p-lck with potential structure on LVMB manifolds
Abstract
In this paper, I present a natural generalization of all the results from [6] to LVMB manifolds: to summarize, very few LVMB manifolds are lck, and none are lck with potential except for diagonal Hopf manifolds. Moreover, if N is an LVMB manifold with a sufficient number of indispensable coordinates, and under a certain assumption (H) (which may be artificial, as I conjecture) on the localization of the configuration , there exists a non-compact and non-K\"ahlerian Zp-lck with potential cover of N with p = m-1. Furthermore, I show that the conjecture stated at the end of [5] (that p is bounded below by m-1) is false, by exhibiting examples of LVMB manifolds that are 1-lck with potential when m≥ 3 and n>2m+1. This leads to the formulation of a new conjecture: if assumption (H) holds, then N is 1-lck with potential. Moreover, assumption (H) seems entirely artificial. This conjecture is supported by several examples.
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