573 lines
17 KiB
Julia
573 lines
17 KiB
Julia
module Engine
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using LinearAlgebra
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using GenericLinearAlgebra
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using SparseArrays
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using Random
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using Optim
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export
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rand_on_shell, Q, DescentHistory,
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realize_gram_gradient, realize_gram_newton, realize_gram_optim,
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realize_gram_alt_proj, realize_gram
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# === guessing ===
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sconh(t, u) = 0.5*(exp(t) + u*exp(-t))
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function rand_on_sphere(rng::AbstractRNG, ::Type{T}, n) where T
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out = randn(rng, T, n)
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tries_left = 2
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while dot(out, out) < 1e-6 && tries_left > 0
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out = randn(rng, T, n)
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tries_left -= 1
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end
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normalize(out)
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end
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##[TO DO] write a test to confirm that the outputs are on the correct shells
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function rand_on_shell(rng::AbstractRNG, shell::T) where T <: Number
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space_part = rand_on_sphere(rng, T, 4)
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rapidity = randn(rng, T)
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sig = sign(shell)
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nullmix * [sconh(rapidity, sig)*space_part; sconh(rapidity, -sig)]
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end
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rand_on_shell(rng::AbstractRNG, shells::Array{T}) where T <: Number =
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hcat([rand_on_shell(rng, sh) for sh in shells]...)
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rand_on_shell(shells::Array{<:Number}) = rand_on_shell(Random.default_rng(), shells)
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# === elements ===
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point(pos) = [pos; 0.5; 0.5 * dot(pos, pos)]
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plane(normal, offset) = [-normal; 0; -offset]
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function sphere(center, radius)
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dist_sq = dot(center, center)
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[
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center / radius;
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0.5 / radius;
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0.5 * (dist_sq / radius - radius)
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]
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end
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# === Gram matrix realization ===
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# basis changes
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nullmix = [Matrix{Int64}(I, 3, 3) zeros(Int64, 3, 2); zeros(Int64, 2, 3) [-1 1; 1 1]//2]
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unmix = [Matrix{Int64}(I, 3, 3) zeros(Int64, 3, 2); zeros(Int64, 2, 3) [-1 1; 1 1]]
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# the Lorentz form
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Q = [Matrix{Int64}(I, 3, 3) zeros(Int64, 3, 2); zeros(Int64, 2, 3) [0 -2; -2 0]]
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# project a matrix onto the subspace of matrices whose entries vanish away from
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# the given indices
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function proj_to_entries(mat, indices)
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result = zeros(size(mat))
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for (j, k) in indices
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result[j, k] = mat[j, k]
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end
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result
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end
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# the difference between the matrices `target` and `attempt`, projected onto the
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# subspace of matrices whose entries vanish at each empty index of `target`
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function proj_diff(target::SparseMatrixCSC{T, <:Any}, attempt::Matrix{T}) where T
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J, K, values = findnz(target)
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result = zeros(size(target))
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for (j, k, val) in zip(J, K, values)
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result[j, k] = val - attempt[j, k]
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end
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result
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end
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# a type for keeping track of gradient descent history
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struct DescentHistory{T}
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scaled_loss::Array{T}
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neg_grad::Array{Matrix{T}}
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base_step::Array{Matrix{T}}
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hess::Array{Hermitian{T, Matrix{T}}}
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slope::Array{T}
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stepsize::Array{T}
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positive::Array{Bool}
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backoff_steps::Array{Int64}
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last_line_L::Array{Matrix{T}}
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last_line_loss::Array{T}
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function DescentHistory{T}(
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scaled_loss = Array{T}(undef, 0),
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neg_grad = Array{Matrix{T}}(undef, 0),
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hess = Array{Hermitian{T, Matrix{T}}}(undef, 0),
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base_step = Array{Matrix{T}}(undef, 0),
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slope = Array{T}(undef, 0),
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stepsize = Array{T}(undef, 0),
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positive = Bool[],
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backoff_steps = Int64[],
