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%I A317651 #17 Apr 30 2023 18:16:35
%S A317651 1,1,-1,51,849,-26199,1341999,82018251,18703396449,-993278479599,
%T A317651 -78795859032801,38711746282537251,-923351332174412751,
%U A317651 4688204953344642495801,501271295036889289819599,-89944302490128540556106949,-104694993963067299023875442751,63396004159664562363095882996001
%N A317651 Sequence related to the Taylor expansion of the Jacobi theta_3 constant.
%H A317651 Christian Krattenthaler and Thomas W. Müller, <a href="https://arxiv.org/abs/2304.11471">The congruence properties of Romik's sequence of Taylor.coefficients of Jacobi's theta function theta_3</a>, arXiv:2304.11471 [math.NT], 2023. See p. 1.
%H A317651 Dan Romik, <a href="https://arxiv.org/abs/1807.06130">The Taylor coefficients of the Jacobi theta_3</a>, arXiv:1807.06130 [math.NT], 2018.
%H A317651 Robert Scherer, <a href="https://arxiv.org/abs/1904.04509">Congruences modulo primes of the Romik sequence related to the Taylor expansion of the Jacobi theta constant theta_3</a>, arXiv:1904.04509 [math.NT], 2019.
%H A317651 Tanay Wakhare, Christophe Vignat, <a href="https://arxiv.org/abs/1909.01508">Taylor coefficients of the Jacobi theta3(q) function</a>, arXiv:1909.01508 [math.NT], 2019.
%Y A317651 Cf. A175573 (theta3(1)).
%K A317651 sign
%O A317651 0,4
%A A317651 _Michel Marcus_, Aug 03 2018
%E A317651 More terms from Romik article added by _Michel Marcus_, Apr 10 2019

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