Sums of two squares and a power
Abstract
We extend results of Jagy and Kaplansky and the present authors and show that for all k≥ 3 there are infinitely many positive integers n, which cannot be written as x2+y2+zk=n for positive integers x,y,z, where for k 0 4 a congruence condition is imposed on z. These examples are of interest as there is no congruence obstruction itself for the representation of these n. This way we provide a new family of counterexamples to the Hasse principle or strong approximation.
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