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last_line_L = Array{Matrix{T}}(undef, 0),
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last_line_loss = Array{T}(undef, 0)
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) where T
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new(scaled_loss, neg_grad, hess, base_step, slope, stepsize, positive, backoff_steps, last_line_L, last_line_loss)
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end
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end
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# seek a matrix `L` for which `L'QL` matches the sparse matrix `gram` at every
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# explicit entry of `gram`. use gradient descent starting from `guess`
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function realize_gram_gradient(
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gram::SparseMatrixCSC{T, <:Any},
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guess::Matrix{T};
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scaled_tol = 1e-30,
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min_efficiency = 0.5,
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init_stepsize = 1.0,
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backoff = 0.9,
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max_descent_steps = 600,
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max_backoff_steps = 110
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) where T <: Number
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# start history
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history = DescentHistory{T}()
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# scale tolerance
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scale_adjustment = sqrt(T(nnz(gram)))
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tol = scale_adjustment * scaled_tol
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# initialize variables
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stepsize = init_stepsize
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L = copy(guess)
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# do gradient descent
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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for _ in 1:max_descent_steps
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# stop if the loss is tolerably low
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if loss < tol
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break
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end
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# find the negative gradient of the loss function
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neg_grad = 4*Q*L*Δ_proj
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slope = norm(neg_grad)
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dir = neg_grad / slope
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# store current position, loss, and slope
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L_last = L
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loss_last = loss
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push!(history.scaled_loss, loss / scale_adjustment)
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push!(history.neg_grad, neg_grad)
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push!(history.slope, slope)
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# find a good step size using backtracking line search
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push!(history.stepsize, 0)
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push!(history.backoff_steps, max_backoff_steps)
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empty!(history.last_line_L)
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empty!(history.last_line_loss)
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for backoff_steps in 0:max_backoff_steps
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history.stepsize[end] = stepsize
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L = L_last + stepsize * dir
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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improvement = loss_last - loss
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push!(history.last_line_L, L)
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push!(history.last_line_loss, loss / scale_adjustment)
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if improvement >= min_efficiency * stepsize * slope
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history.backoff_steps[end] = backoff_steps
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break
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end
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stepsize *= backoff
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end
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# [DEBUG] if we've hit a wall, quit
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if history.backoff_steps[end] == max_backoff_steps
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break
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end
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end
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# return the factorization and its history
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push!(history.scaled_loss, loss / scale_adjustment)
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L, history
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end
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function basis_matrix(::Type{T}, j, k, dims) where T
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result = zeros(T, dims)
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result[j, k] = one(T)
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result
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end
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# seek a matrix `L` for which `L'QL` matches the sparse matrix `gram` at every
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# explicit entry of `gram`. use Newton's method starting from `guess`
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function realize_gram_newton(
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gram::SparseMatrixCSC{T, <:Any},
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guess::Matrix{T};
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scaled_tol = 1e-30,
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rate = 1,
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max_steps = 100
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) where T <: Number
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# start history
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history = DescentHistory{T}()
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# find the dimension of the search space
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dims = size(guess)
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element_dim, construction_dim = dims
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total_dim = element_dim * construction_dim
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# list the constrained entries of the gram matrix
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J, K, _ = findnz(gram)
