8 changed files with 143 additions and 2310 deletions
--- a/engine-proto/ConstructionViewer.jl
+++ b/engine-proto/ConstructionViewer.jl
@ -65,12 +65,8 @@ mutable struct ConstructionViewer
      }
    """)
-    # load Ganja.js. for an automatically updated web-hosted version, load from
+    # load Ganja.js
-    #
+    loadjs!(win, "https://unpkg.com/ganja.js")
    #   https://unpkg.com/ganja.js
    #
    # instead
    loadjs!(win, "http://localhost:8000/ganja-1.0.204.js")
    # create global functions and variables
    script!(win, """
@ -127,24 +123,12 @@ mutable struct ConstructionViewer
  end
 end
 mprod(v, w) =
  v[1]*w[1] + v[2]*w[2] + v[3]*w[3] + v[4]*w[4] - v[5]*w[5]
 function display!(viewer::ConstructionViewer, elements::Matrix)
  # load elements
-  elements_full = []
+  elements_full = [
    [0; elt; fill(0, 26)]
    for elt in eachcol(elements)
-    if mprod(elt, elt) < 0.5
+  ]
      elt_full = [0; elt; fill(0, 26)]
    else
      # `elt` is a spacelike vector, representing a generalized sphere, so we
      # take its Hodge dual before passing it to Ganja.js. the dual represents
      # the same generalized sphere, but Ganja.js only displays planes when
      # they're represented by vectors in grade 4 rather than grade 1
      elt_full = [fill(0, 26); -elt[5]; -elt[4]; elt[3]; -elt[2]; elt[1]; 0]
    end
    push!(elements_full, elt_full)
  end
  @js viewer.win elements = $elements_full.map((elt) -> @new CGA3(elt))
  # generate palette. this is Gadfly's `default_discrete_colors` palette,
--- a/engine-proto/ganja-test/ganja-test.html
+++ b/engine-proto/ganja-test/ganja-test.html
@ -28,25 +28,6 @@
    CGA3.inline(() => Math.sqrt(0.5)*(-1e1 - 1e2 + 1e3 + 1e5))(),
    CGA3.inline(() => -Math.sqrt(3)*1e4 + Math.sqrt(2)*1e5)()
  ];
  /*
    these blocks of commented-out code can be used to confirm that a spacelike
    vector and its Hodge dual represent the same generalized sphere
  */
  /*let elements = [
    CGA3.inline(() => Math.sqrt(0.5)*!( 1e1 + 1e2 + 1e3 + 1e5))(),
    CGA3.inline(() => Math.sqrt(0.5)*!( 1e1 - 1e2 - 1e3 + 1e5))(),
    CGA3.inline(() => Math.sqrt(0.5)*!(-1e1 + 1e2 - 1e3 + 1e5))(),
    CGA3.inline(() => Math.sqrt(0.5)*!(-1e1 - 1e2 + 1e3 + 1e5))(),
    CGA3.inline(() => !(-Math.sqrt(3)*1e4 + Math.sqrt(2)*1e5))()
  ];*/
  /*let elements = [
    CGA3.inline(() =>  1e1 + 1e5)(),
    CGA3.inline(() =>  1e2 + 1e5)(),
    CGA3.inline(() =>  1e3 + 1e5)(),
    CGA3.inline(() => -1e4 + 1e5)(),
    CGA3.inline(() => Math.sqrt(0.5)*(1e1 + 1e2 + 1e3 + 1e5))(),
    CGA3.inline(() => Math.sqrt(0.5)*!(1e1 + 1e2 + 1e3 - 0.01e4 + 1e5))()
  ];*/
  // set up palette
  var colorIndex;
@ -85,7 +66,6 @@
      // de-noise
      for (let k = 6; k < elements[n].length; ++k) {
      /*for (let k = 0; k < 26; ++k) {*/
        elements[n][k] = 0;
      }
    }
--- a/engine-proto/gram-test/Engine.jl
+++ b/engine-proto/gram-test/Engine.jl
@ -1,146 +0,0 @@
 module Engine
 using LinearAlgebra
 using SparseArrays
 using Random
 export rand_on_shell, Q, DescentHistory, realize_gram
 # === guessing ===
 sconh(t, u) = 0.5*(exp(t) + u*exp(-t))
 function rand_on_sphere(rng::AbstractRNG, ::Type{T}, n) where T
  out = randn(rng, T, n)
  tries_left = 2
  while dot(out, out) < 1e-6 && tries_left > 0
    out = randn(rng, T, n)
    tries_left -= 1
  end
  normalize(out)
 end
 ##[TO DO] write a test to confirm that the outputs are on the correct shells
 function rand_on_shell(rng::AbstractRNG, shell::T) where T <: Number
  space_part = rand_on_sphere(rng, T, 4)
  rapidity = randn(rng, T)
  sig = sign(shell)
  [sconh(rapidity, sig)*space_part; sconh(rapidity, -sig)]
 end
 rand_on_shell(rng::AbstractRNG, shells::Array{T}) where T <: Number =
  hcat([rand_on_shell(rng, sh) for sh in shells]...)
