[valse.git] / pkg / R / EMGLLF.R

#' EMGLLF 
#'
#' Description de EMGLLF
#'
#' @param phiInit an initialization for phi
#' @param rhoInit an initialization for rho
#' @param piInit an initialization for pi
#' @param gamInit initialization for the a posteriori probabilities
#' @param mini integer, minimum number of iterations in the EM algorithm, by default = 10
#' @param maxi integer, maximum number of iterations in the EM algorithm, by default = 100
#' @param gamma integer for the power in the penaly, by default = 1
#' @param lambda regularization parameter in the Lasso estimation
#' @param X matrix of covariates (of size n*p)
#' @param Y matrix of responses (of size n*m)
#' @param eps real, threshold to say the EM algorithm converges, by default = 1e-4
#'
#' @return A list ... phi,rho,pi,LLF,S,affec:
#'   phi : parametre de moyenne renormalisé, calculé par l'EM
#'   rho : parametre de variance renormalisé, calculé par l'EM
#'   pi : parametre des proportions renormalisé, calculé par l'EM
#'   LLF : log vraisemblance associée à cet échantillon, pour les valeurs estimées des paramètres
#'   S : ... affec : ...
#'
#' @export
EMGLLF <- function(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda, 
  X, Y, eps, fast = TRUE)
  {
  if (!fast)
  {
    # Function in R
    return(.EMGLLF_R(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda, 
      X, Y, eps))
  }
  
  # Function in C
  n <- nrow(X)  #nombre d'echantillons
  p <- ncol(X)  #nombre de covariables
  m <- ncol(Y)  #taille de Y (multivarié)
  k <- length(piInit)  #nombre de composantes dans le mélange
  .Call("EMGLLF", phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda, 
    X, Y, eps, phi = double(p * m * k), rho = double(m * m * k), pi = double(k), 
    LLF = double(maxi), S = double(p * m * k), affec = integer(n), n, p, m, k, 
    PACKAGE = "valse")
}

# R version - slow but easy to read
.EMGLLF_R <- function(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda, 
  X2, Y, eps)
  {
  # Matrix dimensions
  n <- dim(Y)[1]
  if (length(dim(phiInit)) == 2)
  {
    p <- 1
    m <- dim(phiInit)[1]
    k <- dim(phiInit)[2]
  } else
  {
    p <- dim(phiInit)[1]
    m <- dim(phiInit)[2]
    k <- dim(phiInit)[3]
  }
  X <- matrix(nrow = n, ncol = p)
  X[1:n, 1:p] <- X2
  # Outputs
  phi <- array(NA, dim = c(p, m, k))
  phi[1:p, , ] <- phiInit
  rho <- rhoInit
  pi <- piInit
  llh <- -Inf
  S <- array(0, dim = c(p, m, k))
  
  # Algorithm variables
  gam <- gamInit
  Gram2 <- array(0, dim = c(p, p, k))
  ps2 <- array(0, dim = c(p, m, k))
  X2 <- array(0, dim = c(n, p, k))
  Y2 <- array(0, dim = c(n, m, k))
  EPS <- 1e-15
  
  for (ite in 1:maxi)
  {
    # Remember last pi,rho,phi values for exit condition in the end of loop
    Phi <- phi
    Rho <- rho
    Pi <- pi
    
    # Computations associated to X and Y
    for (r in 1:k)
    {
      for (mm in 1:m) Y2[, mm, r] <- sqrt(gam[, r]) * Y[, mm]
      for (i in 1:n) X2[i, , r] <- sqrt(gam[i, r]) * X[i, ]
      for (mm in 1:m) ps2[, mm, r] <- crossprod(X2[, , r], Y2[, mm, r])
      for (j in 1:p)
      {
        for (s in 1:p) Gram2[j, s, r] <- crossprod(X2[, j, r], X2[, s, r])
      }
    }
    
    ######### M step #
    
    # For pi
    b <- sapply(1:k, function(r) sum(abs(phi[, , r])))
    gam2 <- colSums(gam)
    a <- sum(gam %*% log(pi))
    
    # While the proportions are nonpositive
    kk <- 0
    pi2AllPositive <- FALSE
    while (!pi2AllPositive)
    {
      pi2 <- pi + 0.1^kk * ((1/n) * gam2 - pi)
      pi2AllPositive <- all(pi2 >= 0)
      kk <- kk + 1
    }
    
