Alternate modules are subsymplectic
Abstract
In this paper, an alternate module (A,φ) is a finite abelian group A with a Z-bilinear application φ:A× A→ Q/Z which is alternate (i.e. zero on the diagonal). We shall prove that any alternate module is subsymplectic, i.e. if (A,φ) has a Lagrangian of cardinal n then there exists an abelian group B of order n such that (A,φ) is a submodule of the standard symplectic module B× B*.
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