Fields Medal -- From MathWorld shigefumi mori (University of Kyoto?) Edward Witten (Institute for Advanced Study,Princeton). 1994, PierreLouis Lions (Université de Paris-Dauphine) http://mathworld.wolfram.com/FieldsMedal.html
Extractions: MATHWORLD - IN PRINT Order book from Amazon History and Terminology Prizes Recreational Mathematics ... Barran Fields Medal The Fields Medals are commonly regarded as mathematics' closest analog to the Nobel Prize (which does not exist in mathematics), and are awarded every four years by the International Mathematical Union to one or more outstanding researchers. "Fields Medals" are more properly known by their official name, "International medals for outstanding discoveries in mathematics." The Field Medals were first proposed at the 1924 International Congress of Mathematicians in Toronto, where a resolution was adopted stating that at each subsequent conference, two gold medals should be awarded to recognize outstanding mathematical achievement. Professor J. C. Fields, a Canadian mathematician who was secretary of the 1924 Congress, later donated funds establishing the medals which were named in his honor. Consistent with Fields' wish that the awards recognize both existing work and the promise of future achievement, it was agreed to restrict the medals to mathematicians not over forty at the year of the Congress. In 1966 it was agreed that, in light of the great expansion of mathematical research, up to four medals could be awarded at each Congress. The Fields Medal is the highest scientific award for mathematicians, and is presented every four years at the International Congress of Mathematicians, together with a prize of 15000 Canadian dollars. The first Fields Medal was awarded in 1936 at the World Congress in Oslo. The Fields Medal is made of gold, and shows the head of
Bulletin Of The American Mathematical Society 1994), Birkhäuser, Basel, 1995. pp. 680689MR 97k14043. MM Yoichi Miyaokaand shigefumi mori, A numerical criterion for uniruledness, Ann. of Math. http://www.ams.org/bull/2001-38-01/S0273-0979-00-00889-2/home.html
Extractions: Additional book information: Springer, Secaucus, NJ, 1996, viii+320, $139.95, 3-540-60168-6 References: [A] M. Artin, Deformations of singularities, Tata Inst. lecture notes [CR] A. Corti and M. Reid (eds.), Explicit birational geometry of 3-folds, CUP 2000, ISBN 521 63641 8 [G] Exp. 221, 249-276, Soc. Math. France, 1995 CMP [Ko] MR [KMM] MR [Mi] MR [MM] Yoichi Miyaoka and Shigefumi Mori, A numerical criterion for uniruledness, Ann. of Math. MR S. Mori, Projective manifolds with ample tangent bundles, Ann. of Math. (2) MR S. Mori, Threefolds whose canonical bundles are not numerically effective, Ann. of Math.
A Canonical Bundle Formula, Osamu Fujino, Shigefumi Mori Osamu Fujino and shigefumi mori. A Canonical Bundle Formula. Source J.Differential Geom. 56, no. 1 (2000), 167188 Abstract http://projecteuclid.org/Dienst/UI/1.0/Display/euclid.jdg/1090347529
Extractions: Current Issue Past Issues Search this Journal Editorial Board ... Subscriptions Osamu Fujino and Shigefumi Mori Source: J. Differential Geom. Abstract: A higher dimensional analogue of Kodaira's canonical bundle formula is obtained. As applications, we prove that the log-canonical ring of a klt pair with M MK X X with Kodaira dimension Full-text: Access denied (no subscription detected) We're sorry, but we are unable to provide you with the full text of this article because we are not able to identify you as a subscriber.
February 23 - Today In Science History FEBRUARY 23 BIRTHS. shigefumi mori In 1979, mori published his first majorresults, a proof of the Hartshorne conjecture, which stated that a certain http://www.todayinsci.com/2/2_23.htm
Extractions: Japanese mathematician who has made important contributions to the field of algebraic geometry. His major work, in which he proved the existence of minimal models for all three-dimensional algebraic varieties (Jan 1988), has been dubbed Mori's Program. Within ten years since his first published paper, Mori had thereby completed what many said could never be done. In 1979, Mori published his first major results, a proof of the Hartshorne conjecture, which stated that a certain class of algebraic varieties are projective in nature. In other words, these varieties or sets of solutions to given polynomial equations could be described using projective geometry. He was awarded the Fields Medal in 1990 for his work in algebraic geometry. Allan MacLeod Cormack South African-born American physicist who formulated the mathematical algorithms that made possible the development of a powerful new diagnostic technique, the cross-sectional X-ray imaging process known as computerized axial tomography (CAT) scanning. He first described this in two papers in 1963 and 1964. X-ray tomography is a process by which a picture of an imaginary slice through an object (or the human body) is built up from information from detectors rotating around the body. For this work, he was awarded a share of the 1979 Nobel Prize. Cormack was unusual in the field of Nobel laureates because he never earned a doctorate degree in medicine or any other field of science.
