tepGPLS: Generalized Partial Least Squares
In TExPosition: Two-Table ExPosition
Description
Usage
Arguments
Details
Value
Author(s)
References
See Also
Examples
Description
Generalized Partial Least Squares (GPLS) via TExPosition. GPLS is to PLS (tepPLS) as PCA epPCA is to GPCA epGPCA.
The major difference between PLS and GPLS is that GPLS allows the use of weights for the columns of each data set (just like GPCA).
Usage
1
2
3
4
5
6
Arguments
DATA1
Data matrix 1 (X)
DATA2
Data matrix 2 (Y)
center1
a boolean, vector, or string to center DATA1. See expo.scale for details.
scale1
a boolean, vector, or string to scale DATA1. See expo.scale for details.
center2
a boolean, vector, or string to center DATA2. See expo.scale for details.
scale2
a boolean, vector, or string to scale DATA2. See expo.scale for details.
DESIGN
a design matrix to indicate if rows belong to groups.
make_design_nominal
a boolean. If TRUE (default), DESIGN is a vector that indicates groups (and will be dummy-coded). If FALSE, DESIGN is a dummy-coded matrix.
weights1
a weight vector (or diag matrix) for the columns of DATA1.
weights2
a weight vector (or diag matrix) for the columns of DATA2.
graphs
a boolean. If TRUE (default), graphs and plots are provided (via tepGraphs)
k
number of components to return.
Details
This implementation of Partial Least Squares is a symmetric analysis. It was first described by Tucker (1958), again by Bookstein (1994), and has gained notoriety in Neuroimaging from McIntosh et al., (1996). This particular implementation allows the user to provide weights for the columns of both DATA1 and DATA2.
Value
See epGPCA (and also corePCA) for details on what is returned. In addition to the values returned:
lx
latent variables from DATA1 computed for observations
ly
latent variables from DATA2 computed for observations
data1.norm
center and scale information for DATA1
data1.norm
center and scale information for DATA2
Author(s)
Derek Beaton
References
Tucker, L. R. (1958). An inter-battery method of factor analysis. Psychometrika, 23(2), 111–136.
Bookstein, F., (1994). Partial least squares: a dose–response model for measurement in the behavioral and brain sciences. Psycoloquy 5 (23)
Abdi, H. (2007). Singular Value Decomposition (SVD) and Generalized Singular Value Decomposition (GSVD). In N.J. Salkind (Ed.): Encyclopedia of Measurement and Statistics.Thousand Oaks (CA): Sage. pp. 907-912.
Krishnan, A., Williams, L. J., McIntosh, A. R., & Abdi, H. (2011). Partial Least Squares (PLS) methods for neuroimaging: A tutorial and review. NeuroImage, 56(2), 455 – 475.
McIntosh, A. R., & Lobaugh, N. J. (2004). Partial least squares analysis of neuroimaging data: applications and advances. Neuroimage, 23, S250–S263.
See Also
corePCA, epPCA, epGPCA, tepPLS, tepPLSCA, tepBADA, tepDICA
Examples
1
2
3
4
TExPosition documentation built on May 2, 2019, 7:27 a.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.
Description Usage Arguments Details Value Author(s) References See Also Examples
Description
Generalized Partial Least Squares (GPLS) via TExPosition. GPLS is to PLS (tepPLS) as PCA epPCA is to GPCA epGPCA.
The major difference between PLS and GPLS is that GPLS allows the use of weights for the columns of each data set (just like GPCA).
Usage
1 2 3 4 5 6 |
Arguments
DATA1 |
Data matrix 1 (X) |
DATA2 |
Data matrix 2 (Y) |
center1 |
a boolean, vector, or string to center |
scale1 |
a boolean, vector, or string to scale |
center2 |
a boolean, vector, or string to center |
scale2 |
a boolean, vector, or string to scale |
DESIGN |
a design matrix to indicate if rows belong to groups. |
make_design_nominal |
a boolean. If TRUE (default), DESIGN is a vector that indicates groups (and will be dummy-coded). If FALSE, DESIGN is a dummy-coded matrix. |
weights1 |
a weight vector (or diag matrix) for the columns of DATA1. |
weights2 |
a weight vector (or diag matrix) for the columns of DATA2. |
graphs |
a boolean. If TRUE (default), graphs and plots are provided (via |
k |
number of components to return. |
Details
This implementation of Partial Least Squares is a symmetric analysis. It was first described by Tucker (1958), again by Bookstein (1994), and has gained notoriety in Neuroimaging from McIntosh et al., (1996). This particular implementation allows the user to provide weights for the columns of both DATA1 and DATA2.
Value
See epGPCA (and also corePCA) for details on what is returned. In addition to the values returned:
lx |
latent variables from DATA1 computed for observations |
ly |
latent variables from DATA2 computed for observations |
data1.norm |
center and scale information for DATA1 |
data1.norm |
center and scale information for DATA2 |
Author(s)
Derek Beaton
References
Tucker, L. R. (1958). An inter-battery method of factor analysis. Psychometrika, 23(2), 111–136.
Bookstein, F., (1994). Partial least squares: a dose–response model for measurement in the behavioral and brain sciences. Psycoloquy 5 (23)
Abdi, H. (2007). Singular Value Decomposition (SVD) and Generalized Singular Value Decomposition (GSVD). In N.J. Salkind (Ed.): Encyclopedia of Measurement and Statistics.Thousand Oaks (CA): Sage. pp. 907-912.
Krishnan, A., Williams, L. J., McIntosh, A. R., & Abdi, H. (2011). Partial Least Squares (PLS) methods for neuroimaging: A tutorial and review. NeuroImage, 56(2), 455 – 475.
McIntosh, A. R., & Lobaugh, N. J. (2004). Partial least squares analysis of neuroimaging data: applications and advances. Neuroimage, 23, S250–S263.
See Also
corePCA, epPCA, epGPCA, tepPLS, tepPLSCA, tepBADA, tepDICA
Examples
1 2 3 4 |
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.