q-Schur Algebras, Asymptotic Forms, and Quantum SLn

Constructions are described which associate algebras to arbitrary bilinear forms, generalising the usual Clifford and Heisenberg algebras. Quantum groups of symmetries are discussed, both as deformed enveloping algebras and as quantised function spaces. A classification of the equivalence classes of

We analyse the complexity of a simple algorithm for computing asymptotic solutions of algebraic differential equations. This analysis is based on a computation of the number of possible asymptotic monomials of a certain order, and on the study of the growth of this number as the order of the equatio

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

The discussions in the present paper arise from exploring intrinsically the structural nature of the quantum n-space. A kind of braided category of -graded θcommutative associative algebras over a field k is established. The quantum divided power algebra over k related to the quantum n-space is intr

Using Darboux transformations for the lattice Schrödinger equation, we construct two families of discrete reflectionless potentials with \(j\) and \(2 j\) bound states (solitons). These potentials are related to the exceptional Askey-Wilson polynomials. In the continuous limit they are reduced to th