The spinorial τ-invariant and 0-dimensional surgery

Abstract

Let M be a compact manifold with a metric g and with a fixed spin structure . Let λ\1+(g) be the first non-negative eigenvalue of the Dirac operator on (M,g,). We set τ(M,):= ∈f λ\1+(g) where the infimum runs over all metrics g of volume 1 in a conformal class [g\0] on M and where the supremum runs over all conformal classes [g\0] on M. Let (M#,#) be obtained from (M,) by 0-dimensional surgery. We prove that τ(M#,#)≥ τ(M,). As a corollary we can calculate τ(M,) for any Riemann surface M.

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