On some universal sums of generalized polygonal numbers

Abstract

For m=3,4,… those pm(x)=(m-2)x(x-1)/2+x with x∈ Z are called generalized m-gonal numbers. Sun [13] studied for what values of positive integers a,b,c the sum ap5+bp5+cp5 is universal over Z (i.e., any n∈ N=\0,1,2,…\ has the form ap5(x)+bp5(y)+cp5(z) with x,y,z∈ Z). We prove that p5+bp5+3p5\,(b=1,2,3,4,9) and p5+2p5+6p5 are universal over Z, as conjectured by Sun. Sun also conjectured that any n∈ N can be written as p3(x)+p5(y)+p11(z) and 3p3(x)+p5(y)+p7(z) with x,y,z∈ N; in contrast, we show that p3+p5+p11 and 3p3+p5+p7 are universal over Z. Our proofs are essentially elementary and hence suitable for general readers.