linear_LPFDA: Locality Preserving Fisher Discriminant Analysis
In Rdimtools: Dimension Reduction and Estimation Methods
do.lpfda R Documentation
Locality Preserving Fisher Discriminant Analysis
Description
Locality Preserving Fisher Discriminant Analysis (LPFDA) is a supervised variant of LPP.
It can also be seemed as an improved version of LDA where the locality structure of the data
is preserved. The algorithm aims at getting a subspace projection matrix by solving a generalized
eigenvalue problem.
Usage
do.lpfda(
X,
label,
ndim = 2,
type = c("proportion", 0.1),
preprocess = c("center", "scale", "cscale", "whiten", "decorrelate"),
t = 10
)
Arguments
X
an (n\times p) matrix or data frame whose rows are observations
and columns represent independent variables.
label
a length-n vector of data class labels.
ndim
an integer-valued target dimension.
type
a vector of neighborhood graph construction. Following types are supported;
c("knn",k), c("enn",radius), and c("proportion",ratio).
Default is c("proportion",0.1), connecting about 1/10 of nearest data points
among all data points. See also aux.graphnbd for more details.
preprocess
an additional option for preprocessing the data.
Default is "center". See also aux.preprocess for more details.
t
bandwidth parameter for heat kernel in (0,\infty).
Value
a named list containing
- Y
an (n\times ndim) matrix whose rows are embedded observations.
- trfinfo
a list containing information for out-of-sample prediction.
- projection
a (p\times ndim) whose columns are basis for projection.
Author(s)
Kisung You
References
\insertRefzhao_locality_2009Rdimtools
Examples
## generate data of 3 types with clear difference
set.seed(100)
dt1 = aux.gensamples(n=20)-50
dt2 = aux.gensamples(n=20)
dt3 = aux.gensamples(n=20)+50
## merge the data and create a label correspondingly
X = rbind(dt1,dt2,dt3)
label = rep(1:3, each=20)
## try different proportion of connected edges
out1 = do.lpfda(X, label, type=c("proportion",0.10))
out2 = do.lpfda(X, label, type=c("proportion",0.25))
out3 = do.lpfda(X, label, type=c("proportion",0.50))
## visualize
opar <- par(no.readonly=TRUE)
par(mfrow=c(1,3))
plot(out1$Y, pch=19, col=label, main="10% connectivity")
plot(out2$Y, pch=19, col=label, main="25% connectivity")
plot(out3$Y, pch=19, col=label, main="50% connectivity")
par(opar)
Rdimtools documentation built on Nov. 5, 2025, 5:28 p.m.
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| do.lpfda | R Documentation |
Locality Preserving Fisher Discriminant Analysis
Description
Locality Preserving Fisher Discriminant Analysis (LPFDA) is a supervised variant of LPP. It can also be seemed as an improved version of LDA where the locality structure of the data is preserved. The algorithm aims at getting a subspace projection matrix by solving a generalized eigenvalue problem.
Usage
do.lpfda(
X,
label,
ndim = 2,
type = c("proportion", 0.1),
preprocess = c("center", "scale", "cscale", "whiten", "decorrelate"),
t = 10
)
Arguments
X |
an |
label |
a length- |
ndim |
an integer-valued target dimension. |
type |
a vector of neighborhood graph construction. Following types are supported;
|
preprocess |
an additional option for preprocessing the data.
Default is "center". See also |
t |
bandwidth parameter for heat kernel in |
Value
a named list containing
- Y
an
(n\times ndim)matrix whose rows are embedded observations.- trfinfo
a list containing information for out-of-sample prediction.
- projection
a
(p\times ndim)whose columns are basis for projection.
Author(s)
Kisung You
References
\insertRefzhao_locality_2009Rdimtools
Examples
## generate data of 3 types with clear difference
set.seed(100)
dt1 = aux.gensamples(n=20)-50
dt2 = aux.gensamples(n=20)
dt3 = aux.gensamples(n=20)+50
## merge the data and create a label correspondingly
X = rbind(dt1,dt2,dt3)
label = rep(1:3, each=20)
## try different proportion of connected edges
out1 = do.lpfda(X, label, type=c("proportion",0.10))
out2 = do.lpfda(X, label, type=c("proportion",0.25))
out3 = do.lpfda(X, label, type=c("proportion",0.50))
## visualize
opar <- par(no.readonly=TRUE)
par(mfrow=c(1,3))
plot(out1$Y, pch=19, col=label, main="10% connectivity")
plot(out2$Y, pch=19, col=label, main="25% connectivity")
plot(out3$Y, pch=19, col=label, main="50% connectivity")
par(opar)
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