Gap theorems for ends of smooth metric measure spaces

Abstract

In this paper, we establish two gap theorems for ends of smooth metric measure space (Mn, g,e-fdv) with the Bakry-\'Emery Ricci tensor Ricf-(n-1) in a geodesic ball Bo(R) with radius R and center o∈ Mn. When Ricf 0 and f has some degeneration outside Bo(R), we show that there exists an ε=ε(n,Bo(1)|f|) such that such a space has at most two ends if Rε. When Ricf 12 and f(x) 14d2(x,Bo(R))+c for some constant c>0 outside Bo(R), we can also get the same gap conclusion.