Add to ORKGModular symmetric functions are a new class of symmetric functions which depend both on a partition ⋋ and an integer modulus p > 2. For p prime, these functions have representation theoretic significance as the irreducible characters of the general linear group G L( n, K) where K is of characteristic p. In this paper we use classical algebraic techniques to prove determinantal identities that are modular analogues to the Jacobi-Trudi, dual Jacobi-Trudi, and Giambelli identities for the classical Schur functions
AbstractWe show that some classical determinants in the theory of symmetric functions can be interpr...
Recently, C. Adiga and the author have derived general formulas to express the product of two theta ...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
The Jacobi-Trudi identity expresses a skew Schur function as a determinant of complete symmetric fun...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
The first Jacobi—Trudi identity expresses Schur polynomials as certain determinants of matrices whos...
AbstractWe give bijective proofs for Jacobi–Trudi-type and Giambelli-type identities for symplectic ...
In this talk we introduce factorial characters for the classical groups and derive a number of centr...
Symplectic and orthogonal Schur functions can be defined combinatorially in a manner similar to the ...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Just as the definition of factorial Schur functions as a ratio of determinants allows one to show th...
AbstractWe give a common, concise derivation of some important determinantal identities attributed t...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
AbstractWe provide a new, simple and direct combinatorial proof of the equivalence of the determinan...
AbstractWe show that some classical determinants in the theory of symmetric functions can be interpr...
Recently, C. Adiga and the author have derived general formulas to express the product of two theta ...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
The Jacobi-Trudi identity expresses a skew Schur function as a determinant of complete symmetric fun...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
The first Jacobi—Trudi identity expresses Schur polynomials as certain determinants of matrices whos...
AbstractWe give bijective proofs for Jacobi–Trudi-type and Giambelli-type identities for symplectic ...
In this talk we introduce factorial characters for the classical groups and derive a number of centr...
Symplectic and orthogonal Schur functions can be defined combinatorially in a manner similar to the ...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
Just as the definition of factorial Schur functions as a ratio of determinants allows one to show th...
AbstractWe give a common, concise derivation of some important determinantal identities attributed t...
AbstractWe translate Goulden's combinatorial proof of the Jacobi-Trudi identity into the language of...
AbstractWe provide a new, simple and direct combinatorial proof of the equivalence of the determinan...
AbstractWe show that some classical determinants in the theory of symmetric functions can be interpr...
Recently, C. Adiga and the author have derived general formulas to express the product of two theta ...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...