AbstractGiven two polynomials f(x) and g(x), we extend the formula expressing the remainder in terms of the roots of these two polynomials to the case where f(x) is a Laurent polynomial. This allows us to give new expressions of a Schur function, which generalize the Giambelli identity
AbstractWe obtain a tableau definition of the skew Schubert polynomials named by Lascoux, which are ...
The understanding of the space of symmetric functions is gained through the study of its bases. Cert...
AbstractSylvester has announced formulas expressing the subresultants (or the successive polynomial ...
AbstractThe Giambelli identity provides a formula for expressing an arbitrary Schur function of shap...
AbstractWhen the Schur function is written as a linear combination of products of symmetric power su...
AbstractWe present several identities involving staircase Schur functions. These identities are then...
The first Jacobi—Trudi identity expresses Schur polynomials as certain determinants of matrices whos...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Abstract. This paper uses the theory of dual equivalence graphs to give explicit Schur expansions to...
AbstractA polynomial identity in q for the principal specialization of the Schur function, sλ(1, q, ...
AbstractThis paper studies a family of polynomials called key polynomials, introduced by Demazure an...
We use the Jacobi-Trudi identity to incorporate several well-known families of symmetric functions t...
We use the Jacobi-Trudi identity to incorporate several well-known families of symmetric functions t...
AbstractWe obtain a tableau definition of the skew Schubert polynomials named by Lascoux, which are ...
AbstractWe obtain a tableau definition of the skew Schubert polynomials named by Lascoux, which are ...
The understanding of the space of symmetric functions is gained through the study of its bases. Cert...
AbstractSylvester has announced formulas expressing the subresultants (or the successive polynomial ...
AbstractThe Giambelli identity provides a formula for expressing an arbitrary Schur function of shap...
AbstractWhen the Schur function is written as a linear combination of products of symmetric power su...
AbstractWe present several identities involving staircase Schur functions. These identities are then...
The first Jacobi—Trudi identity expresses Schur polynomials as certain determinants of matrices whos...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Let $X$ be a symplectic or odd orthogonal Grassmannian. We prove a Giambelli formula which expresses...
Abstract. This paper uses the theory of dual equivalence graphs to give explicit Schur expansions to...
AbstractA polynomial identity in q for the principal specialization of the Schur function, sλ(1, q, ...
AbstractThis paper studies a family of polynomials called key polynomials, introduced by Demazure an...
We use the Jacobi-Trudi identity to incorporate several well-known families of symmetric functions t...
We use the Jacobi-Trudi identity to incorporate several well-known families of symmetric functions t...
AbstractWe obtain a tableau definition of the skew Schubert polynomials named by Lascoux, which are ...
AbstractWe obtain a tableau definition of the skew Schubert polynomials named by Lascoux, which are ...
The understanding of the space of symmetric functions is gained through the study of its bases. Cert...
AbstractSylvester has announced formulas expressing the subresultants (or the successive polynomial ...
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