Noncommutative Maslov Index and Eta Forms
摘要
We define and prove a noncommutative generalization of a formula relating the Maslov index of a triple of Lagrangian subspaces of a symplectic vector space to eta-invariants associated to a pair of Lagrangian subspaces generalizing a result of Bunke and Koch in the family case. The noncommutative Maslov index, defined for modules over a -algebra , is an element in . The generalized formula calculates its Chern character in the de Rham homology of certain dense subalgebras of . The proof, modelled on the proof by Bunke and Koch, is a noncommutative Atiyah-Patodi-Singer index theorem for a particular Dirac operator twisted by an -vector bundle. We develop an analytic framework for this type of index problem.
引用
@article{arxiv.math/0309323,
title = {Noncommutative Maslov Index and Eta Forms},
author = {Charlotte Wahl},
journal= {arXiv preprint arXiv:math/0309323},
year = {2007}
}
备注
122 pages, 1 figure; based on the author's PhD-thesis; Changes in Introduction, \S 1.3, \S 4.5 added, new notion of trace class operators, some streamlining