Math ArXiv: Search Results I. mori, S. Paul Smith. QA (AG). 2. Abs PS PDF alggeom/9508012Quotients by Groupoids. Sean Keel, shigefumi mori. AG. http://front.math.ucdavis.edu/author/Mori-S*
Math ArXiv: Search Results Andrea mori (Università di Torino). 42 pages. NT. 7. Abs PS PDF alggeom/9508012 Quotients by Groupoids. Sean Keel, shigefumi mori. AG. http://front.math.ucdavis.edu/author/mori
FIELDS MEDALLISTS' LECTURES Index for Subfactors; (1990) S mori; The Work of shigefumi mori by H Hironaka;Biographical Notice; Birational Classification of Algebraic Threefolds http://www.worldscibooks.com/mathematics/3445.html
Extractions: Although the Fields Medal does not have the same public recognition as the Nobel Prizes, they share a similar intellectual standing. It is restricted to one field that of mathematics and an age limit of 40 has become an accepted tradition. Mathematics has in the main been interpreted as pure mathematics, and this is not so unreasonable since major contributions in some applied areas can be (and have been) recognized with Nobel Prizes. The restriction to 40 years is of marginal significance, since most mathematicians have made their mark long before this age. A list of Fields Medallists and their contributions provides a bird's eye view of mathematics over the past 60 years. It highlights the areas in which, at various times, greatest progress has been made. This volume does not pretend to be comprehensive, nor is it a historical document. On the other hand, it presents contributions from 22 Fields Medallists and so provides a highly interesting and varied picture. The contributions themselves represent the choice of the individual Medallists. In some cases the articles relate directly to the work for which the Fields Medals were awarded. In other cases new articles have been produced which relate to more current interests of the Medallists. This indicates that while Fields Medallists must be under 40 at the time of the award, their mathematical development goes well past this age. In fact the age limit of 40 was chosen so that young mathematicians would be encouraged in their future work.
Journal Of Hypertension - April 2001, Volume 19, Issue 4 Naohiko Kobayashi; Yousuke mori; shigefumi Nakano; Yusuke Tsubokou; HiromichiShirataki; Hiroaki Matsuoka. Abstract HTML PDF (1 M) http://www.jhypertension.com/pt/re/jhypertension/toc.00004872-200104000-00000.ht
Extractions: LWWOnline LOGIN eALERTS REGISTER ... Archive Issue Table of Contents April 2001 , Volume 19 , Issue 4 Page # Article/Title Format Review Choice of drug treatment for obesity-related hypertension: where is the evidence? Arya M. Sharma; Tobias Pischon; Stefan Engeli; Juergen Scholze Editorial commentaries FREE Antihypertensive mechanisms of lipid-lowering drugs: decoding the 'Rosetta stone's inscriptions'. Guido Grassi; Stefano Taddei FREE Imaging techniques for non-invasive assessment of coronary heart disease in hypertension: value of an integrated approach. Giovanni de Simone; Gianfranco Parati Original papers Epidemiology Mean blood pressure, pulse pressure and grade of hypertension in untreated hypertensive patients with sleep-related breathing disorder. Ludger Grote; Jan Hedner; Jörg Hermann Peter Is coronary risk an accurate surrogate for cardiovascular risk for treatment decisions in mild hypertension? A population validation. Erica J. Wallis; Lawrence E. Ramsay; Iftikhar U. Haq; Parviz Ghahramani; Peter R. Jackson Placental weight and placental ratio as predictors of later blood pressure in childhood.
