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Linear F-manifolds, a duality and the generalized tangent bundle

Published 1 Aug 2025 in math.DG, math-ph, and math.MP | (2508.00474v1)

Abstract: A linear F-manifold is an F-manifold (E, \circ , e) defined on the total space of a vector bundle \pi : E \rightarrow M for which the multiplication and unit field are linear tensor fields. We develop a systematic treatment of linear F-manifolds. Using an additional suitable connection on M, we define a duality between linear F-manifolds (with and without Euler fields) on E and the total space E{*} of the dual vector bundle. Our main examples of linear F-manifolds are the tangent and cotangent prolongation. Motivated by the direct sum of tangent and cotangent prolongation, we define and investigate compatibility conditions between linear F-manifolds and the geometry of the generalized tangent bundle.

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