variable}}(length(Ns)) for (k,s) in enumerate(Ns) P[k] = JuMP.@variable(m, [i=1:s, j=1:s]) JuMP.@SDconstraint(m, P[k] >= 0.0) end λ = JuMP.@variable(m, λ) if upper_bound < Inf JuMP.@constraint(m, λ <= upper_bound) end info("Adding $(length(data.orbits)) constraints... ") @time addconstraints!(m,P,λ,X,orderunit, data) JuMP.@objective(m, Max, λ) return m, λ, P end function constraintLHS!(M, cnstr, Us, Ust, dims, eps=1000*eps(eltype(first(M)))) for π in 1:endof(Us) M[π] = PropertyT.sparsify!(dims[π].*Ust[π]*cnstr*Us[π], eps) end end function addconstraints!(m::JuMP.Model, P::Vector{Matrix{JuMP.Variable}}, λ::JuMP.Variable, X::GroupRingElem, orderunit::GroupRingElem, data::OrbitData) orderunit_orb = orbit_spvector(orderunit.coeffs, data.orbits) X_orb = orbit_spvector(X.coeffs, data.orbits) UπsT = [U' for U in data.Uπs] cnstrs = constraints(parent(X).pm) orb_cnstr = spzeros(Float64, size(parent(X).pm)...) M = [Array{Float64}(n,n) for n in size.(UπsT,1)] for (t, orbit) in enumerate(data.orbits) orbit_constraint!(orb_cnstr, cnstrs, orbit) constraintLHS!(M, orb_cnstr, data.Uπs, UπsT, data.dims) lhs = @expression(m, sum(vecdot(M[π], P[π]) for π in 1:endof(data.Uπs))) x, u = X_orb[t], orderunit_orb[t] JuMP.@constraint(m, lhs == x - λ*u) end end function reconstruct(Ps::Vector{Matrix{F}}, data::OrbitData) where F return reconstruct(Ps, data.preps, data.Uπs, data.dims) end function reconstruct(Ps::Vector{M}, preps::Dict{GEl, P}, Uπs::Vector{U}, dims::Vector{Int}) where {M<:AbstractMatrix, GEl<:GroupElem, P<:perm, U<:AbstractMatrix} lU = length(Uπs) transfP = [dims[π].*Uπs[π]*Ps[π]*Uπs[π]' for π in 1:lU] tmp = [zeros(Float64, size(first(transfP))) for _ in 1:lU] @time Threads.@threads for π in 1:lU tmp[π] = perm_avg(tmp[π], transfP[π], values(preps)) end recP = sum(tmp)./length(preps) return recP end function perm_avg(result, P, perms) lp = length(first(perms).d) for p in perms # result .+= view(P, p.d, p.d) @inbounds for j in 1:lp k = p[j] for i in 1:lp result[i,j] += P[p[i], k] end end end return result end ############################################################################### # # Low-level solve # ############################################################################### using MathProgBase function solve(m::JuMP.Model, varλ::JuMP.Variable, varP, warmstart=nothing) traits = JuMP.ProblemTraits(m, relaxation=false) JuMP.build(m, traits=traits) if warmstart != nothing p_sol, d_sol, s = warmstart MathProgBase.SolverInterface.setwarmstart!(m.internalModel, p_sol; dual_sol=d_sol, slack=s); end MathProgBase.optimize!(m.internalModel) status = MathProgBase.status(m.internalModel) λ = MathProgBase.getobjval(m.internalModel) warmstart = (m.internalModel.primal_sol, m.internalModel.dual_sol, m.internalModel.slack) fillfrominternal!(m, traits) P = JuMP.getvalue(varP) λ = JuMP.getvalue(varλ) return status, (λ, P, warmstart) end function solve(solverlog::String, model::JuMP.Model, varλ::JuMP.Variable, varP, warmstart=nothing) function f() Base.Libc.flush_cstdio() status, (λ, P, ws) = PropertyT.solve(model, varλ, varP, warmstart) Base.Libc.flush_cstdio() return λ, P, ws end isdir(dirname(solverlog)) || mkpath(dirname(solverlog)) log = open(solverlog, "a+") λ, P, warmstart = redirect_stdout(f, log) close(log) return status, (λ, P, warmstart) end ############################################################################### # # Copied from JuMP/src/solvers.jl:178 # ############################################################################### function fillfrominternal!(m::JuMP.Model, traits) stat::Symbol = MathProgBase.status(m.internalModel) numRows, numCols = length(m.linconstr), m.numCols m.objBound = NaN m.objVal = NaN m.colVal = fill(NaN, numCols) m.linconstrDuals = Array{Float64}(0) discrete = (traits.int || traits.sos) if stat == :Optimal # If we think dual information might be available, try to get it # If not, return an array of the correct length if discrete m.redCosts = fill(NaN, numCols) m.linconstrDuals = fill(NaN, numRows) else if !traits.conic m.redCosts = try MathProgBase.getreducedcosts(m.internalModel)[1:numCols] catch fill(NaN, numCols) end m.linconstrDuals = try MathProgBase.getconstrduals(m.internalModel)[1:numRows] catch fill(NaN, numRows) end elseif !traits.qp && !traits.qc JuMP.fillConicDuals(m) end end else # Problem was not solved to optimality, attempt to extract useful # information anyway if traits.lin if stat == :Infeasible m.linconstrDuals = try infray = MathProgBase.getinfeasibilityray(m.internalModel) @assert length(infray) == numRows infray catch suppress_warnings || warn("Infeasibility ray (Farkas proof) not available") fill(NaN, numRows) end elseif stat == :Unbounded m.colVal = try unbdray = MathProgBase.getunboundedray(m.internalModel) @assert length(unbdray) == numCols unbdray catch suppress_warnings || warn("Unbounded ray not available") fill(NaN, numCols) end end end # conic duals (currently, SOC and SDP only) if !discrete && traits.conic && !traits.qp && !traits.qc if stat == :Infeasible JuMP.fillConicDuals(m) end end end # If the problem was solved, or if it terminated prematurely, try # to extract a solution anyway. This commonly occurs when a time # limit or tolerance is set (:UserLimit) if !(stat == :Infeasible || stat == :Unbounded) try # Do a separate try since getobjval could work while getobjbound does not and vice versa objBound = MathProgBase.getobjbound(m.internalModel) + m.obj.aff.constant m.objBound = objBound end try objVal = MathProgBase.getobjval(m.internalModel) + m.obj.aff.constant colVal = MathProgBase.getsolution(m.internalModel)[1:numCols] # Rescale off-diagonal terms of SDP variables if traits.sdp offdiagvars = JuMP.offdiagsdpvars(m) colVal[offdiagvars] /= sqrt(2) end # Don't corrupt the answers if one of the above two calls fails m.objVal = objVal m.colVal = colVal end end return stat end