On X-coordinates of Pell equations which are repdigits
Abstract
Let b 2 be a given integer. In this paper, we show that there only finitely many positive integers d which are not squares, such that the Pell equation X2-dY2=1 has two positive integer solutions (X,Y) with the property that their X-coordinates are base b-repdigits. Recall that a base b-repdigit is a positive integer all whose digits have the same value when written in base b. We also give an upper bound on the largest such d in terms of b.
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