The realization problem of essential surfaces in knot exteriors

Abstract

We study compact orientable essential surfaces in knot exteriors in the 3-sphere. The genus g, the number of boundary components b, and the boundary slope p/q are fundamental invariants of an essential surface. The realization problem asks whether, for a given triple (g, b, q) with g 0, b 1, and q 1, there exists a knot K ⊂ S3 whose exterior E(K) contains a compact orientable essential surface F of genus g with b boundary components and boundary slope p/q for some p. In general, not all combinations of (g, b, q) are realizable. First, we show that if b is odd, then q must be equal to 1. Our main theorem states that for any given even b 2 and q 1, there exist a genus g 0 and a knot K such that E(K) contains a compact orientable essential surface with these parameters.