Quantum Coinvariant Theory for the Quantum Special Linear Group and Quantum Schubert Varieties

We suggest a possible programme to associate geometric ''flag-like'' data to an arbitrary simple quantum group, in the spirit of the noncommutative algebraic geometry developed by Artin, Tate, and Van den Bergh. We then carry out this programme for the standard quantum SLðnÞ of Drinfel'd and Jimbo,

For the quantum function algebras O O M and O O GL , at lth roots of unity q n q n when l is odd, the image under the q-analog of the Frobenius morphism charac-Ž . terizes each prime and primitive ideal uniquely up to automorphisms obtained from row and column multiplication of the standard generat

The structure of the representation of the space-time translation group in relativistic quantum theory is examined by means of an operator spectral integral. There is one and only one operator-valued function on the complex forward cone which is an analytic continuation of that representation.

## Communicated by W. Sproljig We present a Riesz-like hyperholomorphic functional calculus for a set of non-commuting operators based on Clifford analysis. Applications to the quantum field theory are described.