    # t(m) is the largest value in the grid O.1^k such that it is nonincreasing
    while (kk < 1000 && -a/n + lambda * sum(pi^gamma * b) < -sum(gam2 * log(pi2))/n + 
      lambda * sum(pi2^gamma * b))
      {
      pi2 <- pi + 0.1^kk * (1/n * gam2 - pi)
      kk <- kk + 1
    }
    t <- 0.1^kk
    pi <- (pi + t * (pi2 - pi))/sum(pi + t * (pi2 - pi))
    
    # For phi and rho
    for (r in 1:k)
    {
      for (mm in 1:m)
      {
        ps <- 0
        for (i in 1:n) ps <- ps + Y2[i, mm, r] * sum(X2[i, , r] * phi[, mm, 
          r])
        nY2 <- sum(Y2[, mm, r]^2)
        rho[mm, mm, r] <- (ps + sqrt(ps^2 + 4 * nY2 * gam2[r]))/(2 * nY2)
      }
    }
    
    for (r in 1:k)
    {
      for (j in 1:p)
      {
        for (mm in 1:m)
        {
          S[j, mm, r] <- -rho[mm, mm, r] * ps2[j, mm, r] + sum(phi[-j, mm, 
          r] * Gram2[j, -j, r])
          if (abs(S[j, mm, r]) <= n * lambda * (pi[r]^gamma))
          {
          phi[j, mm, r] <- 0
          } else if (S[j, mm, r] > n * lambda * (pi[r]^gamma))
          {
          phi[j, mm, r] <- (n * lambda * (pi[r]^gamma) - S[j, mm, r])/Gram2[j, 
            j, r]
          } else
          {
          phi[j, mm, r] <- -(n * lambda * (pi[r]^gamma) + S[j, mm, r])/Gram2[j, 
            j, r]
          }
        }
      }
    }
    
    ######## E step#
    
    # Precompute det(rho[,,r]) for r in 1...k
    detRho <- sapply(1:k, function(r) det(rho[, , r]))
    gam1 <- matrix(0, nrow = n, ncol = k)
    for (i in 1:n)
    {
      # Update gam[,]
      for (r in 1:k) gam1[i, r] <- pi[r] * exp(-0.5 * sum((Y[i, ] %*% rho[, 
        , r] - X[i, ] %*% phi[, , r])^2)) * detRho[r]
    }
    gam <- gam1/rowSums(gam1)
    sumLogLLH <- sum(log(rowSums(gam)) - log((2 * base::pi)^(m/2)))
    sumPen <- sum(pi^gamma * b)
    last_llh <- llh
    llh <- -sumLogLLH/n + lambda * sumPen
    dist <- ifelse(ite == 1, llh, (llh - last_llh)/(1 + abs(llh)))
    Dist1 <- max((abs(phi - Phi))/(1 + abs(phi)))
    Dist2 <- max((abs(rho - Rho))/(1 + abs(rho)))
    Dist3 <- max((abs(pi - Pi))/(1 + abs(Pi)))
    dist2 <- max(Dist1, Dist2, Dist3)
    
