On representations of positive integers by $(a+c)^{1/3}x + (b+d)y$, $(a+c)x + \bigl(k(b+d) \bigr)^{1/3} y$, and $\bigl(k(a+c) \bigr)^{1/3} x + l(b+d) y$

Mohamed El Bachraoui

On representations of positive integers by (a+c)1/3x + (b+d)y, (a+c)x + (k(b+d) )1/3 y, and (k(a+c) )1/3 x + l(b+d) y

Abstract

We use sums of Liouville type to count the number of ways a positive integer can be represented by the forms (a+c)1/3x + (b+d)y, (a+c)x + (k(b+d) )1/3 y, and (k(a+c) )1/3 x + l(b+d) y for nonnegative integers a,b,c,d,k,l,x,y under certain relative primality conditions.

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