Monochromatic solutions to x+y=z2 in the interval [N,cN4]

Abstract

Green and Lindqvist proved that for any 2-colouring of N, there are in\-fi\-ni\-tely many monochromatic solutions to x+y=z2. In fact, they showed the existence of a monochromatic solution in every interval [N,cN8] with large enough N. In this short note we give a different proof for their theorem and prove that a monochromatic solution exists in every interval [N,104N4] with large enough N. A 2-colouring of [N,(1/27)N4] avoiding monochromatic solutions to x+y=z2 is also presented, which shows that in 104N4 only the constant factor can be reduced.