On the Diophantine equation (x+1)k+(x+2)k+...+(lx)k=yn

Abstract

Let k,l≥2 be fixed integers. In this paper, firstly, we prove that all solutions of the equation (x+1)k+(x+2)k+...+(lx)k=yn in integers x,y,n with x,y≥1, n≥2 satisfy n<C1 where C1=C1(l,k) is an effectively computable constant. Secondly, we prove that all solutions of this equation in integers x,y,n with x,y≥1, n≥2, k≠3 and l0 2 satisfy \x,y,n\<C2 where C2 is an effectively computable constant depending only on k and l.