Some Rigidity Properties for Manifolds with Constant k-Curvature of Modified Schouten Tensor

In this paper, we study the rigidity problem on closed locally conformally flat manifolds with constant k-curvature or constant quotient curvature. We prove that such manifolds must have constant sectional curvature under the assumption that the manifolds have positive sectional curvature. The same result is also held on closed locally conformally flat manifolds with totally geodesic boundary.