D-homothetically fixed, weakly (, μ)-structures on contact metric spaces

Abstract

Contact metric ( ,μ )-spaces are generalizations of Sasakian spaces. We introduce a weak ( ,μ ) condition as a generalization of the K-contact one and show that many of the known results from generalized Sasakian geometry hold in the weaker generalized K-contact geometry setting. In particular, we prove existence of K-contact and ( ,μ =2)-structures under some conditions on the Boeckx invariant.

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