The effect of link Dehn surgery on the Thurston norm

Abstract

Let L be an n-component link (n>1) with pairwise nonzero linking numbers in a rational homology 3-sphere Y. Assume the link complement X:=Y(L) has nondegenerate Thurston norm. In this paper, we study when a Thurston norm-minimizing surface S properly embedded in X remains norm-minimizing after Dehn filling all boundary components of X according to ∂ S and capping off ∂ S by disks. In particular, for n=2 the capped-off surface is norm-minimizing when [S] lies outside of a finite set of rays in H2(X,∂ X;R). When Y is an integer homology sphere this gives an upper bound on the number of surgeries on L which may yield S1× S2. The main techniques come from Gabai's proof of the Property R conjecture and related work.