Analytic Representations in the 3-dim Frobenius Problem

Abstract

We consider the Diophantine problem of Frobenius for semigroup S( d3) where d3 denotes the tuple (d1,d2,d3), (d1,d2,d3)=1. Based on the Hadamard product of analytic functions we have found the analytic representation for the diagonal elements akk( d3) of the Johnson's matrix of minimal relations in terms of d1,d2,d3. Bearing in mind the results of the recent paper this gives the analytic representation for the Frobenius number F( d3), genus G( d3) and the Hilbert series H( d3;z) for the semigroups S( d3). This representation does complement the Curtis' theorem on the non-algebraic representation of the Frobenius number F( d3). We also give a procedure to calculate the diagonal and off-diagonal elements of the Johnson's matrix.

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