Affine monodromy and exact value distributions over finite fields

Abstract

We study finite field value distributions through the fixed-point statistics of monodromy groups. For a regular degree-\(n\) cover, omitted values are controlled by derangements. Thus natural symmetric monodromy gives support density \(1-Dn/n! 1-e-1\), while the Cameron--Cohen bound gives the universal ceiling \(1-1/n\), attained by sharply \(2\)-transitive affine monodromy. We give an explicit polynomial realization of this optimal mechanism. For \(N=pe\) and \(h N-1\), set \[ ΛN,h(U)=U(U(N-1)/h-1)h . \] Its geometric Galois closure is rational, \[ U=zh, T=(zN-z)h, \] and its geometric monodromy is the affine group \((N,+) Hh\). For every extension \(Q/p\) we compute the complete fibre enumerator of \(ΛN,h\) exactly, including the nonregular cases. In the full affine case \(h=N-1\), the polynomial \[ U(U-1)N-1 \] attains the Wan--Shiue--Chen upper bound for non-permutation polynomials over every finite field containing \(N\); over arbitrary extensions we compute the exact defect from that bound.

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