Tight universal octagonal forms

Abstract

Let P8(x)=3x2-2x. For positive integers a1,a2,…,ak, a polynomial of the form a1P8(x1)+a2P8(x2)+·s+akP8(xk) is called an octagonal form. For a positive integer n, an octagonal form is called tight T(n)-universal if it represents (over z) every positive integer greater than or equal to n and does not represent any positive integer less than n. In this article, we find all tight T(n)-universal octagonal forms for every n 2. Furthermore, we provide an effective criterion on tight T(n)-universality of an arbirary octagonal form, which is a generalization of "15-Theorem" of Conway and Schneeberger.