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2 changed files with 23 additions and 61 deletions

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@ -82,61 +82,17 @@ unit = Δ
show_progress = true, show_progress = true,
) )
warm = nothing solve_in_loop(
let status = JuMP.OPTIMIZE_NOT_CALLED, warm = warm, eps = 1e-9
certified, λ = false, 0.0
while status JuMP.OPTIMAL
@time status, warm = PropertyT.solve(
model, model,
scs_optimizer(; wd,
varP;
logdir = "./log/G2/r=$HALFRADIUS/Adj-$(UPPER_BOUND)Δ",
optimizer = scs_optimizer(;
linear_solver = SCS.MKLDirectSolver, linear_solver = SCS.MKLDirectSolver,
eps = eps, eps = 1e-9,
max_iters = 100_000, max_iters = 100_000,
accel = 50, accel = 50,
alpha = 1.95, alpha = 1.95,
), ),
warm, data = (elt = elt, unit = unit, halfradius = HALFRADIUS),
) )
@info "reconstructing the solution"
Q = @time let wd = wd, Ps = [JuMP.value.(P) for P in varP], eps = eps
PropertyT.__droptol!.(Ps, 100eps)
Qs = real.(sqrt.(Ps))
PropertyT.__droptol!.(Qs, eps)
PropertyT.reconstruct(Qs, wd)
end
@info "certifying the solution"
@time certified, λ = PropertyT.certify_solution(
elt,
unit,
JuMP.objective_value(model),
Q;
halfradius = HALFRADIUS,
augmented = true,
)
end
if certified && λ > 0
Κ(λ, S) = round(sqrt(2λ / length(S)), Base.RoundDown; digits = 5)
@info "Certified result: $G has property (T):" N λ Κ(λ, S)
else
@info "Could NOT certify the result:" certified λ
end
end
# solve_in_loop(
# model,
# wd,
# varP;
# logdir = "./log/G2/r=$HALFRADIUS/Adj-InfΔ",
# optimizer = scs_optimizer(;
# eps = 1e-10,
# max_iters = 50_000,
# accel = 50,
# alpha = 1.95,
# ),
# data = (elt = elt, unit = unit, halfradius = HALFRADIUS),
# )

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@ -11,11 +11,17 @@ function get_solution(model)
return solution return solution
end end
function get_solution(model, wd, varP) function get_solution(model, wd, varP, eps = 1e-10)
λ = JuMP.value(model[]) λ = JuMP.value(model[])
Qs = [real.(sqrt(JuMP.value.(P))) for P in varP] @info "reconstructing the solution"
Q = PropertyT.reconstruct(Qs, wd) Q = @time let wd = wd, Ps = [JuMP.value.(P) for P in varP], eps = eps
PropertyT.__droptol!.(Ps, 100eps)
Qs = real.(sqrt.(Ps))
PropertyT.__droptol!.(Qs, eps)
PropertyT.reconstruct(Qs, wd)
end
solution = Dict( => λ, :Q => Q) solution = Dict( => λ, :Q => Q)
return solution return solution