REFERENCES
- [Abbott et al. 10] Timothy G. Abbott, Kiran S. Kedlaya, and David Roe. “Bounding Picard Numbers of Surfaces Using p-adic Cohomology.” In Arithmetics Geometry, and Coding Theory (AGCT 2005), Sémin. Congr. 21, pp. 125–159. Soc. Math. France, 2010.
- [Baier 07] Stephan Baier. “The Lang–Trotter Conjecture on Average.” J. Ramanujan Math. Soc. 22 (2007), 299–314.
- [Bogomolov et al. 11] Fedor Bogomolov, Brendan Hassett, and Yuri Tschinkel. “Constructing Rational Curves on K3 Surfaces.” Duke Math. J. 157 (2011), 535–550.
- [Bostan et al. 07] Alin Bostan, Pierrick Gaudry, and Éric Schost. “Linear Recurrences with Polynomial Coefficients and Application to Integer Factorization and Cartier–Manin Operator.” SIAM J. Comput. 36 (2007), 1777–1806.
- [Charles 11] François Charles. “On the Picard Number of K3 Surfaces over Number Fields.” arXiv:1111.4117, 2011.
- [Charles 13] François Charles. “The Tate Conjecture for K3 Surfaces over Finite Fields.” Invent. Math. 194 (2013), 119–145.
- [Charles 14] François Charles. “Frobenius Distribution for Pairs of Elliptic Curves.” To appear, 2014.
- [Costa et al. 14] Edgar Costa, David Harvey, and Kiran S. Kedlaya. “Zeta Functions of Nondegenerate Toric Hypersurfaces via Controlled Reduction in p-adic Cohomology.” To appear, 2014.
- [David and Pappalardi 99] Chantal David and Francesco Pappalardi. “Average Frobenius Distributions of Elliptic Curves.” Internat. Math. Res. Notices 4 (1999), 165–183.
- [Deligne 72] Pierre Deligne. “La Conjecture de Weil pour les Surfaces K3.” Invent. Math. 15 (1972), 206–226.
- [Deuring 41] Max Deuring. “Die Typen der Multiplikatorenringe elliptischer Funktionenkörper.” Abh. Math. Sem. Hansischen Univ. 14 (1941), 197–272.
- [Elkies 87] Noam D. Elkies. “The Existence of infinitely Many Supersingular Primes for Every Elliptic Curve over .” Invent. Math. 89 (1987), 561–567.
- [Elkies 91] Noam D. Elkies. “Distribution of Supersingular Primes.” Astérisque 198–200 (1991), 127–132.
- [Elsenhans and Jahnel 08a] Andreas-Stephan Elsenhans and Jörg Jahnel. “K3 Surfaces of Picard Rank One and Degree Two.” In Algorithmic Number Theory, Lecture Notes in Comput. Sci. 5011pp. 212–225. Springer, 2008.
- [Elsenhans and Jahnel 08b] Andreas-Stephan Elsenhans and Jörg Jahnel. “K3 Surfaces of Picard Rank One Which Are Double Covers of the Projective Plane.” In Higher-Dimensional Geometry over Finite Fields, NATO Sci. Peace Secur. Ser. D Inf. Commun. Secur. 16, pp. 63–77. IOS, 2008.
- [Elsenhans and Jahnel 11a] Andreas-Stephan Elsenhans and Jörg Jahnel. “On the Computation of the Picard Group for K3 Surfaces.” Math. Proc. Cambridge Philos. Soc. 151 (2011), 263–270.
- [Elsenhans and Jahnel 11b] Andreas-Stephan Elsenhans and Jörg Jahnel. “The Picard Group of a K3 Surface and Its Reduction Modulo p.” Algebra Number Theory 5 (2011), 1027–1040.
- [Elsenhans and Jahnel 12] Andreas-Stephan Elsenhans and Jörg Jahnel. “Kummer Surfaces and the Computation of the Picard Group.” LMS J. Comput. Math. 15 (2012), 84–100.
- [Fité et al. 12] Francesc Fité, Kiran S. Kedlaya, Víctor Rotger, and Andrew V. Sutherland. “Sato–Tate Distributions and Galois Endomorphism Modules in Genus 2.” Compos. Math. 148 (2012), 1390–1442.
- [Fouvry and Murty 96] Etienne Fouvry and M. Ram Murty. “On the Distribution of Supersingular Primes.” Canad. J. Math. 48 (1996), 81–104.
- [Harvey 07] David Harvey. “Kedlaya’s Algorithm in Larger Characteristic.” Int. Math. Res. Not. IMRN 22 (2007), Art. ID rnm095, 29.
- [Hassett et al. 13] Brendan Hassett, Andrew Kresch, and Yuri Tschinkel. “Effective Computation of Picard Groups and Brauer–Manin Obstructions of Degree Two K3 Surfaces over Number Fields.” Rend. Circ. Mat. Palermo (2) 62 (2013), 137–151.
- [Katz 09] Nicholas M. Katz. “Lang–Trotter Revisited.” Bull. Amer. Math. Soc. (N.S.) 46 (2009), 413–457.
- [Lang and Trotter 76] Serge Lang and Hale Trotter. Frobenius Distributions in
-Extensions, Lecture Notes in Mathematics 504. Springer, 1976.
- [Li and Liedtke 12] Jun Li and Christian Liedtke. “Rational Curves on K3 Surfaces.” Invent. Math. 188 (2012), 713–727.
- [Liu et al. 05] Qing Liu, Dino Lorenzini, and Michel Raynaud. “On the Brauer Group of a Surface.” Invent. Math. 159 (2005), 673–676.
- [Maulik 12] Davesh Maulik. “Supersingular K3 Surfaces for Large Primes.” arXiv:1203.2889, 2012.
- [Mazur 73] Barry Mazur. “Frobenius and the Hodge Filtration (Estimates).” Ann. of Math. (2) 98 (1973), 58–95.
- [Milne 75a] James S. Milne. “On a Conjecture of Artin and Tate.” Ann. of Math. (2) 102 (1975), 517–533.
- [Milne 75b] James S. Milne. “On a Conjecture of Artin and Tate: Addendum.” Available at http://www.jmilne.org/math/articles/add/1975a.pdf, 1975.
- [Pera 13] Keerthi Madapusi Pera. “The Tate Conjecture for K3 Surfaces in Odd Characteristic.” arXiv:1301.6326, 2013.
- [Poonen et al. 12] Bjorn Poonen, Damiano Testa, and Ronald van Luijk. “Computing Néron–Severi Groups and Cycle Class Groups.” arXiv:1210.3720, 2013.
- [Schuett 12] Matthias Schuett. “Two Lectures on the Arithmetic of K3 Surfaces.” arXiv:1202.1066, 2012.
- [Sperber and Voight 13] Steven Sperber and John Voight. “Computing Zeta Functions of Nondegenerate Hypersurfaces with Few Monomials.” LMS J. Comput. Math. 16 (2013), 9–44.
- [Van Luijk 06] Ronald van Luijk. “Quartic K3 Surfaces without Nontrivial Automorphisms.” Math. Res. Lett. 13 (2006), 423–439.
- [Van Luijk 07a] Ronald van Luijk. “An Elliptic K3 Surface Associated to Heron Triangles.” J. Number Theory 123 (2007), 92–119.
- [Van Luijk 07b] Ronald van Luijk. “K3 Surfaces with Picard Number One and Infinitely Many Rational Points.” Algebra Number Theory 1 (2007), 1–15.
- [Zarhin 83] Yuri G. Zarhin. “Hodge Groups of K3 Surfaces.” J. Reine Angew. Math. 341 (1983), 193–220.