MSRItemp - Sagemath Wiki

Temporary wiki for organizing the informal reading groups at the Arithmetic Statistics program at MSRI.

Informal Reading Groups

chair: Bjorn Poonen
The first meeting of the reading group will be Tuesday, January 25, 11-12. It will be in the 2nd floor seminar room if that room is available.
Informal reading group on the Cohen-Lenstra heuristics
Reading list (in increasing order of sophistication):
- MR0750661 Cohen, H. ; Lenstra, H. W., Jr. Heuristics on class groups. Number theory (New York, 1982), 26--36, Lecture Notes in Math., 1052, Springer, Berlin, 1984.
- MR0756082 (85j:11144) Cohen, H. ; Lenstra, H. W., Jr. Heuristics on class groups of number fields. Number theory, Noordwijkerhout 1983 (Noordwijkerhout, 1983), 33--62, Lecture Notes in Math., 1068, Springer, Berlin, 1984.
- MR1837670 (2003a:11065) Delaunay, Christophe. Heuristics on Tate-Shafarevitch groups of elliptic curves defined over Q. Experiment. Math. 10 (2001), no. 2, 191--196.
- Delaunay, Christophe. Formes modulaire et invariants de courbes elliptiques définies sur Q. Thèse, Université Bordeaux I, 2002.
PDFs of these have been placed in Poonen's public directory at MSRI. Type cd ~bpoonen/Public at a terminal prompt.

chair: Kaneenika Sinha
times: Wednesdays 11-12. Please note: The first meeting on 19 Jan will be from 2-3 pm in the Baker boardroom.
Wed. 19 Jan in the Common Room: Henryk Iwaniec, Introduction to low lying zeros of L-functions
- Abstract: The content of the paper "Low lying zeros of families of L-functions" by Iwaniec, Luo and Sarnak will be described in general terms.
H. Iwaniec, W. Luo, and, P. Sarnak, Low lying zeros of families of L-functions, Publ. IHES, 2000.
- Iwaniec-Luo-Sarnak.pdf
there is also a study guide and reading list by Steven Miller, at Williams: http://www.williams.edu/go/math/sjmiller/public_html/ntandrmt/

chair: Barry Mazur
times: Thursdays 11-12
next meeting will be 2-3pm (Simons auditorium), Tuesday 25 January - Melanie Wood, who recommends reading http://arxiv.org/abs/1005.0672 (only for the proofs of the main terms). "Section 1-5,8 of that paper I think are a very good introduction to the ideas in a case small enough to actually picture."
pp. 2-9 (i.e., the Introduction) of Binary quadratic forms having bounded invariants, and the boundedness of average ranks of elliptic curves
Manjul's collected works: http://wstein.org/home/wstein/travel/2011/msri/bhargava/

chair: Jamie Weigandt
times: Fridays 11-12
Reading list:
- MR1292115 (95h:11064) Heath-Brown, D. R. The size of Selmer groups for the congruent number problem. II. With an appendix by P. Monsky. Invent. Math. 118 (1994), no. 2, 331–370.
- MR2464773 (2010d:11059) Swinnerton-Dyer, Peter. The effect of twisting on the 2-Selmer group. Math. Proc. Cambridge Philos. Soc. 145 (2008), no. 3, 513–526.
- Kane, Daniel. On the Ranks of the 2-Selmer Groups of Twists of a Given Elliptic Curve. Preprint. http://arxiv.org/pdf/1009.1365v1
- PDFs of these papers have been placed in my public directory at MSRI, which can be accessed by typing cd ~weigandt/Public at a terminal prompt.