ipop: Quadratic Programming Solver
In kernlab: Kernel-Based Machine Learning Lab
ipop R Documentation
Quadratic Programming Solver
Description
ipop solves the quadratic programming problem :
\min(c'*x + 1/2 * x' * H * x)
subject to:
b <= A * x <= b + r
l <= x <= u
Usage
ipop(c, H, A, b, l, u, r, sigf = 7, maxiter = 40, margin = 0.05,
bound = 10, verb = 0)
Arguments
c
Vector or one column matrix appearing in the quadratic function
H
square matrix appearing in the quadratic function, or the
decomposed form Z of the H matrix where Z is a
n x m matrix with n > m and ZZ' = H.
A
Matrix defining the constrains under which we minimize the
quadratic function
b
Vector or one column matrix defining the constrains
l
Lower bound vector or one column matrix
u
Upper bound vector or one column matrix
r
Vector or one column matrix defining constrains
sigf
Precision (default: 7 significant figures)
maxiter
Maximum number of iterations
margin
how close we get to the constrains
bound
Clipping bound for the variables
verb
Display convergence information during runtime
Details
ipop uses an interior point method to solve the quadratic programming
problem.
The H matrix can also be provided in the decomposed form Z
where ZZ' = H in that case the Sherman Morrison Woodbury formula
is used internally.
Value
An S4 object with the following slots
primal
Vector containing the primal solution of the quadratic problem
dual
The dual solution of the problem
how
Character string describing the type of convergence
all slots can be accessed through accessor functions (see example)
Author(s)
Alexandros Karatzoglou (based on Matlab code by Alex Smola)
alexandros.karatzoglou@ci.tuwien.ac.at
References
R. J. Vanderbei
LOQO: An interior point code for quadratic programming
Optimization Methods and Software 11, 451-484, 1999
https://vanderbei.princeton.edu/ps/loqo5.pdf
See Also
solve.QP, inchol, csi
Examples
## solve the Support Vector Machine optimization problem
data(spam)
## sample a scaled part (500 points) of the spam data set
m <- 500
set <- sample(1:dim(spam)[1],m)
x <- scale(as.matrix(spam[,-58]))[set,]
y <- as.integer(spam[set,58])
y[y==2] <- -1
##set C parameter and kernel
C <- 5
rbf <- rbfdot(sigma = 0.1)
## create H matrix etc.
H <- kernelPol(rbf,x,,y)
c <- matrix(rep(-1,m))
A <- t(y)
b <- 0
l <- matrix(rep(0,m))
u <- matrix(rep(C,m))
r <- 0
sv <- ipop(c,H,A,b,l,u,r)
sv
dual(sv)
kernlab documentation built on Feb. 16, 2023, 10:13 p.m.
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| ipop | R Documentation |
Quadratic Programming Solver
Description
ipop solves the quadratic programming problem :
\min(c'*x + 1/2 * x' * H * x)
subject to:
b <= A * x <= b + r
l <= x <= u
Usage
ipop(c, H, A, b, l, u, r, sigf = 7, maxiter = 40, margin = 0.05,
bound = 10, verb = 0)
Arguments
c |
Vector or one column matrix appearing in the quadratic function |
H |
square matrix appearing in the quadratic function, or the decomposed form Z of the H matrix where Z is a n x m matrix with n > m and ZZ' = H. |
A |
Matrix defining the constrains under which we minimize the quadratic function |
b |
Vector or one column matrix defining the constrains |
l |
Lower bound vector or one column matrix |
u |
Upper bound vector or one column matrix |
r |
Vector or one column matrix defining constrains |
sigf |
Precision (default: 7 significant figures) |
maxiter |
Maximum number of iterations |
margin |
how close we get to the constrains |
bound |
Clipping bound for the variables |
verb |
Display convergence information during runtime |
Details
ipop uses an interior point method to solve the quadratic programming
problem.
The H matrix can also be provided in the decomposed form Z
where ZZ' = H in that case the Sherman Morrison Woodbury formula
is used internally.
Value
An S4 object with the following slots
primal |
Vector containing the primal solution of the quadratic problem |
dual |
The dual solution of the problem |
how |
Character string describing the type of convergence |
all slots can be accessed through accessor functions (see example)
Author(s)
Alexandros Karatzoglou (based on Matlab code by Alex Smola)
alexandros.karatzoglou@ci.tuwien.ac.at
References
R. J. Vanderbei
LOQO: An interior point code for quadratic programming
Optimization Methods and Software 11, 451-484, 1999
https://vanderbei.princeton.edu/ps/loqo5.pdf
See Also
solve.QP, inchol, csi
Examples
## solve the Support Vector Machine optimization problem data(spam) ## sample a scaled part (500 points) of the spam data set m <- 500 set <- sample(1:dim(spam)[1],m) x <- scale(as.matrix(spam[,-58]))[set,] y <- as.integer(spam[set,58]) y[y==2] <- -1 ##set C parameter and kernel C <- 5 rbf <- rbfdot(sigma = 0.1) ## create H matrix etc. H <- kernelPol(rbf,x,,y) c <- matrix(rep(-1,m)) A <- t(y) b <- 0 l <- matrix(rep(0,m)) u <- matrix(rep(C,m)) r <- 0 sv <- ipop(c,H,A,b,l,u,r) sv dual(sv)
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We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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