    if (ite >= mini && (dist >= eps || dist2 >= sqrt(eps))) 
      break
  }
  
  list(phi = phi, rho = rho, pi = pi, llh = llh, S = S)
}
Commit	Line	Data
ffdf9447	1	#' EMGLLF
4fed76cc BA	2	#'
	3	#' Description de EMGLLF
	4	#'
43d76c49	5	#' @param phiInit an initialization for phi
	6	#' @param rhoInit an initialization for rho
	7	#' @param piInit an initialization for pi
	8	#' @param gamInit initialization for the a posteriori probabilities
	9	#' @param mini integer, minimum number of iterations in the EM algorithm, by default = 10
	10	#' @param maxi integer, maximum number of iterations in the EM algorithm, by default = 100
	11	#' @param gamma integer for the power in the penaly, by default = 1
	12	#' @param lambda regularization parameter in the Lasso estimation
	13	#' @param X matrix of covariates (of size n*p)
	14	#' @param Y matrix of responses (of size n*m)
	15	#' @param eps real, threshold to say the EM algorithm converges, by default = 1e-4
4fed76cc	16	#'
c280fe59 BA	17	#' @return A list ... phi,rho,pi,LLF,S,affec:
	18	#' phi : parametre de moyenne renormalisé, calculé par l'EM
	19	#' rho : parametre de variance renormalisé, calculé par l'EM
	20	#' pi : parametre des proportions renormalisé, calculé par l'EM
	21	#' LLF : log vraisemblance associée à cet échantillon, pour les valeurs estimées des paramètres
	22	#' S : ... affec : ...
4fed76cc	23	#'
4fed76cc	24	#' @export
ffdf9447 BA	25	EMGLLF <- function(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda,
	26	X, Y, eps, fast = TRUE)
	27	{
fb6e49cb	28	if (!fast)
	29	{
	30	# Function in R
ffdf9447 BA	31	return(.EMGLLF_R(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda,
ffdf9447 BA	32	X, Y, eps))
fb6e49cb	33	}
	34
	35	# Function in C
ffdf9447 BA	36	n <- nrow(X) #nombre d'echantillons
	37	p <- ncol(X) #nombre de covariables
	38	m <- ncol(Y) #taille de Y (multivarié)
	39	k <- length(piInit) #nombre de composantes dans le mélange
	40	.Call("EMGLLF", phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda,
	41	X, Y, eps, phi = double(p * m * k), rho = double(m * m * k), pi = double(k),
	42	LLF = double(maxi), S = double(p * m * k), affec = integer(n), n, p, m, k,
	43	PACKAGE = "valse")
4fed76cc	44	}
aa480ac1 BA	45
aa480ac1 BA	46	# R version - slow but easy to read
ffdf9447 BA	47	.EMGLLF_R <- function(phiInit, rhoInit, piInit, gamInit, mini, maxi, gamma, lambda,
	48	X2, Y, eps)
	49	{
fb6e49cb	50	# Matrix dimensions
ffdf9447 BA	51	n <- dim(Y)[1]
	52	if (length(dim(phiInit)) == 2)
	53	{
	54	p <- 1
	55	m <- dim(phiInit)[1]
	56	k <- dim(phiInit)[2]
	57	} else
	58	{
	59	p <- dim(phiInit)[1]
	60	m <- dim(phiInit)[2]
	61	k <- dim(phiInit)[3]
fb6e49cb	62	}
ffdf9447 BA	63	X <- matrix(nrow = n, ncol = p)
ffdf9447 BA	64	X[1:n, 1:p] <- X2
fb6e49cb	65	# Outputs
ffdf9447 BA	66	phi <- array(NA, dim = c(p, m, k))
	67	phi[1:p, , ] <- phiInit
	68	rho <- rhoInit
	69	pi <- piInit
	70	llh <- -Inf
	71	S <- array(0, dim = c(p, m, k))
fb6e49cb	72
fb6e49cb	73	# Algorithm variables
ffdf9447 BA	74	gam <- gamInit
	75	Gram2 <- array(0, dim = c(p, p, k))
	76	ps2 <- array(0, dim = c(p, m, k))
	77	X2 <- array(0, dim = c(n, p, k))
	78	Y2 <- array(0, dim = c(n, m, k))
	79	EPS <- 1e-15
fb6e49cb	80
	81	for (ite in 1:maxi)
	82	{
	83	# Remember last pi,rho,phi values for exit condition in the end of loop
ffdf9447 BA	84	Phi <- phi
	85	Rho <- rho
	86	Pi <- pi
fb6e49cb	87
