A combinatorial determinant
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math.RA
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casedeterminantentriesgivematrixproofapplicationscombinatorial
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A theorem of Mina evaluates the determinant of a matrix with entries $D^j(f(x)^i)$. We note the important special case where the matrix entries are evaluated at $x=0$ and give a simple proof of it, and some applications. We then give a short proof of the general case.
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