Some New Identities for Schur Functions

This paper presents some new product identities for certain summations of Schur functions. These identities are generalizations of some famous identities known to Littlewood and appearing in Macdonald's book. We refer to these identities as the ''Littlewood-type formulas.'' In addition, analogues fo

We give bijective proofs of the Hook-Schur function analogues of two well-known identities of Littlewood. In the course of our proof, we propose a new correspondence which can be considered as a generalization of the Burge correspondences used in proving the Littlewood identities.

We introduce some identities for the derivative of a trigonometric polynomial which are obtained from the identity of Riesz. We then use these new identities to derive some inequalities for derivatives of trigonometric and algebraic polynomials. Among our results are a weighted \(L^{p}\) inequality

We describe a method for calculating the Schur indices of certain characters of finite groups. This method helps, in particular, in the calculation of the Schur indices of the irreducible characters of the special linear groups.

Superconformal Ward identities for N=1 supersymmetric quantum field theories in four dimensions are conveniently obtained in the superfield formalism by combining diffeomorphisms and Weyl transformations on curved superspace. Using this approach we study the superconformal transformation properties