[morpheus.git] / pkg / tests / testthat / test-optimParams.R

context("OptimParams")

naive_f <- function(link, M1,M2,M3, p,β,b)
{
  d <- length(M1)
  K <- length(p)
  λ <- sqrt(colSums(β^2))

  # Compute β x2,3 (self) tensorial products
  β2 <- array(0, dim=c(d,d,K))
  β3 <- array(0, dim=c(d,d,d,K))
  for (k in 1:K)
  {
    for (i in 1:d)
    {
      for (j in 1:d)
      {
        β2[i,j,k] = β[i,k]*β[j,k]
        for (l in 1:d)
          β3[i,j,l,k] = β[i,k]*β[j,k]*β[l,k]
      }
    }
  }

  res <- 0
  for (i in 1:d)
  {
    term <- 0
    for (k in 1:K)
      term <- term + p[k]*.G(link,1,λ[k],b[k])*β[i,k]
    res <- res + (term - M1[i])^2
    for (j in 1:d)
    {
      term <- 0
      for (k in 1:K)
        term <- term + p[k]*.G(link,2,λ[k],b[k])*β2[i,j,k]
      res <- res + (term - M2[i,j])^2
      for (l in 1:d)
      {
        term <- 0
        for (k in 1:K)
          term <- term + p[k]*.G(link,3,λ[k],b[k])*β3[i,j,l,k]
        res <- res + (term - M3[i,j,l])^2
      }
    }
  }
  res
}

# TODO: understand why it fails and reactivate this test
#test_that("naive computation provides the same result as vectorized computations",
#{
#  h <- 1e-7 #for finite-difference tests
#  tol <- 1e-3 #large tolerance, necessary in some cases... (generally 1e-6 is OK)
#  n <- 10
#  for (dK in list( c(2,2), c(5,3)))
#  {
#    d <- dK[1]
#    K <- dK[2]
#
#    M1 <- runif(d, -1, 1)
#    M2 <- matrix(runif(d^2, -1, 1), ncol=d)
#    M3 <- array(runif(d^3, -1, 1), dim=c(d,d,d))
#
#    for (link in c("logit","probit"))
#    {
#      # X and Y are unused here (W not re-computed)
#      op <- optimParams(X=matrix(runif(n*d),ncol=d), Y=rbinom(n,1,.5),
#        K, link, M=list(M1,M2,M3))
#      op$W <- diag(d + d^2 + d^3)
#
#      for (var in seq_len((2+d)*K-1))
#      {
#        p <- runif(K, 0, 1)
#        p <- p / sum(p)
#        β <- matrix(runif(d*K,-5,5),ncol=K)
#        b <- runif(K, -5, 5)
#        x <- c(p[1:(K-1)],as.double(β),b)
#
#        # Test functions values
#        expect_equal( op$f(x), naive_f(link,M1,M2,M3, p,β,b) )
#
#        # Test finite differences ~= gradient values
#        dir_h <- rep(0, (2+d)*K-1)
#        dir_h[var] = h
#        expect_equal(op$grad_f(x)[var], (op$f(x+dir_h) - op$f(x)) / h, tol)
#      }
#    }
#  }
#})