 rand_on_shell(shells::Array{<:Number}) = rand_on_shell(Random.default_rng(), shells)
 # === elements ===
 plane(normal, offset) = [normal; offset; offset]
 function sphere(center, radius)
  dist_sq = dot(center, center)
  return [
    center / radius;
    0.5 * ((dist_sq - 1) / radius - radius);
    0.5 * ((dist_sq + 1) / radius - radius)
  ]
 end
 # === Gram matrix realization ===
 # the Lorentz form
 Q = diagm([1, 1, 1, 1, -1])
 # the difference between the matrices `target` and `attempt`, projected onto the
 # subspace of matrices whose entries vanish at each empty index of `target`
 function proj_diff(target::SparseMatrixCSC{T, <:Any}, attempt::Matrix{T}) where T
  J, K, values = findnz(target)
  result = zeros(size(target)...)
  for (j, k, val) in zip(J, K, values)
    result[j, k] = val - attempt[j, k]
  end
  result
 end
 # a type for keeping track of gradient descent history
 struct DescentHistory{T}
  scaled_loss::Array{T}
  slope::Array{T}
  stepsize::Array{T}
  backoff_steps::Array{Int64}
  function DescentHistory{T}(
    scaled_loss = Array{T}(undef, 0),
    slope = Array{T}(undef, 0),
    stepsize = Array{T}(undef, 0),
    backoff_steps = Int64[]
  ) where T
    new(scaled_loss, slope, stepsize, backoff_steps)
  end
 end
 # seek a matrix `L` for which `L'QL` matches the sparse matrix `gram` at every
 # explicit entry of `gram`. use gradient descent starting from `guess`
 function realize_gram(
  gram::SparseMatrixCSC{T, <:Any},
  guess::Matrix{T};
  scaled_tol = 1e-30,
  target_improvement = 0.5,
  init_stepsize = 1.0,
  backoff = 0.9,
  max_descent_steps = 600,
  max_backoff_steps = 110
 ) where T <: Number
  # start history
  history = DescentHistory{T}()
  # scale tolerance
  scale_adjustment = sqrt(T(nnz(gram)))
  tol = scale_adjustment * scaled_tol
  # initialize variables
  stepsize = init_stepsize
  L = copy(guess)
  # do gradient descent
  Δ_proj = proj_diff(gram, L'*Q*L)
  loss = norm(Δ_proj)
  for step in 1:max_descent_steps
    # stop if the loss is tolerably low
    if loss < tol
      break
    end
    # find negative gradient of loss function
    neg_grad = 4*Q*L*Δ_proj
    slope = norm(neg_grad)
    # store current position, loss, and slope
    L_last = L
    loss_last = loss
    push!(history.scaled_loss, loss / scale_adjustment)
    push!(history.slope, slope)
    # find a good step size using backtracking line search
    push!(history.stepsize, 0)
    push!(history.backoff_steps, max_backoff_steps)
    for backoff_steps in 0:max_backoff_steps
      history.stepsize[end] = stepsize
      L = L_last + stepsize * neg_grad
      Δ_proj = proj_diff(gram, L'*Q*L)
      loss = norm(Δ_proj)
      improvement = loss_last - loss
      if improvement >= target_improvement * stepsize * slope
        history.backoff_steps[end] = backoff_steps
        break
      end
      stepsize *= backoff
    end
  end
  # return the factorization and its history
  push!(history.scaled_loss, loss / scale_adjustment)
  L, history
 end
 end
--- a/engine-proto/gram-test/circles-in-triangle.jl
+++ b/engine-proto/gram-test/circles-in-triangle.jl
