PROJOT: Orthogonal Tensor projection
In PTAk: Principal Tensor Analysis on k Modes
PROJOT R Documentation
Orthogonal Tensor projection
Description
Orthogonal-tensoriel projection of a tensor according to a rank-1
tensor, or a to bigger structure defined by kronecker product of
matrices.
Usage
PROJOT(X,solu,numo=1,bortho=TRUE,Ortho=TRUE,metrics=NULL)
Arguments
X
a tensor(as an array) of any order
solu
an object like a solutions.PTAk object with at least v
numo
a vector of numbers or a list of vectors (length the order of the
tensor) identifying for each space the structure to project onto, if
NULL for a specific space then no projection is done for this space
bortho
list of logicals saying if the structures are othogonal
or not.
Ortho
list of logicals telling the projectors on each space to be on the
structure or on its orthogonal.
metrics
NULL or list of metrics (either diagonal or not) for each entry of X
Details
This function computes the tensorial orthogonal projection of
X onto the tensorial structure defined by solu
and numo. For each space (involved in the tensorial product
where from X belongs), one defined the projector onto
solu[[i]]$v[numo,] (or on its orthogonal if
Ortho[[i]]==TRUE), then the result is the image of X by
the tensorial product of the projectors, i.e.
(P_{S1} \otimes P_{S2} \otimes \ldots \otimes P_{Sk})(X)
.
Value
A tensor with dimensions as X
Note
For PTA-kmodes the projection used is only on rank-one tensors
(Principal Tensors), i.e. numo is a number. The code
here can be used for any structure (on each spaces) and constitutes
the projector onto a tensorial structure, and can define the
PTAIV-kmodes (PTAk on Instrumental Variables Leibovici(1993).
(see other references for tensorial product of linear operators in
Leibovici(2000) e.g. Dauxois et al.(1994))
Author(s)
Didier G. Leibovici GeotRycs@gmail.com
References
Leibovici D(1993) Facteurs <e0> Mesures R<e9>p<e9>t<e9>es et Analyses Factorielles :
applications <e0> un suivi <e9>pid<e9>miologique. Universit<e9> de Montpellier
II. PhD Thesis in Math<e9>matiques et Applications (Biostatistiques).
Leibovici D (2000) Multiway Multidimensional Analysis for
Pharmaco-EEG Studies. http://www.fmrib.ox.ac.uk/analysis/techrep/tr00dl2/tr00dl2.pdf
See Also
PTAk
Examples
don <- array(1:360,c(5,4,6,3))
don <- don + rnorm(360,10,2)
ones <- list(list(v=rep(1,5)),list(v=rep(1,4)),list(v=rep(1,6)),list(v=rep(1,3)))
donfc <- PROJOT(don,ones)
apply(donfc,c(2,3,4),mean)
apply(donfc,c(1),mean)
# implementation de PTAIVk with obvious settings
PTAIVk <- function(X,STruct,...)
{X <- PROJOT(X$data,STruct,numo=Struct[[1]]$numo,Ortho=Struct[[1]]$Ortho,metrics=X$met)
PTAk(X,...)
}
PTAk documentation built on March 31, 2023, 5:17 p.m.
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
| PROJOT | R Documentation |
Orthogonal Tensor projection
Description
Orthogonal-tensoriel projection of a tensor according to a rank-1 tensor, or a to bigger structure defined by kronecker product of matrices.
Usage
PROJOT(X,solu,numo=1,bortho=TRUE,Ortho=TRUE,metrics=NULL)
Arguments
X |
a tensor(as an array) of any order |
solu |
an object like a |
numo |
a vector of numbers or a list of vectors (length the order of the tensor) identifying for each space the structure to project onto, if NULL for a specific space then no projection is done for this space |
bortho |
list of logicals saying if the structures are othogonal or not. |
Ortho |
list of logicals telling the projectors on each space to be on the structure or on its orthogonal. |
metrics |
NULL or list of metrics (either diagonal or not) for each entry of |
Details
This function computes the tensorial orthogonal projection of
X onto the tensorial structure defined by solu
and numo. For each space (involved in the tensorial product
where from X belongs), one defined the projector onto
solu[[i]]$v[numo,] (or on its orthogonal if
Ortho[[i]]==TRUE), then the result is the image of X by
the tensorial product of the projectors, i.e.
(P_{S1} \otimes P_{S2} \otimes \ldots \otimes P_{Sk})(X)
.
Value
A tensor with dimensions as X
Note
For PTA-kmodes the projection used is only on rank-one tensors
(Principal Tensors), i.e. numo is a number. The code
here can be used for any structure (on each spaces) and constitutes
the projector onto a tensorial structure, and can define the
PTAIV-kmodes (PTAk on Instrumental Variables Leibovici(1993).
(see other references for tensorial product of linear operators in
Leibovici(2000) e.g. Dauxois et al.(1994))
Author(s)
Didier G. Leibovici GeotRycs@gmail.com
References
Leibovici D(1993) Facteurs <e0> Mesures R<e9>p<e9>t<e9>es et Analyses Factorielles : applications <e0> un suivi <e9>pid<e9>miologique. Universit<e9> de Montpellier II. PhD Thesis in Math<e9>matiques et Applications (Biostatistiques).
Leibovici D (2000) Multiway Multidimensional Analysis for Pharmaco-EEG Studies. http://www.fmrib.ox.ac.uk/analysis/techrep/tr00dl2/tr00dl2.pdf
See Also
PTAk
Examples
don <- array(1:360,c(5,4,6,3))
don <- don + rnorm(360,10,2)
ones <- list(list(v=rep(1,5)),list(v=rep(1,4)),list(v=rep(1,6)),list(v=rep(1,3)))
donfc <- PROJOT(don,ones)
apply(donfc,c(2,3,4),mean)
apply(donfc,c(1),mean)
# implementation de PTAIVk with obvious settings
PTAIVk <- function(X,STruct,...)
{X <- PROJOT(X$data,STruct,numo=Struct[[1]]$numo,Ortho=Struct[[1]]$Ortho,metrics=X$met)
PTAk(X,...)
}
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
Embedding an R snippet on your website
Add the following code to your website.
For more information on customizing the embed code, read Embedding Snippets.