[valse.git] / src / test / generate_test_data / EMGLLF.R

EMGLLF = function(phiInit,rhoInit,piInit,gamInit,mini,maxi,gamma,lambda,X,Y,tau)
{
  #matrix dimensions
  n = dim(X)[1]
  p = dim(phiInit)[1]
  m = dim(phiInit)[2]
  k = dim(phiInit)[3]
  
  #init outputs
  phi = phiInit
  rho = rhoInit
  pi = piInit
  LLF = rep(0, maxi)
  S = array(0, dim=c(p,m,k))
  
  gam = gamInit
  Gram2 = array(0, dim=c(p,p,k))
  ps2 = array(0, dim=c(p,m,k))
  b = rep(0, k)
  pen = matrix(0, maxi, k)
  X2 = array(0, dim=c(n,p,k))
  Y2 = array(0, dim=c(n,m,k))
  dist = 0
  dist2 = 0
  ite = 1
  pi2 = rep(0, k)
  ps = matrix(0, m,k)
  nY2 = matrix(0, m,k)
  ps1 = array(0, dim=c(n,m,k))
  nY21 = array(0, dim=c(n,m,k))
  Gam = matrix(0, n,k)
  EPS = 1E-15
  
  while(ite <= mini || (ite<= maxi && (dist>= tau || dist2 >= sqrt(tau))))
	{
    Phi = phi
    Rho = rho
    Pi = pi

    #calcul associé à Y et X
    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])
      }
    }
    
    ##########
    #Etape M #
    ##########
    
    #pour pi
    for (r in 1:k)
      b[r] = sum(abs(phi[,,r]))
    gam2 = colSums(gam)
    a = sum(gam %*% log(pi))
    
    #tant que les props sont negatives
    kk = 0
    pi2AllPositive = FALSE
    while (!pi2AllPositive)
		{
      pi2 = pi + 0.1^kk * ((1/n)*gam2 - pi)
      pi2AllPositive = all(pi2 >= 0)
      kk = kk+1
    }

#if (ite==2) browser()
    #t[m] la plus grande valeur dans la grille O.1^k tel que ce soit décroissante ou constante
    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))
    
    #Pour phi et rho
    for (r in 1:k)
		{
      for (mm in 1:m)
			{
        for (i in 1:n)
				{
          ps1[i,mm,r] = Y2[i,mm,r] * sum(X2[i,,r] * phi[,mm,r])
          nY21[i,mm,r] = Y2[i,mm,r]^2
        }
        ps[mm,r] = sum(ps1[,mm,r])
        nY2[mm,r] = sum(nY21[,mm,r])

#TODO: debug rho computation
        rho[mm,mm,r] = (ps[mm,r]+sqrt(ps[mm,r]^2+4*nY2[mm,r]*gam2[r])) / (2*nY2[mm,r])
      }
    }
    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] +
						(if(j>1) sum(phi[1:(j-1),mm,r] * Gram2[j,1:(j-1),r]) else 0) +
						(if(j<p) sum(phi[(j+1):p,mm,r] * Gram2[j,(j+1):p,r]) else 0)
          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]
        }
      }
    }

    ##########
    #Etape E #
    ##########
    sumLogLLF2 = 0
    for (i in 1:n)
		{
      #precompute sq norms to numerically adjust their values
      sqNorm2 = rep(0,k)
      for (r in 1:k)
        sqNorm2[r] = sum( (Y[i,]%*%rho[,,r]-X[i,]%*%phi[,,r])^2 )
      shift = 0.5*min(sqNorm2)

      #compute Gam(:,:) using shift determined above
      sumLLF1 = 0.0;
      for (r in 1:k)
			{
				#FIXME: numerical problems, because 0 < det(Rho[,,r] < EPS; what to do ?!
        #       consequence: error in while() at line 77
				Gam[i,r] = pi[r] * exp(-0.5*sqNorm2[r] + shift) #* det(rho[,,r])
        sumLLF1 = sumLLF1 + Gam[i,r] / (2*base::pi)^(m/2)
      }
      sumLogLLF2 = sumLogLLF2 + log(sumLLF1)
      sumGamI = sum(Gam[i,])
      if(sumGamI > EPS)
        gam[i,] = Gam[i,] / sumGamI
      else
        gam[i,] = rep(0,k)
    }

    sumPen = sum(pi^gamma * b)
    LLF[ite] = -sumLogLLF2/n + lambda*sumPen

    dist = ifelse( ite == 1, LLF[ite], (LLF[ite]-LLF[ite-1]) / (1+abs(LLF[ite])) )