@ -1,79 +0,0 @@
 include("Engine.jl")
 using SparseArrays
 using AbstractAlgebra
 using PolynomialRoots
 # initialize the partial gram matrix for a sphere inscribed in a regular
 # tetrahedron
 J = Int64[]
 K = Int64[]
 values = BigFloat[]
 for j in 1:8
  for k in 1:8
    filled = false
    if j == k
      push!(values, 1)
      filled = true
    elseif (j == 1 || k == 1)
      push!(values, 0)
      filled = true
    elseif (j == 2 || k == 2)
      push!(values, -1)
      filled = true
    end
    if filled
      push!(J, j)
      push!(K, k)
    end
  end
 end
 append!(J, [6, 4, 6, 5, 7, 5, 7, 3, 8, 3, 8, 4])
 append!(K, [4, 6, 5, 6, 5, 7, 3, 7, 3, 8, 4, 8])
 append!(values, fill(-1, 12))
 #= make construction rigid
 append!(J, [3, 4, 4, 5])
 append!(K, [4, 3, 5, 4])
 append!(values, fill(-0.5, 4))
 =#
 gram = sparse(J, K, values)
 # set initial guess (random)
 ## Random.seed!(58271) # stuck; step size collapses on step 48
 ## Random.seed!(58272) # good convergence
 ## Random.seed!(58273) # stuck; step size collapses on step 18
 ## Random.seed!(58274) # stuck
 ## Random.seed!(58275) #
 ## guess = Engine.rand_on_shell(fill(BigFloat(-1), 8))
 # set initial guess
 #=
 guess = hcat(
  Engine.plane(BigFloat[0, 0, 1], BigFloat(0)),
  Engine.sphere(BigFloat[0, 0, 0], BigFloat(1//2)),
  Engine.plane(BigFloat[1, 0, 0], BigFloat(1)),
  Engine.plane(BigFloat[cos(2pi/3), sin(2pi/3), 0], BigFloat(1)),
  Engine.plane(BigFloat[cos(-2pi/3), sin(-2pi/3), 0], BigFloat(1)),
  Engine.sphere(BigFloat[-1, 0, 0], BigFloat(1//5)),
  Engine.sphere(BigFloat[cos(-pi/3), sin(-pi/3), 0], BigFloat(1//5)),
  Engine.sphere(BigFloat[cos(pi/3), sin(pi/3), 0], BigFloat(1//5))
 )
 =#
 guess = hcat(
  Engine.plane(BigFloat[0, 0, 1], BigFloat(0)),
  Engine.sphere(BigFloat[0, 0, 0], BigFloat(0.9)),
  Engine.plane(BigFloat[1, 0, 0], BigFloat(1)),
  Engine.plane(BigFloat[cos(2pi/3), sin(2pi/3), 0], BigFloat(1)),
  Engine.plane(BigFloat[cos(-2pi/3), sin(-2pi/3), 0], BigFloat(1)),
  Engine.sphere(4//3*BigFloat[-1, 0, 0], BigFloat(1//3)),
  Engine.sphere(4//3*BigFloat[cos(-pi/3), sin(-pi/3), 0], BigFloat(1//3)),
  Engine.sphere(4//3*BigFloat[cos(pi/3), sin(pi/3), 0], BigFloat(1//3))
 )
 # complete the gram matrix using gradient descent
 L, history = Engine.realize_gram(gram, guess, max_descent_steps = 200)
 completed_gram = L'*Engine.Q*L
 println("Completed Gram matrix:\n")
 display(completed_gram)
 println("\nSteps: ", size(history.stepsize, 1))
 println("Loss: ", history.scaled_loss[end], "\n")
--- a/engine-proto/gram-test/descent-test.jl
+++ b/engine-proto/gram-test/descent-test.jl
@ -0,0 +1,137 @@
 using LinearAlgebra
 using SparseArrays
 using AbstractAlgebra
 using PolynomialRoots
 # testing Gram matrix recovery using a homemade gradient descent routine
 # === gradient descent ===
 # the difference between the matrices `target` and `attempt`, projected onto the
 # subspace of matrices whose entries vanish at each empty index of `target`
 function proj_diff(target, attempt)
  J, K, values = findnz(target)
  result = zeros(size(target)...)
