@hackage jackpolynomials1.2.0.0

Jack, zonal, Schur and skew Schur polynomials

jackpolynomials

Jack, zonal, Schur and skew Schur polynomials.

Stack-lts Stack-nightly

Schur polynomials have applications in combinatorics and zonal polynomials have applications in multivariate statistics. They are particular cases of Jack polynomials. This package allows to evaluate these polynomials. It can also compute their symbolic form.


import Math.Algebra.Jack
jack' [1, 1] [3, 1] 2 'J'
-- 48 % 1
import Math.Algebra.JackPol
import Math.Algebra.Hspray
jp = jackPol' 2 [3, 1] 2 'J'
putStrLn $ prettySpray' jp
-- (18 % 1) x1^3x2 + (12 % 1) x1^2x2^2 + (18 % 1) x1x2^3
evalSpray jp [1, 1]
-- 48 % 1

As of version 1.2.0.0, it is possible to get Jack polynomials with a symbolic Jack parameter:

import Math.Algebra.JackSymbolicPol
import Math.Algebra.Hspray
jp = jackSymbolicPol' 2 [3, 1] 'J'
putStrLn $ prettySymbolicQSpray "a" jp
-- ((2) + (4)a + (2)a^2)*x1^3x2 + ((4) + (4)a)*x1^2x2^2 + ((2) + (4)a + (2)a^2)*x1x2^3
putStrLn $ prettySpray' $ evalSymbolicSpray jp 2
-- (18 % 1) x1^3x2 + (12 % 1) x1^2x2^2 + (18 % 1) x1x2^3

From the definition of Jack polynomials, as well as from their implementation in this package, the coefficients of the Jack polynomials are fractions of polynomials in the Jack parameter. However, in the above example, one can see that the coefficients of the Jack polynomial jp are polynomials in the Jack parameter a. This fact actually is always true for the \(J\)-Jack polynomials (not for \(C\), \(P\) and \(Q\)). This is a consequence of the Knop & Sahi combinatorial formula. But be aware that in spite of this fact, the coefficients of the polynomials returned by Haskell are fractions of polynomials (the type of these polynomials is SymbolicSpray, defined in the hspray package).

References

  • I.G. Macdonald. Symmetric Functions and Hall Polynomials. Oxford Mathematical Monographs. The Clarendon Press Oxford University Press, New York, second edition, 1995.

  • J. Demmel and P. Koev. Accurate and efficient evaluation of Schur and Jack functions. Mathematics of computations, vol. 75, n. 253, 223-229, 2005.

  • Jack polynomials. https://www.symmetricfunctions.com/jack.htm.