A Closed Formula for the Decomposition of the Kronecker Product of Irreducible Representations of SU(n)

We introduce a new family of \(\mathbb{Z}\) bases for the ring of \(S_{n}\) characters and give their transition matrices explicitly. Applying one of these bases, we introduce a recursive formula for the Kronecker product of two characters. Another application is a sufficient condition for the vanis

## Abstract A simple and compact formula of dipole mutual impedance is presented. This method gives an analytical expression of mutual impedance between two real, thick center‐fed dipoles in a general geometrical configuration for small distances. The results of this new formulation show a good agr

A rlosed formula for the rule of LITTLEW~OD/RICHARDSOX is given. By specialization closed formulas are gotten for the decomposition of representations of gZ( V) and pZ( V) resp. where V is a vector space (graduate vector space) over 6. Math. Nadir. 161 (1991) We order to this partion a YOUNG frame

## Abstract The aim of this paper is to derive an integral representation formula for the effective elasticity tensor for a two‐component well‐ordered composite of elastic materials without using a third reference medium and without assuming the completeness of the eigenspace of the operator __Ĝ__

## Abstract Assmus [1] gave a description of the binary code spanned by the blocks of a Steiner triple or quadruple system according to the 2‐rank of the incidence matrix. Using this description, the author [13] found a formula for the total number of distinct Steiner triple systems on 2^__n__^−1 p