projects / valse.git / blame
| 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 |
| 10 | #' @importFrom stats cutree dist hclust runif | |
| ffdf9447 | 11 | initSmallEM <- function(k, X, Y, fast = TRUE) |
| 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() | |
| 26 | ||
| 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) | |
| 33 | ||
| 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 | |
| 38 | if (length(Z_indice) == 1) | |
| 39 | { | |
| 40 | betaInit1[, , r, repet] <- MASS::ginv(crossprod(t(X[Z_indice, ]))) %*% | |
| 41 | crossprod(t(X[Z_indice, ]), Y[Z_indice, ]) | |
| 42 | } else | |
| 43 | { | |
| 44 | betaInit1[, , r, repet] <- MASS::ginv(crossprod(X[Z_indice, ])) %*% | |
| 45 | crossprod(X[Z_indice, ], Y[Z_indice, ]) | |
| 46 | } | |
| 47 | sigmaInit1[, , r, repet] <- diag(m) | |
| 48 | phiInit1[, , r, repet] <- betaInit1[, , r, repet] #/ sigmaInit1[,,r,repet] | |
| 49 | rhoInit1[, , r, repet] <- solve(sigmaInit1[, , r, repet]) | |
| 50 | piInit1[repet, r] <- mean(Z == r) | |
| 51 | } | |
| 52 | ||
| 53 | for (i in 1:n) | |
| 54 | { | |
| 55 | for (r in 1:k) | |
| 56 | { | |
| 57 | dotProduct <- tcrossprod(Y[i, ] %*% rhoInit1[, , r, repet] - X[i, | |
| 58 | ] %*% phiInit1[, , r, repet]) | |
| 59 | Gam[i, r] <- piInit1[repet, r] * det(rhoInit1[, , r, repet]) * exp(-0.5 * | |
| 60 | dotProduct) | |
| 61 | } | |
| 62 | sumGamI <- sum(Gam[i, ]) | |
| 63 | gamInit1[i, , repet] <- Gam[i, ]/sumGamI | |
| 64 | } | |
| 65 | ||
| 66 | miniInit <- 10 | |
| 67 | maxiInit <- 11 | |
| 68 | ||
| 69 | init_EMG <- EMGLLF(phiInit1[, , , repet], rhoInit1[, , , repet], piInit1[repet, | |
| 70 | ], gamInit1[, , repet], miniInit, maxiInit, gamma = 1, lambda = 0, X, | |
| 71 | Y, eps = 1e-04, fast) | |
| 72 | LLFEessai <- init_EMG$LLF | |
| 73 | LLFinit1[repet] <- LLFEessai[length(LLFEessai)] | |
| 74 | } | |
| 75 | b <- which.min(LLFinit1) | |
| 76 | phiInit <- phiInit1[, , , b] | |
| 77 | rhoInit <- rhoInit1[, , , b] | |
| 78 | piInit <- piInit1[b, ] | |
| 79 | gamInit <- gamInit1[, , b] | |
| 80 | ||
| 81 | return(list(phiInit = phiInit, rhoInit = rhoInit, piInit = piInit, gamInit = gamInit)) | |
| 39046da6 | 82 | } |
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