On $\mathcal A$-Transvections and Symplectic $\mathcal A$-Modules
Abstract
In this paper, building on prior joint work by Mallios and Ntumba, we show that -\textit{transvections} and \textit{singular symplectic }-\textit{automorphisms} of symplectic -modules of finite rank have properties similar to the ones enjoyed by their classical counterparts. The characterization of singular symplectic -automorphisms of symplectic -modules of finite rank is grounded on a newly introduced class of pairings of -modules: the \textit{orthogonally convenient pairings.} We also show that, given a symplectic -module of finite rank, with a \textit{PID-algebra sheaf}, any injective -morphism of a \textit{Lagrangian sub--module} of into may be extended to an -symplectomorphism of such that its restriction on equals the identity of . This result also holds in the more general case whereby the underlying free -module is equipped with two symplectic -structures and , but with being Lagrangian with respect to both and . The latter is the analog of the classical \textit{Witt's theorem} for symplectic -modules of finite rank.
Cite
@article{arxiv.0911.1620,
title = {On $\mathcal A$-Transvections and Symplectic $\mathcal A$-Modules},
author = {Patrice P. Ntumba},
journal= {arXiv preprint arXiv:0911.1620},
year = {2009}
}
Comments
30 pages