Counterexamples to a conjecture of Merker on 3-connected cubic planar graphs with a large cycle spectrum gap

Abstract

Merker conjectured that if k 2 is an integer and G a 3-connected cubic planar graph of circumference at least k, then the set of cycle lengths of G must contain at least one element of the interval [k, 2k+2]. We here prove that for every even integer k 6 there is an infinite family of counterexamples.