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Update of Local score

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Paul-Corbalan 2022-04-05 09:17:58 +02:00
parent bf50e2294c
commit 7e8eb49d95
1 changed files with 80 additions and 51 deletions
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Comparaison_of_methods.rmd
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@ -22,9 +22,12 @@ SimulationH1 <- function(lambda0, lambda1,T,tau){
ppH0_avant=ppH0bis[which(ppH0bis<ppH1.repo[1])] ppH0_avant=ppH0bis[which(ppH0bis<ppH1.repo[1])]
ppH0_apres=ppH0bis[which(ppH0bis>ppH1.repo[length(ppH1.repo)])] ppH0_apres=ppH0bis[which(ppH0bis>ppH1.repo[length(ppH1.repo)])]
ppH1=c(ppH0_avant,ppH1.repo,ppH0_apres) ppH1=c(ppH0_avant,ppH1.repo,ppH0_apres)
return (ppH1) return (c(ppH1,which(ppH1==min(ppH1.repo))))
} }
```
```{r}
TimeBetweenEvent <- function(pp){ TimeBetweenEvent <- function(pp){
n=length(pp) n=length(pp)
tbe=pp[2:n]-pp[1:n1-1] tbe=pp[2:n]-pp[1:n1-1]
@ -93,30 +96,39 @@ tau=1
ppH0=PoissonProcess(lambda0,T) ppH0=PoissonProcess(lambda0,T)
CDF=Plot_CDF(lambda0,n_sample,T,tau) CDF=Plot_CDF(lambda0,n_sample,T,tau)
``` ```
```{r}
n_sample=10**4
lambda1=4
T=10
tau=1
ppH0=PoissonProcess(lambda1,T)
CDF=Plot_CDF(lambda1,n_sample,T,tau)
```
```{r} ```{r}
PValue <- function(Emp,ppH1, T, tau){ PValue <- function(Emp,ppH1, T, tau){
scanH1=ScanStat(ppH1,T,tau)[2] scanH1=ScanStat(ppH1,T,tau)[2]
index_scanH1=ScanStat(ppH1,T,tau)[1]
index=Emp$index_scan index=Emp$index_scan
n=length(index) n=length(index)
if (scanH1< min(Emp$index_scan)){ if (scanH1< min(Emp$index_scan)){
return (c(scanH1,1)) return (c(scanH1,1,index_scanH1))
} else{ } else{
if(min(Emp$index_scan)<scanH1 && scanH1<=max(Emp$index_scan)){ if(min(Emp$index_scan)<scanH1 && scanH1<=max(Emp$index_scan)){
return(c(scanH1,1-Emp$cdf[scanH1-min(Emp$index_scan)+1])) return(c(scanH1,1-Emp$cdf[scanH1-min(Emp$index_scan)+1],index_scanH1))
} else{return (c(scanH1,0))}} } else{return (c(scanH1,0,index_scanH1))}}
} }
``` ```
### 2.2. Simulation under $\mathcal{H}_0$ and computation of p-values ### 2.2. Simulation under $\mathcal{H}_0$ and computation of p-values
On simule des séquences sous $\mathcal{H}_0$, que l'on stocke. On calcule la valeur de la scan stat et de la p-value, que l'on stocke aussi. On a une séquence de p-valeur des scans et une séquence de score local. On simule des séquences sous $\mathcal{H}_0$, que l'on stocke. On calcule la valeur de la scan stat et de la p-value, que l'on stocke aussi. On a une séquence de p-valeur des scans et une séquence de score local.
```{r} ```{r}
NbSeqH0=5 NbSeqH0=5000
NbSeqH1=5 NbSeqH1=NbSeqH0
DataH0=vector("list") DataH0=vector("list")
DataH1=vector("list") DataH1=vector("list")
lambda0=3 lambda0=3
lambda1=5 lambda1=4
T=10 T=10
tau=1 tau=1
@ -127,9 +139,11 @@ for (i in 1:NbSeqH0) {
} }
#Creation of a sequence that contains the sequence simulated under the alternative hypothesis #Creation of a sequence that contains the sequence simulated under the alternative hypothesis
seqH1begin=c()
for (i in 1:NbSeqH1) { for (i in 1:NbSeqH1) {
pphi=SimulationH1(lambda0, lambda1,T,tau) pphi=SimulationH1(lambda0, lambda1,T,tau)
DataH1[[i]]=pphi DataH1[[i]]=pphi[1]
seqH1begin=c(pphi[2],seqH1begin)
} }
#Computation of the time between events #Computation of the time between events
@ -152,6 +166,7 @@ We compute the p-value associated to all 5 sequences, and stock them in a vector
Emp=EmpDistrib(lambda0,n_sample,T,tau) Emp=EmpDistrib(lambda0,n_sample,T,tau)
scan=c() scan=c()
pvalue=c() pvalue=c()
index_scan=c()
#Then, we stock the p-value and the #Then, we stock the p-value and the
