Locally conformal almost generalized f-cosymplectic manifolds

Abstract

This paper introduces a new class of geometric structures in almost contact metric geometry, which we call locally conformal almost generalized f-cosymplectic manifolds. These are almost contact metric structures (φ, , η, g) equipped with a closed Lee form ω and a smooth function f satisfying dη = ω η, \;\; d = 2fη + 2ω , where (·, ·) = g(·, φ ·) is the second fundamental form. We derive integrability conditions and prove a dimensional dichotomy: in dimension 3, ω may admit transverse components, while in higher dimensions it must be proportional to η. This rigidity, which contrasts with even-dimensional conformal symplectic geometry, is established and illustrated by explicit examples in dimensions 3 and 5. The framework generalizes and unifies prior results on locally conformal almost cosymplectic and almost f-cosymplectic structures.