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

#' initialization of the EM algorithm 
#'
#' @param k number of components
#' @param X matrix of covariates (of size n*p)
#' @param Y matrix of responses (of size n*m)
#'
#' @return a list with phiInit, rhoInit, piInit, gamInit
#' @export
#' @importFrom methods new
#' @importFrom stats cutree dist hclust runif
initSmallEM <- function(k, X, Y, fast)
{
  n <- nrow(Y)
  m <- ncol(Y)
  p <- ncol(X)
  nIte <- 20
  Zinit1 <- array(0, dim = c(n, nIte))
  betaInit1 <- array(0, dim = c(p, m, k, nIte))
  sigmaInit1 <- array(0, dim = c(m, m, k, nIte))
  phiInit1 <- array(0, dim = c(p, m, k, nIte))
  rhoInit1 <- array(0, dim = c(m, m, k, nIte))
  Gam <- matrix(0, n, k)
  piInit1 <- matrix(0, nIte, k)
  gamInit1 <- array(0, dim = c(n, k, nIte))
  LLFinit1 <- list()

  # require(MASS) #Moore-Penrose generalized inverse of matrix
  for (repet in 1:nIte)
  {
    distance_clus <- dist(cbind(X, Y))
    tree_hier <- hclust(distance_clus)
    Zinit1[, repet] <- cutree(tree_hier, k)

    for (r in 1:k)
    {
      Z <- Zinit1[, repet]
      Z_indice <- seq_len(n)[Z == r]  #renvoit les indices où Z==r
      if (length(Z_indice) == 1) {
        betaInit1[, , r, repet] <- MASS::ginv(crossprod(t(X[Z_indice, ]))) %*% 
          crossprod(t(X[Z_indice, ]), Y[Z_indice, ])
      } else {
        betaInit1[, , r, repet] <- MASS::ginv(crossprod(X[Z_indice, ])) %*% 
          crossprod(X[Z_indice, ], Y[Z_indice, ])
      }
      sigmaInit1[, , r, repet] <- diag(m)
      phiInit1[, , r, repet] <- betaInit1[, , r, repet]  #/ sigmaInit1[,,r,repet]
      rhoInit1[, , r, repet] <- solve(sigmaInit1[, , r, repet])
      piInit1[repet, r] <- mean(Z == r)
    }

    for (i in 1:n)
    {
      for (r in 1:k)
      {
        dotProduct <- tcrossprod(Y[i, ] %*% rhoInit1[, , r, repet]
          - X[i, ] %*% phiInit1[, , r, repet])
        Gam[i, r] <- piInit1[repet, r] * 
          det(rhoInit1[, , r, repet]) * exp(-0.5 * dotProduct)
      }
      sumGamI <- sum(Gam[i, ])
      gamInit1[i, , repet] <- Gam[i, ]/sumGamI
    }

    miniInit <- 10
    maxiInit <- 11

    init_EMG <- EMGLLF(phiInit1[, , , repet], rhoInit1[, , , repet], piInit1[repet, ],
      gamInit1[, , repet], miniInit, maxiInit, gamma = 1, lambda = 0, X, Y,
      eps = 1e-04, fast)
    LLFinit1[[repet]] <- init_EMG$llh
  }
  b <- which.min(LLFinit1)
  phiInit <- phiInit1[, , , b]
  rhoInit <- rhoInit1[, , , b]
  piInit <- piInit1[b, ]
  gamInit <- gamInit1[, , b]