test_that("W computed in C and in R are the same",
{
  tol <- 1e-8
  n <- 500
  for (dK in list( c(2,2), c(5,3)))
  {
    d <- dK[1]
    K <- dK[2]
    link <- ifelse(d==2, "logit", "probit")
    θ <- list(
      p=rep(1/K,K),
      β=matrix(runif(d*K),ncol=K),
      b=rep(0,K))
    io <- generateSampleIO(n, θ$p, θ$β, θ$b, link)
    X <- io$X
    Y <- io$Y
    dd <- d + d^2 + d^3
    p <- θ$p
    β <- θ$β
    λ <- sqrt(colSums(β^2))
    b <- θ$b
    β2 <- apply(β, 2, function(col) col %o% col)
    β3 <- apply(β, 2, function(col) col %o% col %o% col)
    M <- c(
      β  %*% (p * .G(link,1,λ,b)),
      β2 %*% (p * .G(link,2,λ,b)),
      β3 %*% (p * .G(link,3,λ,b)))
    Id <- as.double(diag(d))
    E <- diag(d)
    v1 <- Y * X
    v2 <- Y * t( apply(X, 1, function(Xi) Xi %o% Xi - Id) )
    v3 <- Y * t( apply(X, 1, function(Xi) { return (Xi %o% Xi %o% Xi
      - Reduce('+', lapply(1:d, function(j)
        as.double(Xi %o% E[j,] %o% E[j,])), rep(0, d*d*d))
      - Reduce('+', lapply(1:d, function(j)
        as.double(E[j,] %o% Xi %o% E[j,])), rep(0, d*d*d))
      - Reduce('+', lapply(1:d, function(j)
        as.double(E[j,] %o% E[j,] %o% Xi)), rep(0, d*d*d))) } ) )
    Omega1 <- matrix(0, nrow=dd, ncol=dd)
    for (i in 1:n)
    {
      gi <- t(as.matrix(c(v1[i,], v2[i,], v3[i,]) - M))
      Omega1 <- Omega1 + t(gi) %*% gi / n
    }
    W <- matrix(0, nrow=dd, ncol=dd)
    Omega2 <- matrix( .C("Compute_Omega",
      X=as.double(X), Y=as.integer(Y), M=as.double(M),
      pn=as.integer(n), pd=as.integer(d),
      W=as.double(W), PACKAGE="morpheus")$W, nrow=dd, ncol=dd )
    rg <- range(Omega1 - Omega2)
    expect_equal(rg[1], rg[2], tol)
  }
})
Commit	Line	Data
	1	context("OptimParams")
	2
	3	naive_f <- function(link, M1,M2,M3, p,β,b)
	4	{
	5	d <- length(M1)
	6	K <- length(p)
	7	λ <- sqrt(colSums(β^2))
	8
	9	# Compute β x2,3 (self) tensorial products
	10	β2 <- array(0, dim=c(d,d,K))
	11	β3 <- array(0, dim=c(d,d,d,K))
	12	for (k in 1:K)
	13	{
	14	for (i in 1:d)
	15	{
	16	for (j in 1:d)
	17	{
	18	β2[i,j,k] = β[i,k]*β[j,k]
	19	for (l in 1:d)
	20	β3[i,j,l,k] = β[i,k]β[j,k]β[l,k]
	21	}
	22	}
	23	}
	24
	25	res <- 0
	26	for (i in 1:d)
	27	{
	28	term <- 0
	29	for (k in 1:K)
	30	term <- term + p[k].G(link,1,λ[k],b[k])β[i,k]
	31	res <- res + (term - M1[i])^2
	32	for (j in 1:d)
	33	{
	34	term <- 0
	35	for (k in 1:K)
	36	term <- term + p[k].G(link,2,λ[k],b[k])β2[i,j,k]
	37	res <- res + (term - M2[i,j])^2
	38	for (l in 1:d)
	39	{
	40	term <- 0
	41	for (k in 1:K)
	42	term <- term + p[k].G(link,3,λ[k],b[k])β3[i,j,l,k]
	43	res <- res + (term - M3[i,j,l])^2
	44	}
	45	}
	46	}
	47	res
	48	}
	49
	50	# TODO: understand why it fails and reactivate this test
	51	#test_that("naive computation provides the same result as vectorized computations",
	52	#{