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constrained = zip(J, K)
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# scale the tolerance
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scale_adjustment = sqrt(T(length(constrained)))
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tol = scale_adjustment * scaled_tol
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# use Newton's method
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L = copy(guess)
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for step in 0:max_steps
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# evaluate the loss function
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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# store the current loss
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push!(history.scaled_loss, loss / scale_adjustment)
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# stop if the loss is tolerably low
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if loss < tol || step > max_steps
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break
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end
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# find the negative gradient of the loss function
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neg_grad = 4*Q*L*Δ_proj
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# find the negative Hessian of the loss function
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hess = Matrix{T}(undef, total_dim, total_dim)
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indices = [(j, k) for k in 1:construction_dim for j in 1:element_dim]
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for (j, k) in indices
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basis_mat = basis_matrix(T, j, k, dims)
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neg_dΔ = basis_mat'*Q*L + L'*Q*basis_mat
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neg_dΔ_proj = proj_to_entries(neg_dΔ, constrained)
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deriv_grad = 4*Q*(-basis_mat*Δ_proj + L*neg_dΔ_proj)
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hess[:, (k-1)*element_dim + j] = reshape(deriv_grad, total_dim)
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end
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hess = Hermitian(hess)
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push!(history.hess, hess)
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# compute the Newton step
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step = hess \ reshape(neg_grad, total_dim)
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L += rate * reshape(step, dims)
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end
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# return the factorization and its history
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L, history
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end
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LinearAlgebra.eigen!(A::Symmetric{BigFloat, Matrix{BigFloat}}; sortby::Nothing) =
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eigen!(Hermitian(A))
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function convertnz(type, mat)
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J, K, values = findnz(mat)
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sparse(J, K, type.(values))
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end
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function realize_gram_optim(
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gram::SparseMatrixCSC{T, <:Any},
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guess::Matrix{T}
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) where T <: Number
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# find the dimension of the search space
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dims = size(guess)
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element_dim, construction_dim = dims
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total_dim = element_dim * construction_dim
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# list the constrained entries of the gram matrix
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J, K, _ = findnz(gram)
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constrained = zip(J, K)
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# scale the loss function
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scale_adjustment = length(constrained)
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function loss(L_vec)
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L = reshape(L_vec, dims)
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Δ_proj = proj_diff(gram, L'*Q*L)
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dot(Δ_proj, Δ_proj) / scale_adjustment
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end
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function loss_grad!(storage, L_vec)
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L = reshape(L_vec, dims)
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Δ_proj = proj_diff(gram, L'*Q*L)
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storage .= reshape(-4*Q*L*Δ_proj, total_dim) / scale_adjustment
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end
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function loss_hess!(storage, L_vec)
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L = reshape(L_vec, dims)
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Δ_proj = proj_diff(gram, L'*Q*L)
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indices = [(j, k) for k in 1:construction_dim for j in 1:element_dim]
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for (j, k) in indices
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basis_mat = basis_matrix(T, j, k, dims)
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neg_dΔ = basis_mat'*Q*L + L'*Q*basis_mat
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neg_dΔ_proj = proj_to_entries(neg_dΔ, constrained)
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deriv_grad = 4*Q*(-basis_mat*Δ_proj + L*neg_dΔ_proj) / scale_adjustment
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storage[:, (k-1)*element_dim + j] = reshape(deriv_grad, total_dim)
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end
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end
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optimize(
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loss, loss_grad!, loss_hess!,
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reshape(guess, total_dim),
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Newton()
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)
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end
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# seek a matrix `L` for which `L'QL` matches the sparse matrix `gram` at every
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# explicit entry of `gram`. use gradient descent starting from `guess`, with an
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# alternate technique for finding the projected base step from the unprojected
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# Hessian
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function realize_gram_alt_proj(
