Forbidden Subgraphs in Connected Graphs
Abstract
Given a set =\H1,H2,...\ of connected non acyclic graphs, a -free graph is one which does not contain any member of % as copy. Define the excess of a graph as the difference between its number of edges and its number of vertices. Let Wk, be theexponential generating function (EGF for brief) of connected -free graphs of excess equal to k (k ≥ 1). For each fixed , a fundamental differential recurrence satisfied by the EGFs Wk, is derived. We give methods on how to solve this nonlinear recurrence for the first few values of k by means of graph surgery. We also show that for any finite collection of non-acyclic graphs, the EGFs Wk, are always rational functions of the generating function, T, of Cayley's rooted (non-planar) labelled trees. From this, we prove that almost all connected graphs with n nodes and n+k edges are -free, whenever k=o(n1/3) and || < ∞ by means of Wright's inequalities and saddle point method. Limiting distributions are derived for sparse connected -free components that are present when a random graph on n nodes has approximately n2 edges. In particular, the probability distribution that it consists of trees, unicyclic components, ..., (q+1)-cyclic components all -free is derived. Similar results are also obtained for multigraphs, which are graphs where self-loops and multiple-edges are allowed.
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