Decomposition of Symplectic Vector Bundles and Azumaya Algebras
Abstract
Let X be a connected CW complex. Let V be a symplectic vector bundle of rank 2mn over X, and let A be a topological Azumaya algebra of degree 2mn with a symplectic involution over a X. We give conditions for the positive integers m and n, and the dimension of X so that V can be decomposed as the tensor product of a symplectic vector bundle of rank 2m and an orthogonal vector bundle of rank n; and so that A can be decomposed as the tensor product of topological Azumaya algebras of degrees 2m and n with involutions of the first kind.
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