Eigenvalues of the Laplace operator with potential under the backward Ricci flow on locally homogeneous 3-manifolds

Abstract

Let λ(t) be the first eigenvalue of -+aR\, (a>0) under the backward Ricci flow on locally homogeneous 3-manifolds, where R is the scalar curvature. In the Bianchi case, we get the upper and lower bounds of λ(t). In particular, we show that when the the backward Ricci flow converges to a sub-Riemannian geometry after a proper re-scaling, λ+(t) approaches zero, where λ+(t)=\λ(t),0\.

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