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gram::SparseMatrixCSC{T, <:Any},
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guess::Matrix{T},
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frozen = CartesianIndex[];
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scaled_tol = 1e-30,
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min_efficiency = 0.5,
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backoff = 0.9,
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reg_scale = 1.1,
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max_descent_steps = 200,
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max_backoff_steps = 110
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) where T <: Number
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# start history
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history = DescentHistory{T}()
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# find the dimension of the search space
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dims = size(guess)
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element_dim, construction_dim = dims
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total_dim = element_dim * construction_dim
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# list the constrained entries of the gram matrix
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J, K, _ = findnz(gram)
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constrained = zip(J, K)
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# scale the tolerance
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scale_adjustment = sqrt(T(length(constrained)))
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tol = scale_adjustment * scaled_tol
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# convert the frozen indices to stacked format
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frozen_stacked = [(index[2]-1)*element_dim + index[1] for index in frozen]
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# initialize search state
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L = copy(guess)
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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# use Newton's method with backtracking and gradient descent backup
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for step in 1:max_descent_steps
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# stop if the loss is tolerably low
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if loss < tol
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break
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end
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# find the negative gradient of the loss function
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neg_grad = 4*Q*L*Δ_proj
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# find the negative Hessian of the loss function
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hess = Matrix{T}(undef, total_dim, total_dim)
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indices = [(j, k) for k in 1:construction_dim for j in 1:element_dim]
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for (j, k) in indices
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basis_mat = basis_matrix(T, j, k, dims)
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neg_dΔ = basis_mat'*Q*L + L'*Q*basis_mat
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neg_dΔ_proj = proj_to_entries(neg_dΔ, constrained)
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deriv_grad = 4*Q*(-basis_mat*Δ_proj + L*neg_dΔ_proj)
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hess[:, (k-1)*element_dim + j] = reshape(deriv_grad, total_dim)
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end
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hess_sym = Hermitian(hess)
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push!(history.hess, hess_sym)
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# regularize the Hessian
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min_eigval = minimum(eigvals(hess_sym))
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push!(history.positive, min_eigval > 0)
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if min_eigval <= 0
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hess -= reg_scale * min_eigval * I
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end
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# compute the Newton step
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neg_grad_stacked = reshape(neg_grad, total_dim)
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for k in frozen_stacked
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neg_grad_stacked[k] = 0
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hess[k, :] .= 0
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hess[:, k] .= 0
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hess[k, k] = 1
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end
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base_step_stacked = Hermitian(hess) \ neg_grad_stacked
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base_step = reshape(base_step_stacked, dims)
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push!(history.base_step, base_step)
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# store the current position, loss, and slope
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L_last = L
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loss_last = loss
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push!(history.scaled_loss, loss / scale_adjustment)
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push!(history.neg_grad, neg_grad)
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push!(history.slope, norm(neg_grad))
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# find a good step size using backtracking line search
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push!(history.stepsize, 0)
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push!(history.backoff_steps, max_backoff_steps)
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empty!(history.last_line_L)
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empty!(history.last_line_loss)
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rate = one(T)
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step_success = false
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base_target_improvement = dot(neg_grad, base_step)
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for backoff_steps in 0:max_backoff_steps
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history.stepsize[end] = rate
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L = L_last + rate * base_step
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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improvement = loss_last - loss
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push!(history.last_line_L, L)
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push!(history.last_line_loss, loss / scale_adjustment)
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if improvement >= min_efficiency * rate * base_target_improvement
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history.backoff_steps[end] = backoff_steps
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step_success = true
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break
