Optimal Selection for Good Polynomials of Degree up to Five

Abstract

Good polynomials are the fundamental objects in the Tamo-Barg constructions of Locally Recoverable Codes (LRC). In this paper we classify all good polynomials up to degree 5, providing explicit bounds on the maximal number of sets of size r+1 where a polynomial of degree r+1 is constant, up to r=4. This directly provides an explicit estimate (up to an error term of O(q), with explict constant) for the maximal length and dimension of a Tamo-Barg LRC. Moreover, we explain how to construct good polynomials achieving these bounds. Finally, we provide computational examples to show how close our estimates are to the actual values of , and we explain how to obtain the best possible good polynomials in degree 5.