	88	# Computations associated to X and Y
	89	for (r in 1:k)
	90	{
ffdf9447 BA	91	for (mm in 1:m) Y2[, mm, r] <- sqrt(gam[, r]) * Y[, mm]
	92	for (i in 1:n) X2[i, , r] <- sqrt(gam[i, r]) * X[i, ]
	93	for (mm in 1:m) ps2[, mm, r] <- crossprod(X2[, , r], Y2[, mm, r])
fb6e49cb	94	for (j in 1:p)
fb6e49cb	95	{
ffdf9447	96	for (s in 1:p) Gram2[j, s, r] <- crossprod(X2[, j, r], X2[, s, r])
fb6e49cb	97	}
	98	}
	99
ffdf9447	100	######### M step #
fb6e49cb	101
fb6e49cb	102	# For pi
ffdf9447 BA	103	b <- sapply(1:k, function(r) sum(abs(phi[, , r])))
	104	gam2 <- colSums(gam)
	105	a <- sum(gam %*% log(pi))
fb6e49cb	106
fb6e49cb	107	# While the proportions are nonpositive
ffdf9447 BA	108	kk <- 0
ffdf9447 BA	109	pi2AllPositive <- FALSE
fb6e49cb	110	while (!pi2AllPositive)
fb6e49cb	111	{
ffdf9447 BA	112	pi2 <- pi + 0.1^kk * ((1/n) * gam2 - pi)
	113	pi2AllPositive <- all(pi2 >= 0)
	114	kk <- kk + 1
fb6e49cb	115	}
	116
	117	# t(m) is the largest value in the grid O.1^k such that it is nonincreasing
ffdf9447 BA	118	while (kk < 1000 && -a/n + lambda * sum(pi^gamma * b) < -sum(gam2 * log(pi2))/n +
	119	lambda * sum(pi2^gamma * b))
	120	{
	121	pi2 <- pi + 0.1^kk * (1/n * gam2 - pi)
	122	kk <- kk + 1
fb6e49cb	123	}
ffdf9447 BA	124	t <- 0.1^kk
ffdf9447 BA	125	pi <- (pi + t * (pi2 - pi))/sum(pi + t * (pi2 - pi))
fb6e49cb	126
ffdf9447	127	# For phi and rho
fb6e49cb	128	for (r in 1:k)
	129	{
	130	for (mm in 1:m)
	131	{
ffdf9447 BA	132	ps <- 0
	133	for (i in 1:n) ps <- ps + Y2[i, mm, r] * sum(X2[i, , r] * phi[, mm,
	134	r])
	135	nY2 <- sum(Y2[, mm, r]^2)
	136	rho[mm, mm, r] <- (ps + sqrt(ps^2 + 4 * nY2 * gam2[r]))/(2 * nY2)
fb6e49cb	137	}
	138	}
	139
	140	for (r in 1:k)
	141	{
	142	for (j in 1:p)
	143	{
	144	for (mm in 1:m)
	145	{
ffdf9447 BA	146	S[j, mm, r] <- -rho[mm, mm, r] * ps2[j, mm, r] + sum(phi[-j, mm,
ffdf9447 BA	147	r] * Gram2[j, -j, r])
f7e157cd BA	148	if (abs(S[j, mm, r]) <= n * lambda * (pi[r]^gamma))
	149	{
	150	phi[j, mm, r] <- 0
	151	} else if (S[j, mm, r] > n * lambda * (pi[r]^gamma))
	152	{
ffdf9447	153	phi[j, mm, r] <- (n * lambda * (pi[r]^gamma) - S[j, mm, r])/Gram2[j,
f7e157cd BA	154	j, r]
	155	} else
	156	{
	157	phi[j, mm, r] <- -(n * lambda * (pi[r]^gamma) + S[j, mm, r])/Gram2[j,
	158	j, r]
	159	}
fb6e49cb	160	}
	161	}
	162	}
	163
ffdf9447	164	######## E step#
fb6e49cb	165
fb6e49cb	166	# Precompute det(rho[,,r]) for r in 1...k
ffdf9447 BA	167	detRho <- sapply(1:k, function(r) det(rho[, , r]))
ffdf9447 BA	168	gam1 <- matrix(0, nrow = n, ncol = k)
fb6e49cb	169	for (i in 1:n)
	170	{
	171	# Update gam[,]
f7e157cd BA	172	for (r in 1:k) gam1[i, r] <- pi[r] * exp(-0.5 * sum((Y[i, ] %*% rho[,
f7e157cd BA	173	, r] - X[i, ] %% phi[, , r])^2)) detRho[r]
fb6e49cb	174	}
ffdf9447 BA	175	gam <- gam1/rowSums(gam1)
	176	sumLogLLH <- sum(log(rowSums(gam)) - log((2 * base::pi)^(m/2)))
	177	sumPen <- sum(pi^gamma * b)
	178	last_llh <- llh
	179	llh <- -sumLogLLH/n + lambda * sumPen
	180	dist <- ifelse(ite == 1, llh, (llh - last_llh)/(1 + abs(llh)))
	181	Dist1 <- max((abs(phi - Phi))/(1 + abs(phi)))
	182	Dist2 <- max((abs(rho - Rho))/(1 + abs(rho)))
	183	Dist3 <- max((abs(pi - Pi))/(1 + abs(Pi)))
	184	dist2 <- max(Dist1, Dist2, Dist3)
fb6e49cb	185
ffdf9447	186	if (ite >= mini && (dist >= eps \|\| dist2 >= sqrt(eps)))
fb6e49cb	187	break
	188	}
	189
ffdf9447	190	list(phi = phi, rho = rho, pi = pi, llh = llh, S = S)
aa480ac1	191	}