Invariant integration theory on non-compact quantum spaces: Quantum (n,1)-matrix ball

Abstract

An operator theoretic approach to invariant integration theory on non-compact quantum spaces is introduced on the example of the quantum (n,1)-matrix ball Oq(Matn,1). In order to prove the existence of an invariant integral, operator algebras are associated to Oq(Matn,1) which allow an interpretation as ``rapidly decreasing'' functions and as functions with compact support on the quantum (n,1)-matrix ball. It is shown that the invariant integral is given by a generalization of the quantum trace. If an operator representation of a first order differential calculus over the quantum space is known, then it can be extended to the operator algebras of integrable functions. Hilbert space representations of Oq(Matn,1) are investigated and classified. Some topological aspects concerning Hilbert space representations are discussed.

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