Almost Universal Weighted Ternary Sums of Polygonal Numbers
Abstract
For a natural number m, generalized m-gonal numbers are defined by the formula pm(x)=(m-2)x2-(m-4)x2 with x∈ Z. In this paper, we determine a criterion on a,b,c,m for which the weighted ternary sum Pa,b,c,m:=apm(x)+bpm(y)+cpm(z) is almost universal. We also prove for some a,b,c,m that the form Pa,b,c,m is not almost universal, while it represents all possible congruence classes.
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