The Hilbert–Kunz Function of a Characteristic 2 Cubic

We determine the Hilbert᎐Kunz function of plane elliptic curves in odd characteristic, as well as over arbitrary fields the generalized Hilbert᎐Kunz functions of nodal cubic curves. Together with results of K. Pardue and P. Monsky, this completes the list of Hilbert᎐Kunz functions of plane cubics. C

In this paper we find an algorithm which computes the Hilbert function of schemes Z of ''fat points'' in ‫ސ‬ 3 whose support lies on a rational normal cubic curve C. The algorithm shows that the maximality of the Hilbert function in degree Ž t is related to the existence of fixed curves either C its

In 1992, C. Spiro [7] showed that if f is a multiplicative function such that f (1)=1 and such that f ( p+q)= f ( p)+ f (q) for all primes p and q, then f(n)=n for all integers n 1. Here we prove the following: for all primes p and integers m 1, (1) then f (n)=n for all integers n 1. Proof. First

The continued fraction expansion and infrastructure for quadratic congruence function fields of odd characteristic have been well studied. Recently, these ideas have even been used to produce cryptosystems. Much less is known concerning the continued fraction expansion and infrastructure for quadrat