Biorthogonality in A-Pairings and Hyperbolic Decomposition Theorem for A-Modules

Abstract

In this paper, as part of a project initiated by A. Mallios consisting of exploring new horizons for Abstract Differential Geometry (a la Mallios), mallios1997, mallios, malliosvolume2, modern, such as those related to the classical symplectic geometry, we show that results pertaining to biorthogonality in pairings of vector spaces do hold for biorthogonality in pairings of A-modules. However, for the dimension formula the algebra sheaf A is assumed to be a PID. The dimension formula relates the rank of an A-morphism and the dimension of the kernel (sheaf) of the same A-morphism with the dimension of the source free A-module of the A-morphism concerned. Also, in order to obtain an analog of the Witt's hyperbolic decomposition theorem, A is assumed to be a PID while topological spaces on which A-modules are defined are assumed connected.