Clifford Theory for Group Representations

Let N be a normal subgroup of a finite group G and let F be a field. An important method for constructing irreducible FG-modules consists of the application (perhaps repeated) of three basic operations: (i) restriction to FN. (ii) extension from FN. (iii) induction from FN. This is the `Clifford The

<span>This monograph adopts an operational and functional analytic approach to the following problem: given a short exact sequence (group extension) 1 → N → G → H → 1 of finite groups, describe the irreducible representations of G by means of the structure of the group extension. This problem has at

Introduces systematically the eigenfunction method used in quantum mechanics. Textbook serves as a handbook for researchers doing group theory calculations and for undergraduate and graduate students who intend to use group theory in their future research careers.

<p>This book explains the group representation theory for quantum theory in the language of quantum theory. As is well known, group representation theory is very strong tool for quantum theory, in particular, angular momentum, hydrogen-type Hamiltonian, spin-orbit interaction, quark model, quantum o

Introduces systematically the eigenfunction method used in quantum mechanics. Textbook serves as a handbook for researchers doing group theory calculations and for undergraduate and graduate students who intend to use group theory in their future research careers.