On the rigidity of manifolds with respect to Gagliardo-Nirenberg inequalities

Abstract

In this paper, we investigate local rigidity properties related to Gagliardo-Nirenberg constants and unweighted Yamabe-type constants. Let V be an open bounded subset of an n-dimensional Riemannian manifold (M,g) whose Gagliardo-Nirenberg constant satisfies \[ Gα(V,g) ≥ Gα(Rn,gRn), \] where (Rn,gRn) denotes the n-dimensional Euclidean space with its standard metric. We show that for α ∈ (0,1) (1,n+6n+2) when n ≤ 6 or α ∈ (0,1) (1,nn-2] when n ≥ 7, if the first eigenvalue of the Ricci tensor satisfies \[ ∫V λ1(Rc) \, dμg ≥ 0, \] then V must be flat. When α belongs to a specific subinterval around 1 within the above range, Gα(V,g) ≥ Gα(Rn,gRn) and the weaker curvature condition of the scalar curvature \[ ∫V Sc \, dμg ≥ 0 \] already imply that V is flat. Moreover, we prove that for α sufficiently close to 1, the condition \[ Yα(V,g) ≥ Gα(Rn,gRn) \] on the unweighted Yamabe-type constants guarantees the flatness of V.