qtKostkaPolynomials: qt-Kostka polynomials
In stla/jackR: Jack, Zonal, Schur, and Other Symmetric Polynomials
View source: R/qtKostkaPolynomials.R
qtKostkaPolynomials R Documentation
qt-Kostka polynomials
Description
qt-Kostka polynomials, aka Kostka-Macdonald polynomials.
Usage
qtKostkaPolynomials(mu)
Arguments
mu
integer partition
Value
A list. The qt-Kostka polynomials are usually denoted by
K_{\lambda, \mu}(q, t) where q and t denote the two
variables and \lambda and \mu are two integer partitions.
One obtains the Kostka-Foulkes polynomials by substituting q
with 0.
For a given partition \mu, the function returns the
polynomials K_{\lambda, \mu}(q, t) as qspray objects
for all partitions \lambda of the same weight as \mu. The
generated list is a list of lists with two elements: the integer
partition \lambda and the polynomial.
stla/jackR documentation built on Sept. 1, 2024, 11:07 a.m.
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View source: R/qtKostkaPolynomials.R
| qtKostkaPolynomials | R Documentation |
qt-Kostka polynomials
Description
qt-Kostka polynomials, aka Kostka-Macdonald polynomials.
Usage
qtKostkaPolynomials(mu)
Arguments
mu |
integer partition |
Value
A list. The qt-Kostka polynomials are usually denoted by
K_{\lambda, \mu}(q, t) where q and t denote the two
variables and \lambda and \mu are two integer partitions.
One obtains the Kostka-Foulkes polynomials by substituting q
with 0.
For a given partition \mu, the function returns the
polynomials K_{\lambda, \mu}(q, t) as qspray objects
for all partitions \lambda of the same weight as \mu. The
generated list is a list of lists with two elements: the integer
partition \lambda and the polynomial.
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.
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