The paper studies a counting version of the Cycle Double Cover Conjecture, which asks for the existence of exponentially many circuit double covers in bridgeless graphs.
The key insights are:
Counting circuit double covers (CiDCs) is more interesting than counting cycle double covers (CyDCs), as a single CiDC can correspond to multiple CyDCs.
An almost-exponential lower bound for graphs with surface embeddings of representativity at least 4 is given using a "flower construction" that locally modifies the CiDC.
An exponential lower bound for planar graphs is proved using a linear representation of CiDCs, which allows reducing the problem to solving linear programs.
A conjecture is made that every bridgeless cubic graph has at least 2^(n/2-1) circuit double covers, and an infinite class of graphs is shown where this bound is tight.
Experiments on small graphs suggest that the conjecture may hold for triangle-free or more cyclically connected graphs, but not for general planar graphs. An improved exponential bound of (5/2)^(n/4-1/2) is proved for planar cubic graphs.
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