All functions g:N-->N which have a single-fold Diophantine representation are dominated by a limit-computable function f:N\0-->N which is implemented in MuPAD and whose computability is an open problem

Abstract

Let En=xk=1, xi+xj=xk, xi · xj=xk: i,j,k ∈ 1,...,n. For any integer n ≥ 2214, we define a system T ⊂eq En which has a unique integer solution (a1,...,an). We prove that the numbers a1,...,an are positive and max(a1,...,an)>2(2n). For a positive integer n, let f(n) denote the smallest non-negative integer b such that for each system S ⊂eq En with a unique solution in non-negative integers x1,...,xn, this solution belongs to [0,b]n. We prove that if a function g:N-->N has a single-fold Diophantine representation, then f dominates g. We present a MuPAD code which takes as input a positive integer n, performs an infinite loop, returns a non-negative integer on each iteration, and returns f(n) on each sufficiently high iteration.