Weak maps and the Tutte Polynomial
Abstract
Let M and N be matroids such that N is the image of M under a rank-preserving weak map. Generalizing results of Lucas, we prove that, for x and y positive, T(M;x,y)≥ T(N;x,y) if and only if x+y≥ xy or M N. We give a number of consequences of this result.
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