Quantum group generalization of the heterotic QFT

This paper deals with the cohomology of infinitesimal quantum general linear odd ŽŽ . . ev ŽŽ . . w x groups. We prove that H G , K s 0 and H G , K ( K N N . Our apq 1 q 1 U Research supported in part by the Tianyuan Math. Fund.

We examine the notion of symmetry in quantum field theory from a fundamental representation theoretic point of view. This leads us to a generalization expressed in terms of quantum groups and braided categories. It also unifies the conventional concept of symmetry with that of exchange statistics an

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

## Abstract This paper presents a generalized formulation for multi‐input multi‐output (MIMO) quantitative feedback theory (QFT) based controller design and analysis, and its application to the control of the X‐29 aircraft. The formulation is based on a more general control structure, where input a