Generalized q-Schur algebras and quantum Frobenius

We studied asymptotic methods for \(q\)-Schur algebras and related quantum groups and constructed a kind of asymptotic form for \(q\)-Schur algebras and quantum special linear groups. The structure and representations for these forms were also discussed. (6) 1995 Academic Press, Inc.

Some finiteness conditions for infinite dimensional coalgebras, particularly right or left semiperfect coalgebras, or co-Frobenius Hopf algebras are studied. As well, examples of co-Frobenius Hopf algebras are constructed via a Hopf algebra structure on an Ore extension of a group algebra, and it is

A quantum-algebraic framework for many \(q\)-special functions is provided. The twodimensional Euclidean quantum algebra, \(s l_{4}(2)\) and the \(q\)-oscillator algebra are considered. Realizations of these algebras in terms of operators acting on vector spaces of functions in one complex variable