Quantum Multiplication of Schur Polynomials

Finding a combinatorial rule for the multiplication of Schubert polynomials is a long standing problem. In this paper we give a combinatorial proof of the extended Pieri rule as conjectured by N. Bergeron and S. Billey, which says how to multiply a Schubert polynomial by a complete or elementary sym

Considering the exponential growth of the size of the coefficients of the Schur-Cohn transforms of a polynomial, we define new polynomials proportional to the latter and whose coefficients remain small. These Schur-Cohn sub-transforms replace the Schur-Cohn transforms in the computation of the numbe

The purpose of this paper is, to establish, by extensive use of the minor summation formula of pfaffians exploited in (Ishikawa, Okada, and Wakayama, J. Algebra 183, 193 216) certain new generating functions involving Schur polynomials which have a product representation. This generating function gi

This paper deals with Hermite Pade polynomials in the case where the multiple orthogonality condition is related to semiclassical functionals. The polynomials, introduced in such a way, are a generalization of classical orthogonal polynomials (Jacobi, Laguerre, Hermite, and Bessel polynomials). They

## Abstract In the first part of this series we characterized all linear operators on spaces of multivariate polynomials preserving the property of being nonvanishing in products of open circular domains. For such sets this completes the multivariate generalization of the classification program ini