Shortest cycle covers and cycle double covers with large 2-regular subgraphs

Abstract

In this paper we show that many snarks have shortest cycle covers of length 43m+c for a constant c, where m is the number of edges in the graph, in agreement with the conjecture that all snarks have shortest cycle covers of length 43m+o(m). In particular we prove that graphs with perfect matching index at most 4 have cycle covers of length 43m and satisfy the (1,2)-covering conjecture of Zhang, and that graphs with large circumference have cycle covers of length close to 43m. We also prove some results for graphs with low oddness and discuss the connection with Jaeger's Petersen colouring conjecture.