for (i in 1:NbSeqH0){ for (i in 1:NbSeqH0){
@ -159,12 +174,64 @@ for (i in 1:NbSeqH0){
result=PValue(Emp,DataH0[[i]],T,tau) result=PValue(Emp,DataH0[[i]],T,tau)
scan=c(scan,result[1]) scan=c(scan,result[1])
pvalue=c(pvalue,result[2]) pvalue=c(pvalue,result[2])
cat(paste("\nSimulation for the sequence", i, ", for lambda0=",lambda0, " ,lambda1=", lambda1, " , scan=", result[1] ,"p-value=",result[2])) index_scan=c(index_scan,result[3])
#cat(paste("\nSimulation for the sequence", i, ", for lambda0=",lambda0, " ,lambda1=", lambda1, " , scan=", result[1] ,"p-value=",result[2]))
#print(length(ppi))
} }
ScS_H0=data.frame(num=1:NbSeqH0, index=scan, pvalue_scan=pvalue, class=(pvalue<0.05)) ScS_H0=data.frame(num=1:NbSeqH0, scan_stat=scan, pvalue_scan=pvalue, class=(pvalue<0.05), begin_scan=index_scan)
ScS_H0 sum(ScS_H0$class[which(ScS_H0$class==TRUE)])/NbSeqH0
``` ```
## 3.Local score
```{r}
#We start by computing the empirical distribution for lambda0
scan=c()
pvalue=c()
index_scan=c()
#Then, we stock the p-value and the
for (i in 1:NbSeqH1){
ppi=DataH1[[i]]
result=PValue(Emp,DataH1[[i]],T,tau)
scan=c(scan,result[1])
pvalue=c(pvalue,result[2])
index_scan=c(index_scan,result[3])
#cat(paste("\nSimulation for the sequence", i, ", for lambda0=",lambda0, " ,lambda1=", lambda1, " , scan=", result[1] ,"p-value=",result[2]))
#print(length(ppi))
}
ScS_H1=data.frame(num=1:NbSeqH1, scan_stat=scan, pvalue_scan=pvalue, class=(pvalue<0.05), begin_scan=index_scan, begin_seq_H1=seqH1begin)
sum(ScS_H1$class[which(ScS_H0$class==TRUE)])/NbSeqH1
ScS_H1
```
## 3. Local score
### Distribution des scores via Monte-Carlo
```{r}
# Calcul du choix de E
E = 1
maxXk = floor(E*(log(lambda1/lambda0)))
maxXk
while (maxXk < 3) {
E = E+1
maxXk = floor(E*(log(lambda1/lambda0)))
}
print(E)
ppH0 = PoissonProcess(lambda0,10^4)
n1 = length(ppH0)
tbe0 = ppH0[2:n1]-ppH0[1:n1-1]
print(ks.test(tbe0,'exp'))
x = floor(E*(log(lambda1/lambda0)+(lambda0-lambda1)*tbe0)) # ne pas mettre le floor ni le E (certes égale à 1)
#hist(x)
#print(summary(x))
P_X = table(factor(x, levels = min(x):max(x)))
P_X = P_X/sum(table(x))
#print(dist.theo.scores) # Mettre à jour avec Elisa
print(P_X)
```
### Calcul du local score
```{r} ```{r}
library("localScore") library("localScore")
library(Rcpp) library(Rcpp)
@ -176,7 +243,7 @@ for (i in 1:NbSeqH0){
max_X = max(X) max_X = max(X)
min_X = min(X) min_X = min(X)
P_X = table(factor(X, levels = min_X:max_X))/length(X) P_X = table(factor(X, levels = min_X:max_X))/length(X) # supprimer pour les séquences de MC
LS=localScoreC(X)$localScore[1] LS=localScoreC(X)$localScore[1]
@ -188,41 +255,3 @@ LS_H0=data.frame(num=1:NbSeqH0, pvalue_scan=pvalue, class=(pvalue<0.05))
LS_H0 LS_H0
``` ```
## A reformater
```{r}
# distribtion des scores via MC
# Nb seq. pp -> Nb seq. tbe -> dist. tbe (vérif) + Nb seq. Scores -> distr scores
A = 1/(lambda0-lambda1)
B = A*log(lambda1/lambda0)
ppH1 = PoissonProcess(lambda1,T)
n1 = length(ppH1)
tbe1 = ppH1[2:n1]-ppH1[1:n1-1]
print(tbe1)
print(ks.test(tbe1,'exp'))
x = log(lambda1/lambda0)+(lambda0-lambda1)*tbe1 # ne pas mettre le floor ni le E (certes égale à 1)
hist(x)
print(summary(x))
# Calcul du maximum des scores
E = 1
# THEO à faire !!! max.s = log(lambda1/lambda0)
maxXk = floor(E*(log(lambda1/lambda0)))
maxXk
while (maxXk < 3) {
E = E+1
maxXk = floor(E*(log(lambda1/lambda0)))
}
print(E)
x = floor(E*(log(lambda1/lambda0)+(lambda0-lambda1)*tbe1))
dist.emp.scores = table(x)/sum(table(x))
dist.emp.scores
hist(x)
print(range(x))
x.verif = seq(range(x)[1],range(x)[2],1)
dist.theo.scores = lambda0*exp(-lambda0*(A*x.verif-B))
print(dist.theo.scores)
print(dist.emp.scores)
```