HTML and/or PDF files in the folder conflist-rims
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Ram Abhyankar ram@cs.purdue.edu Simultaneous Surface Resolution rabhyankar-abst08-30-06.html %-%-% rabhyankar-abst08-30-06.pdf

Anna Cadoret  anna.cadoret@math.u-bordeaux1.fr Arithmetic properties of Moduli spaces for p-etale G-covers and torsion on abelian varieties acadoret-abst09-05-06.pdf

Pierre Dèbes pde@ccr.jussieu.fr l-adic aspects of the Modular Tower program. The pdf file is the resulting preprint, as of 11/15/07, Abelian Contstraints in Inverse Galois Theory with Anna Cadoret. The most inaccessible groups to the Inverse Galois Problem are the nontrivial Frattini extensions of simple, F(rattini)S(imple), groups. Many simple groups have been realized as regular extensions using the Braid Monodromy method, and all p groups as Galois groups by Shafarevich's method. For, however, diophantine reasons, there is no compatibility between the two methods. Beyond the spin covers of alternating groups, there is a paltry list of FS realizations. This paper traces an obstruction to realization of FS groups to geometric properties of Hurwitz spaces. This improves on previous observations connecting the Strong Torsion Conjecture on Abelian Varieties to the Main Conjecture on Modular Towers. pdebes-abst09-06-06.html %-%-% pdebes-abst09-06-06.pdf

Michael Dettweiler Michael.Dettweiler@iwr.uni-heidelberg.de Motives with Galois group G2 mdettweiler-abst09-14-06.html

Michel Emsalem  emsalem@math.univ-lille1.fr l-adic points on Modular Towers memsalem-abst09-15-06.pdf

Gerhard Frey frey@exp-math.uni-essen.de Curves of genus 2 with elliptic differentials and associated Hurwitz spaces gfrey-abst08-31-06.pdf

Mike Fried mfri4@aol.com mfried@math.uci.edu How Pure-cycle Nielsen classes Test the Main Modular Tower Conjecture. The paper produced from this is the pdf file, titled Connectedness of spaces of sphere covers of Atomic-Orbital Type mfried-MT-connectedness.html %-%-% mfried-MT-connectedness.pdf

Hidekazu Furusho furusho@math.nagoya-u.ac.jp Survey of Drinfel'd's work on GT and its associated quantum groups hfurusho-abst09-05-06.html

David Harbater harbater@math.upenn.edu On Function Fields with Free Absolute Galois Groups dharbater-abst09-08-06.html

Ki-ichiro Hashimoto (joint work with Hiroshi Tsunogai) tsuno@mm.sophia.ac.jp khasimot@waseda.jp Some recent results on Noether's problem khashimoto-tsun09-17-06.html

Yuichiro Hoshi yuichiro@kurims.kyoto-u.ac.jp Cuspidalizations of fundamental groups of configuration spaces, Suppose X is a projective curve, minus a finite number of points. In characteristic 0 there are known generators and relations for the fundamental group of the space UXr: product of X taken r times, minus its fat diagonal. In particular, knowing the fundamental group of X determines that of UXr. This paper produces the correct version of the last statement in positive characteristic. yhoshi-confspace12-26-07.html %-%-% yhoshi-confspace12-26-07.pdf

Yasutaka Ihara ihara@mtb.biglobe.ne.jp On Euler-Kronecker invariants of global fields The work of this talk has appeared as On the Euler-Kronecker constants of global fields and primes with small norms, Algebraic Geometry and Number Theory In Honor of Vladimir Drinfeld's 50th Birthday (V.Ginzburg ed.), Birkhauser, Progress in Mathematics 253 (2006), 407–451. Pending 11/13/07 yihara10-14-07.html %-%-% yihara10-14-07.pdf

Kinya Kimura Kinnyakim@aol.com  Modular towers of moduli stacks kkimura-abst09-09-06.html

Jochen Koenigsmann Jochen.Koenigsmann@unibas.ch On birational anabelian geometry over almost arbitrary fields jkonigsmann-abst09-18-06.html

Jan Minác minac@uwo.ca     Galois cohomology, quotients of absolute Galois groups, and a little modular representation theory jminac-BeLeSwa11-11-07.html %-%-% jminac-BeLeSwa11-11-07.pdf

Florian Pop pop@math.upenn.edu Meta-abelian anabelian geometry over algebraically closed base fields fpop09-14-06.html

Mohamed Saidi m.saidi@exeter.ac.uk A prime to p version of the Grothendieck anabelian conjecture in characteristic p>0 (joint work with Akio Tamagawa) msaidi-abst09-06-06.html

Darren Semmen dsemmen@gmail.com Duality groups and modular towers dsemmen-abst09-17-06.html

Jakob Stix stix@math.uni-bonn.de Exploration of anabelian varieties in higher dimension jstix-abst09-16-06.html

Tamas Szamuely szamuely@renyi.hu Local-global principles for semiabelian varieties tszamuely-abst09-15-06.html

Akio Tamagawa tamagawa@kurims.kyoto-u.ac.jp The algebraic and anabelian geometry of configuration spaces (joint work with Shinichi Mochizuki) coordinator with organizing committee of RIMS International Research Project Arithmetic Algebraic Geometry. For the latest results on the talk topic, see Shinichi Mochizuki and Akio Tamagawa, The algebraic and anabelian geometry of configuration spaces, to appear in Hokkaido Mathematical Journal. atamagawa-abst09-08-06.html

Michael Tsfasman tsfasman@iitp.ru Infinite global fields and their zeta-functions mtsfasman-abst09-18-06.pdf

Thomas Weigel thomas.weigel@unimib.it Class field theory and modular towers tweigel-abst09-04-06.pdf

Jared Weinstein jared@Math.Berkeley.EDU Galois representations with prescribed ramification jweinstein-abst09-10-06.pdf

Yuri Zarhin zarhin@math.psu.edu Abelian varieties without homotheties, The pdf file appeared as Abelian varieties without homotheties, Mathematical Research Letters 14 (2007), 157--164. yzarhin-abst08-30-06.html %-%-% yzarhin-abst08-30-06.pdf

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The full program including organization, ties to the Red Lodge Conference and Plans for a Future Conference
  1. ORGANIZERS AND ATTENDEES
    1. ORGANIZERS
    2. FURTHER ATTENDEES
    3. CONFERENCE THEME AND TALK EXPECTATIONS
  2. RELATED WEB SITES INCLUDING PROGRAM FOR THE TWO CONFERENCE PARTS
    1. PROGRAM FOR THE October 23-31 RIMS WORKSHOP
    2. OVERALL RIMS ARITHMETIC GEOMETRY WORKSHOP
  3. CONFERENCE SUPPORT
  4. TALK EQUIPMENT
  5. ACCOMODATIONS AND TRANSPORTATION
    1. ROOMS
    2. FROM AIRPORT TO HOTEL
  6. PAST AND FUTURE CONFERENCES
    1. INTRODUCTORY CONFERENCE -- RED LODGE
      2. FINAL PRESENTATION CONFERENCE -- BANFF?
kyoto-profgeom.html

The precise schedule of the program Oct 23 to Oct 27: kyoto-prog10-23to27.html

The precise schedule of the program: Oct 30 and Oct 31 kyoto-prog10-30to31.html

Final program for Workshop in Arithmetic Galois Theory and Related Moduli Spaces October 23-27 & 30-31, 2006, Room 420 and then 115, RIMS, Kyoto University.
Program Organizers: P. Debes, M. Fried, J. Koenigsmann, H. Nakamura and K. Ribet RIMS2006Galois-revised.pdf

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