Portrait of Kristin Lauter

Kristin Lauter

Principal Researcher, Research Manager

Publications

by Google Scholar

Books

Progress in Cryptology — LATINCRYPT 2015, 4th International Conference on Cryptology and Information Security in Latin America, Guadalajara, Mexico, August 23-26, 2015. Lecture Notes in Computer Science 9230, Springer. Co-edited with Francisco Rodriguez-Henriquez.

Selected Areas in Cryptography 2013, Lecture Notes in Computer Science, Springer 2014. Co-edited with Tanja Lange and Petr Lisonek.

WIN–Women in Numbers: Research Directions in Number Theory, Fields Institute Communications Series, Volume 60 (2011). Co-edited with Alina-Carmen Cojocaru, Rachel Pries, Renate Scheidler.

Computational Arithmetic Geometry. AMS Contemporary Mathematics Series, volume 463 (2008). Co-edited with Ken Ribet.

Topics in Algebraic and Noncommutative Geometry, Proceedings of the Conferences in memory of Ruth Michler. AMS Contemporary Mathematics Series, volume 324 (2003) . Co-edited with Caroline Grant Melles, Jean-Paul Brasselet, Gary Kennedy, Lee McEwan.

Articles by area

Cryptography

2015

  • 2015/971 ( PDF ) Attacks on Search RLWE Hao Chen, Kristin Lauter, and Katherine E. Stange
  • 2015/965 ( PDF ) Private Genome Analysis through Homomorphic Encryption Miran Kim and Kristin Lauter,  BioMed Central, Journal of Medical Informatics and Decision Making
  • 2015/758 ( PDF ) Ring-LWE Cryptography for the Number Theorist Yara Elias and Kristin E. Lauter and Ekin Ozman and Katherine E. Stange, Proceedings of WIN3
  • 2015/386 ( PDF ) Privately Evaluating Decision Trees and Random Forests David J. Wu and Tony Feng and Michael Naehrig and Kristin Lauter
  • 2015/176 ( PDF ) Key Recovery for LWE in Polynomial Time Kim Laine and Kristin Lauter
  • 2015/133 ( PDF ) Private Computation on Encrypted Genomic Data Kristin Lauter and Adriana Lopez-Alt and Michael Naehrig, LatinCrypt 2014 (GenoPri 2014).
  • 2015/132 ( PDF ) Homomorphic Computation of Edit Distance Jung Hee Cheon and Miran Kim and Kristin Lauter, Workshop on Applied Homomorphic Cryptography 2015
  • 2015/106 ( PDF ) Provably weak instances of Ring-LWE Yara Elias and Kristin E. Lauter and Ekin Ozman and Katherine E. Stange, CRYPTO 2015
  • 10.1093/bioinformatics/btv563 HEALER: Homomorphic computation of ExAct Logistic rEgRession for secure rare disease variants analysis in GWAS. BioinformaticsShuang Wang, Yuchen Zhang, Wenrui Dai, Kristin Lauter, Miran Kim, Yuzhe Tang, Hongkai Xiong, Xiaoquian Jiang.

Earlier

Arithmetic geometry

Cryptographic implementation improvements

Algorithmic number theory

Number of points on curves over finite fields

  • Genus-2 curves and Jacobians with a given number of points. LMS Journal of Computation and Mathematics, With Reinier Bröker, Everett W. Howe, Peter Stevenhagen. http://arxiv.org/pdf/1403.6911.pdf
  • New methods for bounding the number of points on curves over finite fields, by Everett W. Howe, Kristin E. Lauter, in Geometry and Arithmetic, Editors: C. Faber, G.Farkas, R. de Jong, European Mathematical Society 2012, pp. 173–212.
  • Pointless curves of genus 3 and 4, by Everett W. Howe, Kristin E. Lauter, Jaap Top, in Arithmetic, geometry and coding theory, Yves Aubry – Gilles Lachaud (Éd.) Séminaires et Congrès 11 (2005), xviii+216 pages, pp. 125–141.
  • Improved upper bounds for the number of points on curves over finite fields, by Everett W. Howe, Kristin E. Lauter, Annales de l’Institut Fourier, volume 53, 6(2003), 1677–1737.
  • The maximum number of points on a curve of genus 4 over F8 is 25, by David Savitt, with an Appendix by K. Lauter, Canad. J. Math., 55 (2003), 331–352.
  • The maximum or minimum number of rational points on genus three curves over finite fields, by Kristin Lauter with an Appendix by J-P. Serre, Compositio Math. 134 (2002) 87–111.
  • Geometric methods for improving the upper bounds on the number of rational points on algebraic curves over finite fields. Lauter, Kristin, with an appendix in French by J.-P. Serre. J. Algebraic Geom. 10 (2001), no. 1, 19–36.
  • Zeta functions of curves over finite fields with many rational points. Kristin Lauter, Coding theory, cryptography and related areas (Guanajuato, 1998), 167–174, Springer, Berlin, 2000.
  • Non-existence of a curve over F3 of genus 5 with 14 rational points. Kristin Lauter, Proc. Amer. Math. Soc. 128 (2000), no. 2, 369–374. MR 1664414.Abstract, references, and article information View Article: PDF
  • Improved upper bounds for the number of rational points on algebraic curves over finite fields. Kristin Lauter, C. R. Acad. Sci. Paris Sér. I Math. 328 (1999), no. 12, 1181–1185.
  • A Formula for Constructing Curves over Finite Fields with Many Rational Points Kristin Lauter, Journal of Number Theory, Volume 74, Issue 1, January 1999, Pages 56-72.
  • Deligne-Lusztig curves as ray class fields. Kristin Lauter, Manuscripta Math. 98 (1999), no. 1, 87–96.
  • Ray Class Field Constructions of Curves over Finite Fields with Many Rational Points, K. Lauter, Algorithmic Number Theory Symposium (ed. by H. Cohen), Lecture Notes in Computer Science 1122, 187-195 Springer, Berlin 1996.