Families of almost complex structures and transverse (p,p)-forms

Abstract

An almost p-K\"ahler manifold is a triple (M,J,), where (M,J) is an almost complex manifold of real dimension 2n and is a closed real tranverse (p,p)-form on (M,J), where 1≤ p≤ n. When J is integrable, almost p-K\"ahler manifolds are called p- K\"ahler manifolds. We produce families of almost p-K\"ahler structures (Jt,t) on 3, 4, and on the real torus T6, arising as deformations of K\"ahler structures (J0,g0,ω0), such that the almost complex structures Jt cannot be locally compatible with any symplectic form for t≠ 0. Furthermore, examples of special compact nilmanifolds with and without almost p-K\"ahler structures are presented.