constrain-set: Add non-linear constraints to latent variable model
In lava: Latent Variable Models
constrain<- R Documentation
Add non-linear constraints to latent variable model
Description
Add non-linear constraints to latent variable model
Usage
## Default S3 replacement method:
constrain(x,par,args,endogenous=TRUE,...) <- value
## S3 replacement method for class 'multigroup'
constrain(x,par,k=1,...) <- value
constraints(object,data=model.frame(object),vcov=object$vcov,level=0.95,
p=pars.default(object),k,idx,...)
Arguments
x
lvm-object
...
Additional arguments to be passed to the low level functions
value
Real function taking args as a vector argument
par
Name of new parameter. Alternatively a formula with lhs
specifying the new parameter and the rhs defining the names of the
parameters or variable names defining the new parameter (overruling the
args argument).
args
Vector of variables names or parameter names that are used in
defining par
endogenous
TRUE if variable is endogenous (sink node)
k
For multigroup models this argument specifies which group to
add/extract the constraint
object
lvm-object
data
Data-row from which possible non-linear constraints should be
calculated
vcov
Variance matrix of parameter estimates
level
Level of confidence limits
p
Parameter vector
idx
Index indicating which constraints to extract
Details
Add non-linear parameter constraints as well as non-linear associations
between covariates and latent or observed variables in the model (non-linear
regression).
As an example we will specify the follow multiple regression model:
E(Y|X_1,X_2) = \alpha + \beta_1 X_1 + \beta_2 X_2
V(Y|X_1,X_2)
= v
which is defined (with the appropiate parameter labels) as
m <- lvm(y ~ f(x,beta1) + f(x,beta2))
intercept(m) <- y ~ f(alpha)
covariance(m) <- y ~ f(v)
The somewhat strained parameter constraint
v =
\frac{(beta1-beta2)^2}{alpha}
can then specified as
constrain(m,v ~ beta1 + beta2 + alpha) <- function(x)
(x[1]-x[2])^2/x[3]
A subset of the arguments args can be covariates in the model,
allowing the specification of non-linear regression models. As an example
the non-linear regression model
E(Y\mid X) = \nu + \Phi(\alpha +
\beta X)
where \Phi denotes the standard normal cumulative
distribution function, can be defined as
m <- lvm(y ~ f(x,0)) # No linear effect of x
Next we add three new parameters using the parameter assigment
function:
parameter(m) <- ~nu+alpha+beta
The intercept of Y is defined as mu
intercept(m) <- y ~ f(mu)
And finally the newly added intercept parameter mu is defined as the
appropiate non-linear function of \alpha, \nu and \beta:
constrain(m, mu ~ x + alpha + nu) <- function(x)
pnorm(x[1]*x[2])+x[3]
The constraints function can be used to show the estimated non-linear
parameter constraints of an estimated model object (lvmfit or
multigroupfit). Calling constrain with no additional arguments
beyound x will return a list of the functions and parameter names
defining the non-linear restrictions.
The gradient function can optionally be added as an attribute grad to
the return value of the function defined by value. In this case the
analytical derivatives will be calculated via the chain rule when evaluating
the corresponding score function of the log-likelihood. If the gradient
attribute is omitted the chain rule will be applied on a numeric
approximation of the gradient.
Value
A lvm object.
