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A264352
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Exceptional even numbers D that do not admit a solution to the Pell equation X^2 - D Y^2 = +2.
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3
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82, 146, 178, 226, 274, 434, 466, 514, 562, 578, 626, 658, 818, 914, 994, 1042, 1106, 1138, 1202, 1234, 1394, 1426, 1522, 1582, 1618, 1666, 1714, 1778, 1874, 1906, 1918, 2066, 2098, 2162, 2194, 2258, 2306, 2386, 2402, 2434, 2482, 2578, 2642
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OFFSET
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1,1
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COMMENTS
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These are the even numbers D = 2*d with odd d having no prime factors 3 or 5 (mod 8), and do not represent +2 by the indefinite binary quadratic form X^2 - D*Y^2 (with discriminant 4*D > 0).
These even D numbers satisfy the necessary condition given in A261246. This condition is not sufficient as the present numbers show.
a(n)/2 = d(n) is 7 (mod 8) for n = 24, 31, 48, 55, 57, ...
The numbers D which admit solutions to the Pell equation X^2 - D Y^2 = +2 are given by A261246.
The exceptional odd D numbers are given in A263010.
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CROSSREFS
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KEYWORD
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nonn
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AUTHOR
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STATUS
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approved
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