http://orcid.org/0000-0002-0632-9910
References
- [Achter et al. 15] J. D. Achter, D. Erman, K. S. Kedlaya, M. Matchett Wood, and D. Zureick-Brown. “A Heuristic for the Distribution of Point Counts for Random Curves Over a Finite Field.” Phil. Trans. R. Soc. A 373:2040 (2015).
- [Beauville and Ritzenthaler 11] A. Beauville and C. Ritzenthaler. “Jacobians Among Abelian Threefolds: A Geometric Approach.” Math. Ann. 350:4 (2011), 793–799.
- [Behrend 93] K. A. Behrend. “The Lefschetz Trace Formula for Algebraic Stacks.” Invent. Math. 112:1 (1993), 127–149.
- [Bucur et al. 10] A. Bucur, C. David, B. Feigon, and M. Lalín. “Fluctuations in the Number of Points on Smooth Plane Curves Over Finite Fields.” J. Number Theory 130:11 (2010), 2528–2541.
- [Bucur et al. 10] A. Bucur, C. David, B. Feigon, and M. Lalín. “Statistics for Traces of Cyclic Trigonal Curves Over Finite Fields.” Int. Math. Res. Not. IMRN 2010:5 (2010), 932–967.
- [Bucur et al. 11] A. Bucur, C. David, B. Feigon, and M. Lalín. “Biased statistics for traces of cyclic p-fold covers over finite fields.” In WIN—women in numbers, volume 60 of Fields Inst. Commun., pp. 121–143. Amer. Math. Soc., Providence, RI, 2011.
- [Bucur et al. 12] A. Bucur, C. David, B. Feigon, M. Lalín, and K. Sinha. “Distribution of Zeta Zeroes of Artin-Schreier Covers.” Math. Res. Lett. 19:6 (2012), 1329–1356.
- [Cheong et al. 15] G. Cheong, M. Matchett Wood, and A. Zaman. “The Distribution of Points on Superelliptic Curves Over Finite Fields.” Proc. Amer. Math. Soc. 143:4 (2015), 1365–1375.
- [Entin 12] A. Entin. “On the Distribution of Zeroes of Artin-Schreier L-functions.” Geom. Funct. Anal. 22:5 (2012), 1322–1360.
- [Homma and Kim 13] M. Homma and S. J. Kim. “Nonsingular Plane Filling Curves of Minimum Degree Over a Finite Field and their Automorphism Groups: Supplements to a Work of Tallini.” Linear Algebra Appl. 438:3 (2013), 969–985.
- [Homma and Kim 15] M. Homma and S. J. Kim. The second largest number of points of plane curves over finite fields, 2015. http://arxiv.org/abs/1509.02247
- [Ibukiyama 93] T. Ibukiyama. “On Rational Points of Curves of Genus 3 Over Finite Fields.” Tohoku Math. J. (2) 45:3 (1993), 311–329.
- [Katz and Sarnak 99] N. M. Katz and P. Sarnak. Random matrices, Frobenius Eigenvalues, and Monodromy, volume 45 of American Mathematical Society Colloquium Publications. Providence, RI: American Mathematical Society, 1999.
- [Kolassa 97] J. E. Kolassa. Series Approximation Methods in Statistics, volume 88 of Lecture Notes in Statistics, 2nd ed. New York: Springer-Verlag, 1997.
- [Kurlberg and Rudnick 09] P. Kurlberg and Z. Rudnick. “The Fluctuations in the Number of Points on a Hyperelliptic Curve Over a Finite Field.” J. Number Theory 129:3 (2009), 580–587.
- [Kurlberg and Wigman 11] P. Kurlberg and I. Wigman. “Gaussian Point Count Statistics for Families of Curves Over a Fixed Finite Field.” Int. Math. Res. Not. 2011:10 (2011), 2217.
- [Lachaud and Ritzenthaler 08] G. Lachaud and C. Ritzenthaler. “On Some Questions of Serre on Abelian Threefolds.” In Algebraic geometry and its applications, volume 5 of Ser. Number Theory Appl., edited by J. Chaumine, J. Hirschfeld and R. Rolland, pp. 88–115. Hackensack, NJ: World Sci. Publ., 2008.
