AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, without computations of determinants or matrices, most of the algebra of Hankel determinants and explains their links with other classical fields
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
AbstractSome algebraic identities are presented which give expansions for determinants of square mat...
AbstractIn this paper we describe planar decompositions of skew shape tableaux into strips and use t...
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, witho...
AbstractWe develop a general context for the computation of the determinant of a Hankel matrix Hn = ...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
Hankel determinants of sequences related to Bernoulli and Euler numbers have been studied before, an...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
AbstractSome algebraic identities are presented which give expansions for determinants of square mat...
AbstractIn this paper we describe planar decompositions of skew shape tableaux into strips and use t...
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, witho...
AbstractWe develop a general context for the computation of the determinant of a Hankel matrix Hn = ...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
Hankel determinants of sequences related to Bernoulli and Euler numbers have been studied before, an...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
Our recent paper provides extensions to two classical determinantal results of Bressoud and Wei, and...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
AbstractSome algebraic identities are presented which give expansions for determinants of square mat...
AbstractIn this paper we describe planar decompositions of skew shape tableaux into strips and use t...
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