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Conformal Classification Of (K, Μ)-Contact Manifolds, Ramesh Sharma, Luc Vrancken
Conformal Classification Of (K, Μ)-Contact Manifolds, Ramesh Sharma, Luc Vrancken
Mathematics Faculty Publications
First we improve a result of Tanno that says "If a conformal vector field on a contact metric manifold M is a strictly infinitesimal contact transformation, then it is an infinitesimal automorphism of M" by waiving the "strictness" in the hypothesis. Next, we prove that a (k, μ)-contact manifold admitting a non-Killing conformal vector field is either Sasakian or has k = –n – 1, μ = 1 in dimension > 3; and Sasakian or flat in dimension 3. In particular, we show that (i) among all compact simply connected (k, μ)-contact manifolds of dimension > 3, only the unit sphere S2n+1 …