Author(s)
Klaus K. Holst
See Also
regression, intercept,
covariance
Examples
##############################
### Non-linear parameter constraints 1
##############################
m <- lvm(y ~ f(x1,gamma)+f(x2,beta))
covariance(m) <- y ~ f(v)
d <- sim(m,100)
m1 <- m; constrain(m1,beta ~ v) <- function(x) x^2
## Define slope of x2 to be the square of the residual variance of y
## Estimate both restricted and unrestricted model
e <- estimate(m,d,control=list(method="NR"))
e1 <- estimate(m1,d)
p1 <- coef(e1)
p1 <- c(p1[1:2],p1[3]^2,p1[3])
## Likelihood of unrestricted model evaluated in MLE of restricted model
logLik(e,p1)
## Likelihood of restricted model (MLE)
logLik(e1)
##############################
### Non-linear regression
##############################
## Simulate data
m <- lvm(c(y1,y2)~f(x,0)+f(eta,1))
latent(m) <- ~eta
covariance(m,~y1+y2) <- "v"
intercept(m,~y1+y2) <- "mu"
covariance(m,~eta) <- "zeta"
intercept(m,~eta) <- 0
set.seed(1)
d <- sim(m,100,p=c(v=0.01,zeta=0.01))[,manifest(m)]
d <- transform(d,
y1=y1+2*pnorm(2*x),
y2=y2+2*pnorm(2*x))
## Specify model and estimate parameters
constrain(m, mu ~ x + alpha + nu + gamma) <- function(x) x[4]*pnorm(x[3]+x[1]*x[2])
## Reduce Ex.Timings
e <- estimate(m,d,control=list(trace=1,constrain=TRUE))
constraints(e,data=d)
## Plot model-fit
plot(y1~x,d,pch=16); points(y2~x,d,pch=16,col="gray")
x0 <- seq(-4,4,length.out=100)
lines(x0,coef(e)["nu"] + coef(e)["gamma"]*pnorm(coef(e)["alpha"]*x0))
##############################
### Multigroup model
##############################
### Define two models
m1 <- lvm(y ~ f(x,beta)+f(z,beta2))
m2 <- lvm(y ~ f(x,psi) + z)
### And simulate data from them
d1 <- sim(m1,500)
d2 <- sim(m2,500)
### Add 'non'-linear parameter constraint
constrain(m2,psi ~ beta2) <- function(x) x
## Add parameter beta2 to model 2, now beta2 exists in both models
parameter(m2) <- ~ beta2
ee <- estimate(list(m1,m2),list(d1,d2),control=list(method="NR"))
summary(ee)
m3 <- lvm(y ~ f(x,beta)+f(z,beta2))
m4 <- lvm(y ~ f(x,beta2) + z)
e2 <- estimate(list(m3,m4),list(d1,d2),control=list(method="NR"))
e2
lava documentation built on Nov. 5, 2023, 1:10 a.m.
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| constrain<- | R Documentation |
Add non-linear constraints to latent variable model
Description
Add non-linear constraints to latent variable model
Usage
## Default S3 replacement method:
constrain(x,par,args,endogenous=TRUE,...) <- value
## S3 replacement method for class 'multigroup'
constrain(x,par,k=1,...) <- value
constraints(object,data=model.frame(object),vcov=object$vcov,level=0.95,
p=pars.default(object),k,idx,...)
Arguments
x |
|
... |
Additional arguments to be passed to the low level functions |
value |
Real function taking args as a vector argument |
par |
Name of new parameter. Alternatively a formula with lhs
specifying the new parameter and the rhs defining the names of the
parameters or variable names defining the new parameter (overruling the
|
args |
Vector of variables names or parameter names that are used in
defining |
endogenous |
TRUE if variable is endogenous (sink node) |
k |
For multigroup models this argument specifies which group to add/extract the constraint |
object |
|
data |
Data-row from which possible non-linear constraints should be calculated |
vcov |
Variance matrix of parameter estimates |
level |
Level of confidence limits |
p |
Parameter vector |
idx |
Index indicating which constraints to extract |
Details
Add non-linear parameter constraints as well as non-linear associations between covariates and latent or observed variables in the model (non-linear regression).