    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)

    ite = ite+1
  }

  return(list("phi"=phi, "rho"=rho, "pi"=pi, "LLF"=LLF, "S"=S))
}
Commit	Line	Data
ef67d338 BA	1	EMGLLF = function(phiInit,rhoInit,piInit,gamInit,mini,maxi,gamma,lambda,X,Y,tau)
ef67d338 BA	2	{
83ed2c0a BG	3	#matrix dimensions
83ed2c0a BG	4	n = dim(X)[1]
c2028869 BG	5	p = dim(phiInit)[1]
	6	m = dim(phiInit)[2]
	7	k = dim(phiInit)[3]
83ed2c0a BG	8
	9	#init outputs
	10	phi = phiInit
	11	rho = rhoInit
ef67d338	12	pi = piInit
83ed2c0a BG	13	LLF = rep(0, maxi)
	14	S = array(0, dim=c(p,m,k))
	15
83ed2c0a BG	16	gam = gamInit
	17	Gram2 = array(0, dim=c(p,p,k))
	18	ps2 = array(0, dim=c(p,m,k))
	19	b = rep(0, k)
	20	pen = matrix(0, maxi, k)
	21	X2 = array(0, dim=c(n,p,k))
6e22eb7b	22	Y2 = array(0, dim=c(n,m,k))
83ed2c0a BG	23	dist = 0
	24	dist2 = 0
	25	ite = 1
ef67d338	26	pi2 = rep(0, k)
83ed2c0a BG	27	ps = matrix(0, m,k)
	28	nY2 = matrix(0, m,k)
	29	ps1 = array(0, dim=c(n,m,k))
	30	nY21 = array(0, dim=c(n,m,k))
	31	Gam = matrix(0, n,k)
	32	EPS = 1E-15
	33
ef67d338 BA	34	while(ite <= mini \|\| (ite<= maxi && (dist>= tau \|\| dist2 >= sqrt(tau))))
ef67d338 BA	35	{
83ed2c0a BG	36	Phi = phi
83ed2c0a BG	37	Rho = rho
ef67d338 BA	38	Pi = pi
ef67d338 BA	39
83ed2c0a	40	#calcul associé à Y et X
ef67d338 BA	41	for(r in 1:k)
	42	{
	43	for (mm in 1:m)
	44	Y2[,mm,r] = sqrt(gam[,r]) * Y[,mm]
	45	for (i in 1:n)
	46	X2[i,,r] = sqrt(gam[i,r]) * X[i,]
	47	for (mm in 1:m)
83ed2c0a	48	ps2[,mm,r] = crossprod(X2[,,r],Y2[,mm,r])
ef67d338 BA	49	for (j in 1:p)
	50	{
	51	for (s in 1:p)
6e22eb7b	52	Gram2[j,s,r] = crossprod(X2[,j,r], X2[,s,r])
83ed2c0a BG	53	}
	54	}
	55
	56	##########
	57	#Etape M #
	58	##########
	59
	60	#pour pi
ef67d338 BA	61	for (r in 1:k)
ef67d338 BA	62	b[r] = sum(abs(phi[,,r]))
87fea89a	63	gam2 = colSums(gam)
ef67d338	64	a = sum(gam %*% log(pi))
83ed2c0a BG	65
	66	#tant que les props sont negatives
	67	kk = 0
	68	pi2AllPositive = FALSE
ef67d338 BA	69	while (!pi2AllPositive)
	70	{
	71	pi2 = pi + 0.1^kk * ((1/n)*gam2 - pi)
	72	pi2AllPositive = all(pi2 >= 0)
83ed2c0a BG	73	kk = kk+1
83ed2c0a BG	74	}
017063cd BA	75
017063cd BA	76	#if (ite==2) browser()
ef67d338 BA	77	#t[m] la plus grande valeur dans la grille O.1^k tel que ce soit décroissante ou constante
	78	while( kk < 1000 && -a/n + lambda * sum(pi^gamma * b) <
	79	-sum(gam2 * log(pi2))/n + lambda * sum(pi2^gamma * b) )
	80	{
	81	pi2 = pi + 0.1^kk * (1/n*gam2 - pi)
	82	kk = kk + 1
83ed2c0a	83	}
ef67d338 BA	84	t = 0.1^kk
ef67d338 BA	85	pi = (pi + t(pi2-pi)) / sum(pi + t(pi2-pi))
