Define a graph to be a Kotzig graph if it is m-regular and has an m-edge colouring in which each pair of colours form a Hamiltonian cycle. We show that every cubic graph with spanning subgraph consisting of a subdivision of a Kotzig graph together with even cycles has a cycle double cover, in fact a 6-CDC. We prove this for two other families of graphs similar to Kotzig graphs as well.In particular, let F be a 2-factor in a cubic graph G and denote by GF the pseudograph obtained by contracting each component in F. We show that if there exist a cycle in GF through all vertices of odd degree, then G has a CDC.We conjecture that every 3-connected cubic graph contains a spanning subgraph homeomorphic to a Kotzig graph.In a sequel we show that every cubic graph with a spanning homeomorph of a 2-connected cubic graph on at most 10 vertices has a CDC.