Correction terms and the non-orientable slice genus

Abstract

By considering negative surgeries on a knot K in S3, we derive a lower bound to the non-orientable slice genus γ4(K) in terms of the signature σ(K) and the concordance invariants Vi(K), which strengthens a previous bound given by Batson, and which coincides with Ozsv\'ath-Stipsicz-Szab\'o's bound in terms of their invariant for L-space knots and quasi-alternating knots. A curious feature of our bound is superadditivity, implying, for instance, that the bound on the stable non-orientable genus is sometimes better than the one on γ4(K).