Positive mass theorems for spin initial data sets with arbitrary ends and dominant energy shields

Abstract

We prove a positive mass theorem for spin initial data sets (M,g,k) that contain an asymptotically flat end and a shield of dominant energy (a subset of M on which the dominant energy scalar μ-|J| has a positive lower bound). In a similar vein, we show that for an asymptotically flat end E that violates the positive mass theorem (i.e. E < |P|), there exists a constant R>0, depending only on E, such that any initial data set containing E must violate the hypotheses of Witten's proof of the positive mass theorem in an R-neighborhood of E. This implies the positive mass theorem for spin initial data sets with arbitrary ends, and we also prove a rigidity statement. Our proofs are based on a modification of Witten's approach to the positive mass theorem involving an additional independent timelike direction in the spinor bundle.