  for (j, k, val) in zip(J, K, values)
    result[j, k] = val - attempt[j, k]
  end
  result
 end
 # === example ===
 # the Lorentz form
 Q = diagm([1, 1, 1, 1, -1])
 # initialize the partial gram matrix for an arrangement of seven spheres in
 # which spheres 1 through 5 are mutually tangent, and spheres 3 through 7 are
 # also mutually tangent
 J = Int64[]
 K = Int64[]
 values = BigFloat[]
 for j in 1:7
  for k in 1:7
    if (j <= 5 && k <= 5) || (j >= 3 && k >= 3)
      push!(J, j)
      push!(K, k)
      push!(values, j == k ? 1 : -1)
    end
  end
 end
 gram = sparse(J, K, values)
 # set the independent variable
 #
 # using gram[6, 2] or gram[7, 1] as the independent variable seems to stall
 # convergence, even if its value comes from a known solution, like
 #
 #   gram[6, 2] = 0.9936131705272925
 #
 indep_val = -9//5
 gram[6, 1] = BigFloat(indep_val)
 gram[1, 6] = gram[6, 1]
 # in this initial guess, the mutual tangency condition is satisfied for spheres
 # 1 through 5
 guess = sqrt(0.5) * BigFloat[
  1  1 -1 -1  0       -0.1  0.3;
  1 -1  1 -1  0       -0.5  0.4;
  1 -1 -1  1  0        0.1 -0.2;
  0  0  0  0 -sqrt(6)  0.3 -0.2;
  1  1  1  1  2        0.2  0.1;
 ]
 # search parameters
 steps = 600
 line_search_max_steps = 100
 init_stepsize = BigFloat(1)
 step_shrink_factor = BigFloat(0.5)
 target_improvement_factor = BigFloat(0.5)
 # complete the gram matrix using gradient descent
 loss_history = Array{BigFloat}(undef, steps + 1)
 stepsize_history = Array{BigFloat}(undef, steps)
 line_search_depth_history = fill(line_search_max_steps, steps)
 stepsize = init_stepsize
 L = copy(guess)
 Δ_proj = proj_diff(gram, L'*Q*L)
 loss = norm(Δ_proj)
 for step in 1:steps
  # find negative gradient of loss function
  neg_grad = 4*Q*L*Δ_proj
  slope = norm(neg_grad)
  # store current position and loss
  L_last = L
  loss_last = loss
  loss_history[step] = loss
  # find a good step size using backtracking line search
  for line_search_depth in 1:line_search_max_steps
    stepsize_history[step] = stepsize
    global L = L_last + stepsize * neg_grad
    global Δ_proj = proj_diff(gram, L'*Q*L)
    global loss = norm(Δ_proj)
    improvement = loss_last - loss
    if improvement >= target_improvement_factor * stepsize * slope
      line_search_depth_history[step] = line_search_depth
      break
    end
    global stepsize *= step_shrink_factor
  end
 end
 completed_gram = L'*Q*L
 loss_history[steps + 1] = loss
 println("Completed Gram matrix:\n")
 display(completed_gram)
 println("\nLoss: ", loss, "\n")
 # === algebraic check ===
 R, gens = polynomial_ring(AbstractAlgebra.Rationals{BigInt}(), ["x", "t₁", "t₂", "t₃"])
 x = gens[1]
 t = gens[2:4]
 S, u = polynomial_ring(AbstractAlgebra.Rationals{BigInt}(), "u")
 M = matrix_space(R, 7, 7)
 gram_symb = M(R[
   1    -1    -1 -1 -1  t[1] t[2];
  -1     1    -1 -1 -1  x    t[3]
  -1    -1     1 -1 -1 -1   -1;
  -1    -1    -1  1 -1 -1   -1;
  -1    -1    -1 -1  1 -1   -1;
   t[1]  x    -1 -1 -1  1   -1;
   t[2]  t[3] -1 -1 -1 -1    1
 ])
 rank_constraints = det.([
  gram_symb[1:6, 1:6],
  gram_symb[2:7, 2:7],
  gram_symb[[1, 3, 4, 5, 6, 7], [1, 3, 4, 5, 6, 7]]
 ])
 # solve for x and t
 x_constraint = 25//16 * to_univariate(S, evaluate(rank_constraints[1], [2], [indep_val]))
 t₂_constraint = 25//16 * to_univariate(S, evaluate(rank_constraints[3], [2], [indep_val]))
 x_vals = PolynomialRoots.roots(x_constraint.coeffs)
 t₂_vals = PolynomialRoots.roots(t₂_constraint.coeffs)
--- a/engine-proto/gram-test/ganja-1.0.204.js
+++ b/engine-proto/gram-test/ganja-1.0.204.js
--- a/engine-proto/gram-test/overlapping-pyramids.jl
