On homotopy K3 surfaces constructed by two knots and their applications

Abstract

Let LHT be a left handed trefoil knot and K be any knot. We define Mn(K) to be the homology 3-sphere which is represented by a simple link of LHT and LHT K with framings 0 and n respectively. Starting with this link, we construct homotopy K3 and spin rational homology K3 surfaces containing Mn(K). Then we apply the adjunction inequality to show that if n>2gns(K)-2, Mn(K) does not bound any smooth spin rational 4-ball, and that under the same assumption the negative n-twisted Whitehead double of LHT K is not a slice knot, where gns(K) is the n-shake genus of K.