I have implemented both versions specified in the paper. I learned that, the unoptimized version, if solved recursively helps a lot to understand the algorithm.
Here is python implementation for version 1 (unoptimized):
def bron(compsub, _not, candidates, graph, cliques):
if len(candidates) == 0 and len(_not) == 0:
if len(candidates) == 0: return
sel = candidates
newCandidates = removeDisconnected(candidates, sel, graph)
newNot = removeDisconnected(_not, sel, graph)
bron(compsub, newNot, newCandidates, graph, cliques)
bron(compsub, _not, candidates, graph, cliques)
And you invoke this function:
graph = # 2x2 boolean matrix
cliques = 
bron(, , graph, cliques)
cliques will contain cliques found.
Once you understand this it's easy to implement optimized one.