+++ b/engine-proto/gram-test/overlapping-pyramids.jl
@ -1,86 +0,0 @@
 include("Engine.jl")
 using SparseArrays
 using AbstractAlgebra
 using PolynomialRoots
 using Random
 # initialize the partial gram matrix for an arrangement of seven spheres in
 # which spheres 1 through 5 are mutually tangent, and spheres 3 through 7 are
 # also mutually tangent
 J = Int64[]
 K = Int64[]
 values = BigFloat[]
 for j in 1:7
  for k in 1:7
    if (j <= 5 && k <= 5) || (j >= 3 && k >= 3)
      push!(J, j)
      push!(K, k)
      push!(values, j == k ? 1 : -1)
    end
  end
 end
 gram = sparse(J, K, values)
 # set the independent variable
 #
 # using gram[6, 2] or gram[7, 1] as the independent variable seems to stall
 # convergence, even if its value comes from a known solution, like
 #
 #   gram[6, 2] = 0.9936131705272925
 #
 indep_val = -9//5
 gram[6, 1] = BigFloat(indep_val)
 gram[1, 6] = gram[6, 1]
 # in this initial guess, the mutual tangency condition is satisfied for spheres
 # 1 through 5
 Random.seed!(50793)
 guess = hcat(
  sqrt(1/BigFloat(2)) * BigFloat[
    1  1 -1 -1  0;
    1 -1  1 -1  0;
    1 -1 -1  1  0;
    0  0  0  0 -sqrt(BigFloat(6));
    1  1  1  1  2;
  ] + 0.2*Engine.rand_on_shell(fill(BigFloat(-1), 5)),
  Engine.rand_on_shell(fill(BigFloat(-1), 2))
 )
 # complete the gram matrix using gradient descent
 L, history = Engine.realize_gram(gram, guess)
 completed_gram = L'*Engine.Q*L
 println("Completed Gram matrix:\n")
 display(completed_gram)
 println("\nSteps: ", size(history.stepsize, 1))
 println("Loss: ", history.scaled_loss[end], "\n")
 # === algebraic check ===
 R, gens = polynomial_ring(AbstractAlgebra.Rationals{BigInt}(), ["x", "t₁", "t₂", "t₃"])
 x = gens[1]
 t = gens[2:4]
 S, u = polynomial_ring(AbstractAlgebra.Rationals{BigInt}(), "u")
 M = matrix_space(R, 7, 7)
 gram_symb = M(R[
   1    -1    -1 -1 -1  t[1] t[2];
  -1     1    -1 -1 -1  x    t[3]
  -1    -1     1 -1 -1 -1   -1;
  -1    -1    -1  1 -1 -1   -1;
  -1    -1    -1 -1  1 -1   -1;
   t[1]  x    -1 -1 -1  1   -1;
   t[2]  t[3] -1 -1 -1 -1    1
 ])
 rank_constraints = det.([
  gram_symb[1:6, 1:6],
  gram_symb[2:7, 2:7],
  gram_symb[[1, 3, 4, 5, 6, 7], [1, 3, 4, 5, 6, 7]]
 ])
 # solve for x and t
 x_constraint = 25//16 * to_univariate(S, evaluate(rank_constraints[1], [2], [indep_val]))
 t₂_constraint = 25//16 * to_univariate(S, evaluate(rank_constraints[3], [2], [indep_val]))
 x_vals = PolynomialRoots.roots(x_constraint.coeffs)
 t₂_vals = PolynomialRoots.roots(t₂_constraint.coeffs)
--- a/engine-proto/gram-test/sphere-in-tetrahedron.jl
+++ b/engine-proto/gram-test/sphere-in-tetrahedron.jl
@ -1,44 +0,0 @@
 include("Engine.jl")
 using SparseArrays
 using AbstractAlgebra
 using PolynomialRoots
 using Random
 # initialize the partial gram matrix for a sphere inscribed in a regular
 # tetrahedron
 J = Int64[]
 K = Int64[]
 values = BigFloat[]
 for j in 1:5
  for k in 1:5
    push!(J, j)
    push!(K, k)
    if j == k
      push!(values, 1)
    elseif (j <= 4 && k <= 4)
      push!(values, -1/BigFloat(3))
    else
      push!(values, -1)
    end
  end
 end
 gram = sparse(J, K, values)
 # set initial guess
 Random.seed!(99230)
 guess = sqrt(1/BigFloat(3)) * BigFloat[
  1  1 -1 -1  0
  1 -1  1 -1  0
  1 -1 -1  1  0
  1  1  1  1 -2
  1  1  1  1  1
 ] + 0.2*Engine.rand_on_shell(fill(BigFloat(-1), 5))
 # complete the gram matrix using gradient descent
 L, history = Engine.realize_gram(gram, guess)
 completed_gram = L'*Engine.Q*L
 println("Completed Gram matrix:\n")
 display(completed_gram)
 println("\nSteps: ", size(history.stepsize, 1))
 println("Loss: ", history.scaled_loss[end], "\n")