- [Lachaud et al. 10] G. Lachaud, C. Ritzenthaler, and A. Zykin. “Jacobians Among Abelian Threefolds: A Formula of Klein and A Question of Serre.” Math. Res. Lett. 17:2 (2010), 323--333.
- [Lauter 02] K. Lauter. “The Maximum or Minimum Number of Rational Points on Genus Three Curves Over Finite Fields.” Compos. Math. 134:1 (2002), 87–111. With an appendix by Jean-Pierre Serre.
- [Lercier 14] R. Lercier, C. Ritzenthaler, F. Rovetta, and J. Sijsling. “Parametrizing the Moduli Space of Curves and Applications to Smooth Plane Quartics Over Finite Fields.” LMS J. Comput. Math., 17:Suppl. A (2014), 128–147.
- [Matchett Wood 12] M. Matchett Wood. “The Distribution of the Number of Points on Trigonal Curves Over Fq.” Int. Math. Res. Not. IMRN 2012:23 (2012), 5444–5456.
- [Mestre 10] J.-F. Mestre. Courbes de genre 3 avec S3 comme groupe d’automorphismes, 2010. http://arxiv.org/abs/1002.4751
- [Nart and Ritzenthaler 08] E. Nart and C. Ritzenthaler. “Jacobians in Isogeny Classes of Supersingular Abelian Threefolds in Characteristic 2.” Finite Fields Appl. 14 (2008), 676–702.
- [Nart and Ritzenthaler 10] E. Nart and C. Ritzenthaler. “Genus Three Curves with Many Involutions and Application to Maximal Curves in Characteristic 2.” In Proceedings of AGCT-12, volume 521, pp. 71–85. Contemporary Mathematics, 2010.
- [Poonen 04] B. Poonen. “Bertini Theorems Over Finite Fields.” Ann. Math. (2) 160:3 (2004), 1099–1127.
- [Ritzenthaler 09] C. Ritzenthaler. Aspects arithmétiques et algorithmiques des courbes de genre 1, 2 et 3. Habilitation à Diriger des Recherches, Université de la Méditerranée, 2009.
- [Ritzenthaler 10] C. Ritzenthaler. “Explicit Computations of Serre’s Obstruction for Genus-3 Curves and Application to Optimal Curves.” LMS J. Comput. Math. 13 (2010), 192–207.
- [Serre 83] J.-P. Serre. “Nombres de points des courbes algébriques sur Fq.” In Seminar on number theory, 1982–1983 (Talence, 1982/1983), pages Exp. No. 22, 8. Univ. Bordeaux I, Talence, 1983.
- [Sørensen 94] A. B. Sørensen. “On the Number of Rational Points on Codimension-1 Algebraic Sets in Pn(Fq).” Discrete Math. 135:1–3 (1994), 321–334.
- [Tallini 61] G. Tallini. “Le ipersuperficie irriducibili d’ordine minimo che invadono uno spazio di Galois.” Atti Accad. Naz. Lincei Rend. Cl. Sci. Fis. Mat. Nat. (8) 30 (1961), 706–712.
- [Tallini 61] G. Tallini. “Sulle ipersuperficie irriducibili d’ordine minimo che contengono tutti i punti di uno spazio di Galois Sr, q.” Rend. Mat. e Appl. (5) 20 (1961), 431–479.
- [van der Geer and van der Vlugt 92] G. van der Geer and M. van der Vlugt. “Supersingular Curves of Genus 2 Over Finite Fields of Characteristic 2.” Mathematische Nachrichten 159 (1992), 73–81.
- [Xiong 10] M. Xiong. “The Fluctuations in the Number of Points on a Family of Curves Over a Finite Field.” J. Théor. Nombres Bordeaux 22:3 (2010), 755–769.
- [Xiong 15] M. Xiong. “Distribution of Zeta Zeroes for Abelian Covers of Algebraic Curves Over a Finite Field.” J. Number Theory 147 (2015), 789–823.