Tables (Elliptic Curves and Modular Forms)

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Modular Polynomials Modular Polynomials: Tables and Maple software for modular polynomials of composite level by Masanari Kida. (Tables) http://matha.e-one.uec.ac.jp/~kida/modularpoly.html Research Information - Larry Lehman Research Information - Larry Lehman: Includes a list of publications with abstracts, and tables of elliptic curves of small rank and various conductors. (Tables) http://www1.mwc.edu/%7Ellehman/research.htm Iwasawa Invariants of Elliptic Curves Iwasawa Invariants of Elliptic Curves: For each curve (labelled as in Cremona) the mu and lambda-invariants are listed for the primes between 2 and 17. By Robert Pollack. (Tables) http://abel.math.harvard.edu/~rpollack/Data/data.html Elliptic Curves with Unusual Torsion Elliptic Curves with Unusual Torsion: Two tables: the smallest conductor observed for a given rank and torsion, and the smallest conductor observed among curves of rank zero with a given Sha and torsion. Maintained by Tom Womack. (Tables) http://tom.womack.net/maths/torsion.htm Siegel Forms Siegel Forms: Coefficients of some Siegel automorphic forms, by Richard Borcherds. (Tables) http://www.math.berkeley.edu/~reb/papers/siegel/ Modular Forms Database Modular Forms Database: Tables computed by William Stein using HECKE, LiDIA, PARI and Magma. (Tables) http://modular.fas.harvard.edu/Tables/ Best Known Conductors for Elliptic Curves of Given Rank Best Known Conductors for Elliptic Curves of Given Rank: Up to rank 9, by Tom Womack. (Tables) http://tom.womack.net/maths/conductors.htm Drinfeld Modules Drinfeld Modules: Complete tables of sign-normalized, rank one, Drinfeld modules on the elliptic curves over finite fields of order less than 16. (Tables) http://www.math.umass.edu/~dhayes/dmods.html MathSource: Elliptic Curve Data MathSource: Elliptic Curve Data: Tables of elliptic curves of small conductor in Mathematica format. (Tables) http://www.mathsource.com/Content/Applications/Mathematics/0200-338 Class Polynomials of CM-fields Class Polynomials of CM-fields: Class polynomials of the principal orders up to discriminant -300000, giving values of the Weber invariants. By Annegret Weng. (Tables) http://www.exp-math.uni-essen.de/zahlentheorie/classpol/class.html John Cremona's Elliptic Curve Data John Cremona's Elliptic Curve Data: Various data files in a standard format to make them easily readable by other programs, extending and correcting the tables in his book "Algorithms for Elliptic Curves". (Tables) http://www.maths.nott.ac.uk/personal/jec/ftp/data/INDEX.html Mordell Curves Mordell Curves: Minimal known positive and negative k for Mordell curves (y^2=x^3+k) of given rank, by Tom Womack. (Tables) http://www.tom.womack.net/maths/mordellc.htm Deformations of Maass Forms Deformations of Maass Forms: Tabulated by Stefan Lemurell. (Tables) http://www.math.chalmers.se/~sj/Maass/ Rational Points on Elliptic Curves Rational Points on Elliptic Curves: A wide collection of known integer solutions to elliptic curves and their corresponding Diophantine equations, presented by Hisanori Mishima. (Tables) http://www.asahi-net.or.jp/~KC2H-MSM/ec/eca1/index.htm 310716 Elliptic Curves of Prime Conductor 310716 Elliptic Curves of Prime Conductor: The elliptic curves of prime conductor less than 10^8 found during computations performed at Fordham University during 1989 and 1990. Some additional materials are also given. (Tables) http://www.oisinmc.com/math/310716/ High Rank Elliptic Curves with Prescribed Torsion High Rank Elliptic Curves with Prescribed Torsion: The highest rank currently known for an elliptic curve over Q with each of the possible torsion groups. Compiled by Andrej Dujella. (Tables) http://www.math.hr/~duje/tors/tors.html Infinite Families of Elliptic Curves with Prescribed Torsion Infinite Families of Elliptic Curves with Prescribed Torsion: Compiled by Andrej Dujella. (Tables) http://www.math.hr/~duje/tors/generic.html Elliptic Curves with Complex Multiplication Elliptic Curves with Complex Multiplication: Defined over extensions of type (2,...,2). Tables by Joan-C. Lario. (Tables) http://www-ma2.upc.es/~lario/ellipticm.htm