Comparison geometry of manifolds with boundary under lower N-weighted Ricci curvature bounds with -range
Abstract
We study comparison geometry of manifolds with boundary under a lower N-weighted Ricci curvature bound for N∈ ]-∞,1] [n,+∞] with -range introduced by Lu-Minguzzi-Ohta. We will conclude splitting theorems, and also comparison geometric results for inscribed radius, volume around the boundary, and smallest Dirichlet eigenvalue of the weighted p-Laplacian. Our results interpolate those for N∈ [n,+∞[ and =1, and for N∈ ]-∞,1] and =0 by the second named author.
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