Integral pinched gradient shrinking -Einstein solitons
Abstract
The gradient shrinking -Einstein soliton is a triple (Mn,g,f) such that Rij+fij=( R+λ) gij, where (Mn,g) is a Riemannian manifold, λ>0, ∈R\0\ and f is the potential function on Mn. In this paper, using algebraic curvature estimates and the Yamabe-Sobolev inequality, we prove some integral pinching rigidity results for compact gradient shrinking -Einstein solitons.
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