The boson calculus formalism is used to construct realizations of basis states of irreducible representations of unitary groups taking as a paradigm the interacting boson models of atomic nuclei. These realizations, together with a theorem on plethysms for obtaining branching rules, allowed us to obtain a dimension formula for reduced plethysms. © 2005 IOP Publishing Ltd
Recently a new method to calculate the occupancies of single particle levels in atomic nuclei was d...
A short summary of the theory of symmetric group and symmetric functions needed to follow the theory...
Abstract Minimal representations of a real reductive group G are the ‘small-est ’ irreducible unitar...
This thesis presents a physical perspective on group duality. We explain in detail some of the most ...
The present series of papers deals with various realizations of the dynamical group script L signscr...
The representation theory of the unitary groups is of fundamental significance in many areas of phys...
Atoms are indistinguishable particles which can be transformed one into another by the elements of a...
Both non-Hermitian Dyson and Hermitian Holstein-Primakoff representations of the Sp(2d,R) algebra ar...
The boson operator theory of the representations of the unitary group, its Wigner-Clebsch-Gordan, an...
In this paper we consider a basis for N boson states classified by the chain of groups U(6)⊃U(3)⊃U(2...
The many $2^k$-pole boson states, $|N_kv_k\alpha_k I_kM_k>$ with $k=2,3$, realize the irreducible re...
We propose a new boson expansion theory, without using the closed-algebra approximation indispensabl...
The interacting boson model, describing collective states of even-even nuclei, is introduced as a dr...
The representation theory of the unitary groups is of fundamental significance in many areas of phys...
A short summary of the theory of symmetric group and symmetric functions needed to follow the theory...
Recently a new method to calculate the occupancies of single particle levels in atomic nuclei was d...
A short summary of the theory of symmetric group and symmetric functions needed to follow the theory...
Abstract Minimal representations of a real reductive group G are the ‘small-est ’ irreducible unitar...
This thesis presents a physical perspective on group duality. We explain in detail some of the most ...
The present series of papers deals with various realizations of the dynamical group script L signscr...
The representation theory of the unitary groups is of fundamental significance in many areas of phys...
Atoms are indistinguishable particles which can be transformed one into another by the elements of a...
Both non-Hermitian Dyson and Hermitian Holstein-Primakoff representations of the Sp(2d,R) algebra ar...
The boson operator theory of the representations of the unitary group, its Wigner-Clebsch-Gordan, an...
In this paper we consider a basis for N boson states classified by the chain of groups U(6)⊃U(3)⊃U(2...
The many $2^k$-pole boson states, $|N_kv_k\alpha_k I_kM_k>$ with $k=2,3$, realize the irreducible re...
We propose a new boson expansion theory, without using the closed-algebra approximation indispensabl...
The interacting boson model, describing collective states of even-even nuclei, is introduced as a dr...
The representation theory of the unitary groups is of fundamental significance in many areas of phys...
A short summary of the theory of symmetric group and symmetric functions needed to follow the theory...
Recently a new method to calculate the occupancies of single particle levels in atomic nuclei was d...
A short summary of the theory of symmetric group and symmetric functions needed to follow the theory...
Abstract Minimal representations of a real reductive group G are the ‘small-est ’ irreducible unitar...
DOI
Add to ORKG