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end
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rate *= backoff
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end
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# if we've hit a wall, quit
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if !step_success
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return L_last, false, history
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end
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end
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# return the factorization and its history
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push!(history.scaled_loss, loss / scale_adjustment)
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L, loss < tol, history
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end
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# seek a matrix `L` for which `L'QL` matches the sparse matrix `gram` at every
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# explicit entry of `gram`. use gradient descent starting from `guess`
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function realize_gram(
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gram::SparseMatrixCSC{T, <:Any},
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guess::Matrix{T},
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frozen = nothing;
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scaled_tol = 1e-30,
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min_efficiency = 0.5,
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backoff = 0.9,
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reg_scale = 1.1,
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max_descent_steps = 200,
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max_backoff_steps = 110
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) where T <: Number
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# start history
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history = DescentHistory{T}()
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# find the dimension of the search space
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dims = size(guess)
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element_dim, construction_dim = dims
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total_dim = element_dim * construction_dim
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# list the constrained entries of the gram matrix
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J, K, _ = findnz(gram)
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constrained = zip(J, K)
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# scale the tolerance
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scale_adjustment = sqrt(T(length(constrained)))
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tol = scale_adjustment * scaled_tol
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# list the un-frozen indices
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has_frozen = !isnothing(frozen)
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if has_frozen
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is_unfrozen = fill(true, size(guess))
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is_unfrozen[frozen] .= false
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unfrozen = findall(is_unfrozen)
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unfrozen_stacked = reshape(is_unfrozen, total_dim)
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end
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# initialize search state
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L = copy(guess)
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Δ_proj = proj_diff(gram, L'*Q*L)
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loss = dot(Δ_proj, Δ_proj)
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# use Newton's method with backtracking and gradient descent backup
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for step in 1:max_descent_steps
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# stop if the loss is tolerably low
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if loss < tol
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break
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end
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# find the negative gradient of the loss function
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neg_grad = 4*Q*L*Δ_proj
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# find the negative Hessian of the loss function
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hess = Matrix{T}(undef, total_dim, total_dim)
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indices = [(j, k) for k in 1:construction_dim for j in 1:element_dim]
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for (j, k) in indices
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basis_mat = basis_matrix(T, j, k, dims)
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neg_dΔ = basis_mat'*Q*L + L'*Q*basis_mat
|
|
neg_dΔ_proj = proj_to_entries(neg_dΔ, constrained)
|
|
deriv_grad = 4*Q*(-basis_mat*Δ_proj + L*neg_dΔ_proj)
|
|
hess[:, (k-1)*element_dim + j] = reshape(deriv_grad, total_dim)
|
|
end
|
|
hess = Hermitian(hess)
|
|
push!(history.hess, hess)
|
|
|
|
# regularize the Hessian
|
|
min_eigval = minimum(eigvals(hess))
|
|
push!(history.positive, min_eigval > 0)
|
|
if min_eigval <= 0
|
|
hess -= reg_scale * min_eigval * I
|
|
end
|
|
|
|
# compute the Newton step
|
|
neg_grad_stacked = reshape(neg_grad, total_dim)
|
|
if has_frozen
|
|
hess = hess[unfrozen_stacked, unfrozen_stacked]
|
|
neg_grad_compressed = neg_grad_stacked[unfrozen_stacked]
|
|
else
|
|
neg_grad_compressed = neg_grad_stacked
|
|
end
|
|
base_step_compressed = hess \ neg_grad_compressed
|
|
if has_frozen
|
|
base_step_stacked = zeros(total_dim)
|
|
base_step_stacked[unfrozen_stacked] .= base_step_compressed
|
|
else
|
|
base_step_stacked = base_step_compressed
|
|
end
|
|
base_step = reshape(base_step_stacked, dims)
|
|
push!(history.base_step, base_step)
|
|
|
|
# store the current position, loss, and slope
|
|
L_last = L
|
|
loss_last = loss
|
|
push!(history.scaled_loss, loss / scale_adjustment)
|
|
push!(history.neg_grad, neg_grad)
|
|
push!(history.slope, norm(neg_grad))
|
|
|
|
# find a good step size using backtracking line search
|
|
push!(history.stepsize, 0)
|
|
push!(history.backoff_steps, max_backoff_steps)
|
|
empty!(history.last_line_L)
|
|
empty!(history.last_line_loss)
|
|
rate = one(T)
|
|
step_success = false
|
|
base_target_improvement = dot(neg_grad, base_step)
|
|
for backoff_steps in 0:max_backoff_steps
|
|
history.stepsize[end] = rate
|
|
L = L_last + rate * base_step
|
|
Δ_proj = proj_diff(gram, L'*Q*L)
|
|
loss = dot(Δ_proj, Δ_proj)
|
|
improvement = loss_last - loss
|
|
push!(history.last_line_L, L)
|
|
push!(history.last_line_loss, loss / scale_adjustment)
|
|
if improvement >= min_efficiency * rate * base_target_improvement
|
|
history.backoff_steps[end] = backoff_steps
|
|
step_success = true
|
|
break
|
|
end
|
|
rate *= backoff
|
|
end
|
|
|
|
# if we've hit a wall, quit
|
|
if !step_success
|
|
return L_last, false, history
|
|
end
|
|
end
|
|
|
|
# return the factorization and its history
|
|
push!(history.scaled_loss, loss / scale_adjustment)
|
|
L, loss < tol, history
|
|
end
|
|
|
|
end |