A new characterization of computable functions

Abstract

Let En=xi=1, xi+xj=xk, xi*xj=xk: i,j,k ∈ 1,...,n. We prove: (1) there is an algorithm that for every computable function f:N-->N returns a positive integer m(f), for which a second algorithm accepts on the input f and any integer n>=m(f), and returns a system S ⊂eq En such that S is consistent over the integers and each integer tuple (x1,...,xn) that solves S satisfies x1=f(n), (2) there is an algorithm that for every computable function f:N-->N returns a positive integer w(f), for which a second algorithm accepts on the input f and any integer n>=w(f), and returns a system S ⊂eq En such that S is consistent over N and each tuple (x1,...,xn) of non-negative integers that solves S satisfies x1=f(n).