As an example we will specify the follow multiple regression model:
E(Y|X_1,X_2) = \alpha + \beta_1 X_1 + \beta_2 X_2
V(Y|X_1,X_2)
= v
which is defined (with the appropiate parameter labels) as
m <- lvm(y ~ f(x,beta1) + f(x,beta2))
intercept(m) <- y ~ f(alpha)
covariance(m) <- y ~ f(v)
The somewhat strained parameter constraint
v =
\frac{(beta1-beta2)^2}{alpha}
can then specified as
constrain(m,v ~ beta1 + beta2 + alpha) <- function(x)
(x[1]-x[2])^2/x[3]
A subset of the arguments args can be covariates in the model,
allowing the specification of non-linear regression models. As an example
the non-linear regression model
E(Y\mid X) = \nu + \Phi(\alpha +
\beta X)
where \Phi denotes the standard normal cumulative
distribution function, can be defined as
m <- lvm(y ~ f(x,0)) # No linear effect of x
Next we add three new parameters using the parameter assigment
function:
parameter(m) <- ~nu+alpha+beta
The intercept of Y is defined as mu
intercept(m) <- y ~ f(mu)
And finally the newly added intercept parameter mu is defined as the
appropiate non-linear function of \alpha, \nu and \beta:
constrain(m, mu ~ x + alpha + nu) <- function(x)
pnorm(x[1]*x[2])+x[3]
The constraints function can be used to show the estimated non-linear
parameter constraints of an estimated model object (lvmfit or
multigroupfit). Calling constrain with no additional arguments
beyound x will return a list of the functions and parameter names
defining the non-linear restrictions.
The gradient function can optionally be added as an attribute grad to
the return value of the function defined by value. In this case the
analytical derivatives will be calculated via the chain rule when evaluating
the corresponding score function of the log-likelihood. If the gradient
attribute is omitted the chain rule will be applied on a numeric
approximation of the gradient.
Value
A lvm object.
Author(s)
Klaus K. Holst
See Also
regression, intercept,
covariance
Examples
##############################
### Non-linear parameter constraints 1
##############################
m <- lvm(y ~ f(x1,gamma)+f(x2,beta))
covariance(m) <- y ~ f(v)
d <- sim(m,100)
m1 <- m; constrain(m1,beta ~ v) <- function(x) x^2
## Define slope of x2 to be the square of the residual variance of y
## Estimate both restricted and unrestricted model
e <- estimate(m,d,control=list(method="NR"))
e1 <- estimate(m1,d)
p1 <- coef(e1)
p1 <- c(p1[1:2],p1[3]^2,p1[3])
## Likelihood of unrestricted model evaluated in MLE of restricted model
logLik(e,p1)
## Likelihood of restricted model (MLE)
logLik(e1)
##############################
### Non-linear regression
##############################
## Simulate data
m <- lvm(c(y1,y2)~f(x,0)+f(eta,1))
latent(m) <- ~eta
covariance(m,~y1+y2) <- "v"
intercept(m,~y1+y2) <- "mu"
covariance(m,~eta) <- "zeta"
intercept(m,~eta) <- 0
set.seed(1)
d <- sim(m,100,p=c(v=0.01,zeta=0.01))[,manifest(m)]
d <- transform(d,
y1=y1+2*pnorm(2*x),
y2=y2+2*pnorm(2*x))
## Specify model and estimate parameters
constrain(m, mu ~ x + alpha + nu + gamma) <- function(x) x[4]*pnorm(x[3]+x[1]*x[2])
## Reduce Ex.Timings
e <- estimate(m,d,control=list(trace=1,constrain=TRUE))
constraints(e,data=d)
## Plot model-fit
plot(y1~x,d,pch=16); points(y2~x,d,pch=16,col="gray")
x0 <- seq(-4,4,length.out=100)
lines(x0,coef(e)["nu"] + coef(e)["gamma"]*pnorm(coef(e)["alpha"]*x0))
##############################
### Multigroup model
##############################
### Define two models
m1 <- lvm(y ~ f(x,beta)+f(z,beta2))
m2 <- lvm(y ~ f(x,psi) + z)
### And simulate data from them
d1 <- sim(m1,500)
d2 <- sim(m2,500)
### Add 'non'-linear parameter constraint
constrain(m2,psi ~ beta2) <- function(x) x
## Add parameter beta2 to model 2, now beta2 exists in both models
parameter(m2) <- ~ beta2
ee <- estimate(list(m1,m2),list(d1,d2),control=list(method="NR"))
summary(ee)
m3 <- lvm(y ~ f(x,beta)+f(z,beta2))
m4 <- lvm(y ~ f(x,beta2) + z)
e2 <- estimate(list(m3,m4),list(d1,d2),control=list(method="NR"))
e2
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