Sang-il Oum (엄상일), Perfect Matchings in Claw-free Cubic Graphs

Lovász and Plummer conjectured that there exists a fixed positive constant c such that every cubic n-vertex graph with no cutedge has at least 2^cn perfect matchings. Their conjecture has been verified for bipartite graphs by Voorhoeve and planar graphs by Chudnovsky and Seymour. We prove that every claw-free cubic n-vertex graph with no cutedge has more than 2^n/18 perfect matchings, thus verifying the conjecture for claw-free graphs.