Perfectly packing graphs with bounded degeneracy and many leaves
Abstract
We prove that one can perfectly pack degenerate graphs into complete or dense n-vertex quasirandom graphs, provided that all the degenerate graphs have maximum degree o(n n), and in addition (n) of them have at most (1-(1))n vertices and (n) leaves. This proves Ringel's conjecture and the Gy\'arf\'as Tree Packing Conjecture for all but an exponentially small fraction of trees (or sequences of trees, respectively).
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