On almost universal mixed sums of squares and triangular numbers

Abstract

In 1997 K. Ono and K. Soundararajan [Invent. Math. 130(1997)] proved that under the generalized Riemann hypothesis any positive odd integer greater than 2719 can be represented by the famous Ramanujan form x2+y2+10z2, equivalently the form 2x2+5y2+4Tz represents all integers greater than 1359, where Tz denotes the triangular number z(z+1)/2. Given positive integers a,b,c we employ modular forms and the theory of quadratic forms to determine completely when the general form ax2+by2+cTz represents sufficiently large integers and establish similar results for the forms ax2+bTy+cTz and aTx+bTy+cTz. Here are some consequences of our main theorems: (i) All sufficiently large odd numbers have the form 2ax2+y2+z2 if and only if all prime divisors of a are congruent to 1 modulo 4. (ii) The form ax2+y2+Tz is almost universal (i.e., it represents sufficiently large integers) if and only if each odd prime divisor of a is congruent to 1 or 3 modulo 8. (iii) ax2+Ty+Tz is almost universal if and only if all odd prime divisors of a are congruent to 1 modulo 4. (iv) When v2(a)=3, the form aTx+Ty+Tz is almost universal if and only if all odd prime divisors of a are congruent to 1 modulo 4 and v2(a)=5,7,..., where v2(a) is the 2-adic order of a.