	53	# h <- 1e-7 #for finite-difference tests
	54	# tol <- 1e-3 #large tolerance, necessary in some cases... (generally 1e-6 is OK)
	55	# n <- 10
	56	# for (dK in list( c(2,2), c(5,3)))
	57	# {
	58	# d <- dK[1]
	59	# K <- dK[2]
	60	#
	61	# M1 <- runif(d, -1, 1)
	62	# M2 <- matrix(runif(d^2, -1, 1), ncol=d)
	63	# M3 <- array(runif(d^3, -1, 1), dim=c(d,d,d))
	64	#
	65	# for (link in c("logit","probit"))
	66	# {
	67	# # X and Y are unused here (W not re-computed)
	68	# op <- optimParams(X=matrix(runif(n*d),ncol=d), Y=rbinom(n,1,.5),
	69	# K, link, M=list(M1,M2,M3))
	70	# op$W <- diag(d + d^2 + d^3)
	71	#
	72	# for (var in seq_len((2+d)*K-1))
	73	# {
	74	# p <- runif(K, 0, 1)
	75	# p <- p / sum(p)
	76	# β <- matrix(runif(d*K,-5,5),ncol=K)
	77	# b <- runif(K, -5, 5)
	78	# x <- c(p[1:(K-1)],as.double(β),b)
	79	#
	80	# # Test functions values
	81	# expect_equal( op$f(x), naive_f(link,M1,M2,M3, p,β,b) )
	82	#
	83	# # Test finite differences ~= gradient values
	84	# dir_h <- rep(0, (2+d)*K-1)
	85	# dir_h[var] = h
	86	# expect_equal(op$grad_f(x)[var], (op$f(x+dir_h) - op$f(x)) / h, tol)
	87	# }
	88	# }
	89	# }
	90	#})
	91
	92	test_that("W computed in C and in R are the same",
	93	{
	94	tol <- 1e-8
	95	n <- 500
	96	for (dK in list( c(2,2), c(5,3)))
	97	{
	98	d <- dK[1]
	99	K <- dK[2]
	100	link <- ifelse(d==2, "logit", "probit")
	101	θ <- list(
	102	p=rep(1/K,K),
	103	β=matrix(runif(d*K),ncol=K),
	104	b=rep(0,K))
	105	io <- generateSampleIO(n, θ$p, θ$β, θ$b, link)
	106	X <- io$X
	107	Y <- io$Y
	108	dd <- d + d^2 + d^3
	109	p <- θ$p
	110	β <- θ$β
	111	λ <- sqrt(colSums(β^2))
	112	b <- θ$b
	113	β2 <- apply(β, 2, function(col) col %o% col)
	114	β3 <- apply(β, 2, function(col) col %o% col %o% col)
	115	M <- c(
	116	β %% (p .G(link,1,λ,b)),
	117	β2 %% (p .G(link,2,λ,b)),
	118	β3 %% (p .G(link,3,λ,b)))
	119	Id <- as.double(diag(d))
	120	E <- diag(d)
	121	v1 <- Y * X
	122	v2 <- Y * t( apply(X, 1, function(Xi) Xi %o% Xi - Id) )
	123	v3 <- Y * t( apply(X, 1, function(Xi) { return (Xi %o% Xi %o% Xi
	124	- Reduce('+', lapply(1:d, function(j)
	125	as.double(Xi %o% E[j,] %o% E[j,])), rep(0, ddd))
	126	- Reduce('+', lapply(1:d, function(j)
	127	as.double(E[j,] %o% Xi %o% E[j,])), rep(0, ddd))
	128	- Reduce('+', lapply(1:d, function(j)
	129	as.double(E[j,] %o% E[j,] %o% Xi)), rep(0, ddd))) } ) )
	130	Omega1 <- matrix(0, nrow=dd, ncol=dd)
	131	for (i in 1:n)
	132	{
	133	gi <- t(as.matrix(c(v1[i,], v2[i,], v3[i,]) - M))
	134	Omega1 <- Omega1 + t(gi) %*% gi / n
	135	}
	136	W <- matrix(0, nrow=dd, ncol=dd)
	137	Omega2 <- matrix( .C("Compute_Omega",
	138	X=as.double(X), Y=as.integer(Y), M=as.double(M),
	139	pn=as.integer(n), pd=as.integer(d),
	140	W=as.double(W), PACKAGE="morpheus")$W, nrow=dd, ncol=dd )
	141	rg <- range(Omega1 - Omega2)
	142	expect_equal(rg[1], rg[2], tol)
	143	}
	144	})