Non--commutative Integration Calculus
摘要
We discuss a non--commutative integration calculus arising in the mathematical description of anomalies in fermion--Yang--Mills systems. We consider the differential complex of forms with a grading operator on a Hilbert space and bounded operators on which naturally contains the compactly supported de Rham forms on (i.e.\ is the sign of the free Dirac operator on and a --space on ). We present an elementary proof that the integral of --forms for , is equal, up to a constant, to the conditional Hilbert space trace of where for odd and (`--matrix') a spin matrix anticommuting with for even. This result provides a natural generalization of integration of de Rham forms to the setting of Connes' non--commutative geometry which involves the ordinary Hilbert space trace rather than the Dixmier trace.
引用
@article{arxiv.hep-th/9501092,
title = {Non--commutative Integration Calculus},
author = {Edwin Langmann},
journal= {arXiv preprint arXiv:hep-th/9501092},
year = {2016}
}
备注
16 pages, latex