Methods have been developed for analyzing the reduction of the Kronecker products for orthogonal and rotation groups using the S-function methods of D. E. Littlewood. The properties of the spin representations are discussed in some detail and the method of difference characters used in the case of the even-dimensional rotation groups. These methods are amenable to computer calculation and a special programme has been written. A method is given for calculating the branching rules for spin representations under Rn → R3.Des méthodes pour analyser la réduction des produits Kronecker pour les groupes de rotation orthogonale en utilisant des méthodes fonction S de D. E. Littlewood sont développées. Les propriétés des représentations de la rotatio...
We obtain the matrix representation of a three-spin Hamiltonian by straightforward application of th...
The group SL(2,C)(2,C) of all complex 2 × 2 matrices with determinant one is closely related to the ...
The aim of his thesis is to construct matrix representations of the Lie groups Spin(n) = Spin(0, n, ...
Methods have been developed for analyzing the reduction of the Kronecker products for orthogonal and...
The problems of group theory applied in physics often are reduced to the calculation of the dimensio...
We develop Boyle's method to construct symmetrized powers of representations of the rotation group a...
Nous avons développé une chaîne complète de programmes pour le calcul extensif des caractères dans l...
A major open problem in algebraic combinatorics is to find a combinatorial rule to compute the Krone...
In this article, restrictions on the constituents of Kronecker products of spin characters of the do...
One of the most important aspects of Clifford algebras is that they can be used to explicitly constr...
S-functions, as developed by Littlewood, are reviewed with the aim of simplifying the algebra of con...
The use of Schur function methods in the evaluation of Kronecker products of irreducible representat...
S-functions, as developed by D.E. Littlewood, are reviewed and their properties developed and extend...
The ring of symmetric functions is a graded ring with important applications in mathematical physics...
A simple method for the embedding On → Sn of ordinary and spin irreps in both n-dependent notation a...
We obtain the matrix representation of a three-spin Hamiltonian by straightforward application of th...
The group SL(2,C)(2,C) of all complex 2 × 2 matrices with determinant one is closely related to the ...
The aim of his thesis is to construct matrix representations of the Lie groups Spin(n) = Spin(0, n, ...
Methods have been developed for analyzing the reduction of the Kronecker products for orthogonal and...
The problems of group theory applied in physics often are reduced to the calculation of the dimensio...
We develop Boyle's method to construct symmetrized powers of representations of the rotation group a...
Nous avons développé une chaîne complète de programmes pour le calcul extensif des caractères dans l...
A major open problem in algebraic combinatorics is to find a combinatorial rule to compute the Krone...
In this article, restrictions on the constituents of Kronecker products of spin characters of the do...
One of the most important aspects of Clifford algebras is that they can be used to explicitly constr...
S-functions, as developed by Littlewood, are reviewed with the aim of simplifying the algebra of con...
The use of Schur function methods in the evaluation of Kronecker products of irreducible representat...
S-functions, as developed by D.E. Littlewood, are reviewed and their properties developed and extend...
The ring of symmetric functions is a graded ring with important applications in mathematical physics...
A simple method for the embedding On → Sn of ordinary and spin irreps in both n-dependent notation a...
We obtain the matrix representation of a three-spin Hamiltonian by straightforward application of th...
The group SL(2,C)(2,C) of all complex 2 × 2 matrices with determinant one is closely related to the ...
The aim of his thesis is to construct matrix representations of the Lie groups Spin(n) = Spin(0, n, ...