Aeppli-Bott-Chern Massey products on non-K\"ahler solvmanifolds
Abstract
In this paper, we present explicit computations of non-trivial triple ABC-Massey products on non-K\"ahler solvmanifolds endowed with an invariant complex structure. We prove that the Bigalke-Rollenske manifold, the generalized Nakamura manifolds satisfying some suitable assumptions and compact quotients of the solvable Lie group C2n C2m have non-vanishing triple ABC-Massey products. Furthermore, such manifolds have no astheno-K\"ahler metric.
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