Using the generating function of SU(n) we find the conjugate state of SU(n) basis and we find in terms of Gel’fand basis of SU(3(n-1)) the representation of the invariants of the kronecker products of SU(n). We find a formula for the number of the elementary invariants of SU(n). We apply our method to the coupling of SU(3) and we find a new expression of the isoscalar of Wigner symbols (Ȝ10,Ȝ2ȝ2; Ȝ3ȝ3)
AbstractUsing the realization of positive discrete series representations of su(1,1) in terms of a c...
Tables of Clebsch-Gordan coefficients of SU (3) for the reduction of the product (λ, μ) &#...
Based on previous results of the two first authors, it is shown that the combinatorial construction ...
The generating function method that we had developing has various applications in physics and not on...
Abstract We classify the Kronecker products D j 1 ⊗...⊗D jn of su(2)-multiplets that are compatible ...
The use of Schur function methods in the evaluation of Kronecker products of irreducible representat...
A summary of the properties of the Wigner Clebsch-Gordan coefficients and isoscalar factors for the ...
A major open problem in algebraic combinatorics is to find a combinatorial rule to compute the Krone...
The Clebsh-Gordan coefficient formulas are determined using the integration of the product of three ...
We exploit SU(N) Schwinger bosons to construct and analyze the coupled irreducible repre-sentations ...
This thesis treats some aspects of the representation theory of the group SU3. After a survey of pre...
Matrix elements of the group generators for the symmetric irreducible representations of SO(6) are e...
Generalized vector coherent state constructions of totally symmetric U(3) tensors are used to gain n...
We obtain a new family of coherent state representations of SU(n+1), in which the coherent states ar...
AbstractWe prove the path sum formula for computing the U(n) invariant denominator functions associa...
AbstractUsing the realization of positive discrete series representations of su(1,1) in terms of a c...
Tables of Clebsch-Gordan coefficients of SU (3) for the reduction of the product (λ, μ) &#...
Based on previous results of the two first authors, it is shown that the combinatorial construction ...
The generating function method that we had developing has various applications in physics and not on...
Abstract We classify the Kronecker products D j 1 ⊗...⊗D jn of su(2)-multiplets that are compatible ...
The use of Schur function methods in the evaluation of Kronecker products of irreducible representat...
A summary of the properties of the Wigner Clebsch-Gordan coefficients and isoscalar factors for the ...
A major open problem in algebraic combinatorics is to find a combinatorial rule to compute the Krone...
The Clebsh-Gordan coefficient formulas are determined using the integration of the product of three ...
We exploit SU(N) Schwinger bosons to construct and analyze the coupled irreducible repre-sentations ...
This thesis treats some aspects of the representation theory of the group SU3. After a survey of pre...
Matrix elements of the group generators for the symmetric irreducible representations of SO(6) are e...
Generalized vector coherent state constructions of totally symmetric U(3) tensors are used to gain n...
We obtain a new family of coherent state representations of SU(n+1), in which the coherent states ar...
AbstractWe prove the path sum formula for computing the U(n) invariant denominator functions associa...
AbstractUsing the realization of positive discrete series representations of su(1,1) in terms of a c...
Tables of Clebsch-Gordan coefficients of SU (3) for the reduction of the product (λ, μ) &#...
Based on previous results of the two first authors, it is shown that the combinatorial construction ...