HK multiplicity, F-threshold and the Paley-Wiener theorem

Abstract

For a given algebraically closed field k of characteristic p>0 we consider the set Ck, of graded isomorphism classes of standard graded pairs (R, I), where R is a standard graded ring over the field and I is a graded ideal of finite colength. Here we give a ring homomorphism :[ Ck] H()[X], where H() denotes the ring of entire functions. The related entire function and the homomorphism keep track of the two positive characteristic invariants, eHK(R, I) and cI( m) of the ring: (1) composing the map with the evaluation map at z=0 gives a ring homomorphism e:[ Ck] [X] which sends (R,I) eHK(R0, IR0)+ eHK(R1, IR1)X+·s + eHK(Rd, IRd)Xd, where Ri is the union of i dimensional components of R and eHK(Ri, IRi) is the HK multiplicity of the pair (Ri, IRi), and in particular the top coefficient is eHK(R, I). (2) If, in addition, R is a two dimensional ring or Proj~R is strongly F-regular, then the Fourier transform fR, I belongs to the Paley-Wiener class of the real number, namely the F-threshold cI m(R) of the maximal ideal m.

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