83ed2c0a BG	86
83ed2c0a BG	87	#Pour phi et rho
ef67d338 BA	88	for (r in 1:k)
	89	{
	90	for (mm in 1:m)
	91	{
	92	for (i in 1:n)
	93	{
	94	ps1[i,mm,r] = Y2[i,mm,r] * sum(X2[i,,r] * phi[,mm,r])
	95	nY21[i,mm,r] = Y2[i,mm,r]^2
83ed2c0a	96	}
b45ba1b0 BG	97	ps[mm,r] = sum(ps1[,mm,r])
b45ba1b0 BG	98	nY2[mm,r] = sum(nY21[,mm,r])
017063cd BA	99
017063cd BA	100	#TODO: debug rho computation
ef67d338	101	rho[mm,mm,r] = (ps[mm,r]+sqrt(ps[mm,r]^2+4nY2[mm,r]gam2[r])) / (2*nY2[mm,r])
83ed2c0a BG	102	}
83ed2c0a BG	103	}
ef67d338 BA	104	for (r in 1:k)
	105	{
	106	for (j in 1:p)
	107	{
	108	for (mm in 1:m)
	109	{
	110	S[j,mm,r] = -rho[mm,mm,r]*ps2[j,mm,r] +
	111	(if(j>1) sum(phi[1:(j-1),mm,r] * Gram2[j,1:(j-1),r]) else 0) +
	112	(if(j<p) sum(phi[(j+1):p,mm,r] * Gram2[j,(j+1):p,r]) else 0)
	113	if (abs(S[j,mm,r]) <= nlambda(pi[r]^gamma))
83ed2c0a	114	phi[j,mm,r]=0
ef67d338 BA	115	else if(S[j,mm,r] > nlambda(pi[r]^gamma))
	116	phi[j,mm,r] = (nlambda(pi[r]^gamma)-S[j,mm,r]) / Gram2[j,j,r]
	117	else
	118	phi[j,mm,r] = -(nlambda(pi[r]^gamma)+S[j,mm,r]) / Gram2[j,j,r]
83ed2c0a BG	119	}
	120	}
	121	}
ef67d338	122
83ed2c0a BG	123	##########
	124	#Etape E #
	125	##########
	126	sumLogLLF2 = 0
ef67d338 BA	127	for (i in 1:n)
	128	{
	129	#precompute sq norms to numerically adjust their values
	130	sqNorm2 = rep(0,k)
	131	for (r in 1:k)
	132	sqNorm2[r] = sum( (Y[i,]%%rho[,,r]-X[i,]%%phi[,,r])^2 )
	133	shift = 0.5*min(sqNorm2)
	134
83ed2c0a BG	135	#compute Gam(:,:) using shift determined above
83ed2c0a BG	136	sumLLF1 = 0.0;
ef67d338 BA	137	for (r in 1:k)
	138	{
	139	#FIXME: numerical problems, because 0 < det(Rho[,,r] < EPS; what to do ?!
	140	# consequence: error in while() at line 77
46a2e676	141	Gam[i,r] = pi[r] * exp(-0.5sqNorm2[r] + shift) # det(rho[,,r])
ef67d338	142	sumLLF1 = sumLLF1 + Gam[i,r] / (2*base::pi)^(m/2)
83ed2c0a BG	143	}
	144	sumLogLLF2 = sumLogLLF2 + log(sumLLF1)
	145	sumGamI = sum(Gam[i,])
	146	if(sumGamI > EPS)
	147	gam[i,] = Gam[i,] / sumGamI
	148	else
ef67d338	149	gam[i,] = rep(0,k)
83ed2c0a	150	}
ef67d338 BA	151
	152	sumPen = sum(pi^gamma * b)
	153	LLF[ite] = -sumLogLLF2/n + lambda*sumPen
	154
	155	dist = ifelse( ite == 1, LLF[ite], (LLF[ite]-LLF[ite-1]) / (1+abs(LLF[ite])) )
	156
	157	Dist1 = max( (abs(phi-Phi)) / (1+abs(phi)) )
	158	Dist2 = max( (abs(rho-Rho)) / (1+abs(rho)) )
	159	Dist3 = max( (abs(pi-Pi)) / (1+abs(Pi)) )
	160	dist2 = max(Dist1,Dist2,Dist3)
	161
	162	ite = ite+1
83ed2c0a	163	}
ef67d338 BA	164
ef67d338 BA	165	return(list("phi"=phi, "rho"=rho, "pi"=pi, "LLF"=LLF, "S"=S))
87fea89a	166	}