  return(list(phiInit = phiInit, rhoInit = rhoInit, piInit = piInit, gamInit = gamInit))
}
Commit	Line	Data
ffdf9447	1	#' initialization of the EM algorithm
d1531659	2	#'
	3	#' @param k number of components
	4	#' @param X matrix of covariates (of size n*p)
	5	#' @param Y matrix of responses (of size n*m)
d1531659	6	#'
	7	#' @return a list with phiInit, rhoInit, piInit, gamInit
	8	#' @export
e3f2fe8a	9	#' @importFrom methods new
e3f2fe8a	10	#' @importFrom stats cutree dist hclust runif
a3cbbaea	11	initSmallEM <- function(k, X, Y, fast)
39046da6	12	{
ffdf9447 BA	13	n <- nrow(Y)
	14	m <- ncol(Y)
	15	p <- ncol(X)
	16	nIte <- 20
	17	Zinit1 <- array(0, dim = c(n, nIte))
	18	betaInit1 <- array(0, dim = c(p, m, k, nIte))
	19	sigmaInit1 <- array(0, dim = c(m, m, k, nIte))
	20	phiInit1 <- array(0, dim = c(p, m, k, nIte))
	21	rhoInit1 <- array(0, dim = c(m, m, k, nIte))
	22	Gam <- matrix(0, n, k)
	23	piInit1 <- matrix(0, nIte, k)
	24	gamInit1 <- array(0, dim = c(n, k, nIte))
	25	LLFinit1 <- list()
1b698c16	26
ffdf9447 BA	27	# require(MASS) #Moore-Penrose generalized inverse of matrix
	28	for (repet in 1:nIte)
	29	{
	30	distance_clus <- dist(cbind(X, Y))
	31	tree_hier <- hclust(distance_clus)
	32	Zinit1[, repet] <- cutree(tree_hier, k)
1b698c16	33
ffdf9447 BA	34	for (r in 1:k)
	35	{
	36	Z <- Zinit1[, repet]
	37	Z_indice <- seq_len(n)[Z == r] #renvoit les indices où Z==r
1b698c16	38	if (length(Z_indice) == 1) {
ffdf9447 BA	39	betaInit1[, , r, repet] <- MASS::ginv(crossprod(t(X[Z_indice, ]))) %*%
ffdf9447 BA	40	crossprod(t(X[Z_indice, ]), Y[Z_indice, ])
1b698c16	41	} else {
ffdf9447 BA	42	betaInit1[, , r, repet] <- MASS::ginv(crossprod(X[Z_indice, ])) %*%
	43	crossprod(X[Z_indice, ], Y[Z_indice, ])
	44	}
	45	sigmaInit1[, , r, repet] <- diag(m)
	46	phiInit1[, , r, repet] <- betaInit1[, , r, repet] #/ sigmaInit1[,,r,repet]
	47	rhoInit1[, , r, repet] <- solve(sigmaInit1[, , r, repet])
	48	piInit1[repet, r] <- mean(Z == r)
	49	}
1b698c16	50
ffdf9447 BA	51	for (i in 1:n)
	52	{
	53	for (r in 1:k)
	54	{
1b698c16 BA	55	dotProduct <- tcrossprod(Y[i, ] %*% rhoInit1[, , r, repet]
1b698c16 BA	56	- X[i, ] %*% phiInit1[, , r, repet])
96b591b7	57	Gam[i, r] <- piInit1[repet, r] *
96b591b7	58	det(rhoInit1[, , r, repet]) * exp(-0.5 * dotProduct)
ffdf9447 BA	59	}
	60	sumGamI <- sum(Gam[i, ])
	61	gamInit1[i, , repet] <- Gam[i, ]/sumGamI
	62	}
1b698c16	63
ffdf9447 BA	64	miniInit <- 10
ffdf9447 BA	65	maxiInit <- 11
1b698c16 BA	66
	67	init_EMG <- EMGLLF(phiInit1[, , , repet], rhoInit1[, , , repet], piInit1[repet, ],
	68	gamInit1[, , repet], miniInit, maxiInit, gamma = 1, lambda = 0, X, Y,
	69	eps = 1e-04, fast)
a3cbbaea	70	LLFinit1[[repet]] <- init_EMG$llh
ffdf9447 BA	71	}
	72	b <- which.min(LLFinit1)
	73	phiInit <- phiInit1[, , , b]
	74	rhoInit <- rhoInit1[, , , b]
	75	piInit <- piInit1[b, ]
	76	gamInit <- gamInit1[, , b]
1b698c16	77
ffdf9447	78	return(list(phiInit = phiInit, rhoInit = rhoInit, piInit = piInit, gamInit = gamInit))
39046da6	79	}