Video Tape List V 510 In8a 1990, Birational classification of algebraic threefolds12, mori,shigefumi, American Mathematical Society, 1990, ? http://www.math.snu.ac.kr/lib/html/video.html
Extractions: V 003 D491c Chaos, fractals, and dynamics computer experiments in mathematics Welz, Gary distributed by the American Mathematical Society V 004 D633 B128f Function level programming and the FL language Backus, John University Video Communications V 004 D633v2 Ag37p Parallel processing Agerwala, Tilak K University Video Communications V 004 D633v2 B572e Error correcting codes for digital signal processing Blahut, Richard E University Video Communications V 004 D633v2 G76s The shortest network problem Graham, Ronald L.,1935- University Video Communications V 004 D633v2 In4o Object-oriented programming Ingalls, Dan University Video Communications V 004 D633v3 Al53o Optimizing compilers for parallel computers Allen, Frances E University Video Communications V 004 D633v3 B292c Cache-coherent multiprocessors an easy approach to high performance computing Baskett, Forest University Video Communications V 004 D633v3 D569r Reasoning about programs3. Dijkstra, Edsger Wybe University Video Communications V 004 D633v3 G335x X window system design principles Gettys, James,1953-
Extractions: SupportsF Yamaguchi Prefecture Office, Yamaguchi City Office, Yamaguchi Industrial Promotion Organization, Chugoku Branch of the Instrtute of Electric Engineers of Japan, Chugoku Branch of The Institute of Electronics, Information and Communication Engineers, Chugoku Branch of the Illumination Engineering Institute of Japan, and Chugoku Branch of the Institute of Image Information and TelevisionEngineers ¡2DProgram
Untitled Document Translate this page Intervista a shigefumi mori. Piergiorgio Odifreddi. Fra il 1891 e il 1941 lascuola italiana di geometria di Guido Castelnuovo, Federigo Enriques e http://www.vialattea.net/odifreddi/Mori.htm
Extractions: Abbiamo intervistato Mori a Torino il 3 ottobre 2002, in occasione della " laurea honoris causa " assegnatagli dall'Università nel corso delle celebrazioni del cinquantenario della morte di Fano. E' una domanda ufficiale? Se vuole, posso fingere di non sentire. E quando ha deciso che sarebbe diventato un matematico? Ricorda un momento particolare? E come funziona il suo pensiero matematico? Che cosa succede, dunque, nell'immaginazione? No, perchè contengono solo una parte dell'informazione possibile. E' come in economia: c'è un'infinità di possibili indicatori numerici, ma se ne scelgono solo alcuni: il problema è di capire cosa significano. Nel caso dei coni, quando la parte piramidale non c'è si ha quello che si chiama un "modello minimale'', e la classificazione di Enriques e Kodaira delle varietà a due dimensioni è, in essenza, una classificazione dei loro modelli minimali. Come arrivò Kodaira a interessarsi di queste cose "italiane''?
Grad. Sch. Of Math., Nagoya Univ. Kobayashi, Shoshichi (Berkeley); Labesse, JeanPierre (Marseille); mori,shigefumi (Kyoto); Mukai, Shigeru (Kyoto); Nakanishi, Kenji (Nagoya); Ohsawa, http://www.math.nagoya-u.ac.jp/en/journal/editor.html
Extractions: Nagoya Math. J. Editors Updated: 2005/09/01 * Managing Editor Bona , Jerry L. (Chicago) Funaki , Tadahisa (Tokyo) Ghys , Etienne (Lyon) Kobayashi , Shoshichi (Berkeley) Labesse , Jean-Pierre (Marseille) Mori , Shigefumi (Kyoto) Mukai , Shigeru (Kyoto) Ohsawa , Takeo (Nagoya) Ponce , Gustavo (Santa Barbara) Weissler , Fred B. (Paris) Yoshida , Hiroyuki (Kyoto)
Osamu Fujino 6 (with shigefumi mori) A canonical bundle formula. J. Differential Geom.56 (2000), no. 1, 167188. 7 A canonical bundle formula for certain algebraic http://www.math.nagoya-u.ac.jp/~fujino/
Extractions: Special termination and reduction theorem st-red-HP1104.pdf What is log terminal ? what-HP1104.pdf On Special Termination st-HP.ps On Reduction Theorem rt-HP.ps On Diophantine Approximation (with Hiromichi Takagi) da-HP.ps A letter of a log minimal modeler What is log terminal ? lt-HP.ps A remark on the log MMP tq-HP.ps tq-HP.pdf re-HP.pdf An example of toric flops (with Hiroshi Sato) fl2-HP.pdf On three-dimensional terminal toric singularities tt-HP.pdf Flips vs Flops ff-HP3.pdf On Ohsawa's injectivity theorem (2005/1/27). Classification of three-dimensional terminal toric flips (2005/3/1) cl-HP.pdf Lemma of Moriwaki (with Hiromichi Takagi) (2005/7/17) mw-HP.pdf A lemma on flips (2005/7/22) le-HP.pdf A remark on the base point free theorem (2005/8/19) [1] Abundance theorem for semi log canonical threefolds. Duke Math. J. 102 (2000), no. 3, 513532.
Enciclopedia :: 100cia.com Translate this page shigefumi mori. (En este momento no hay texto en esta p¡gina. Para iniciar elartculo, click editar esta p¡gina (http//es.wikipedia.orgshigefumi_mori). http://100cia.com/enciclopedia/Shigefumi_Mori
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Hope Math Dept Newsletter Born on February 23, 1951 in Nagoya, Japan, shigefumi mori was awarded the FieldsMedal in 1990 for his work in algebraic geometry on classifying certain http://www.math.hope.edu/newsletter/2004-05/newsletter03-10.html
Extractions: He states his problem as follows: We begin with the four corners, (0,0), (1,0), (1,1) and (0,1) of a square in the plane, taken in that order. Then we generate a sequence of points by taking the average of two previous points, those 3 and 4 earlier in the sequence. So, our fifth point is [(0,0) + (1,0)]/2 = (1/2, 0), our 6th is [(1,0) + (1,1)]/2 = (1,1/2), etc. The points thus generated, connected sequentially by line segments, are depicted in the figure to the right. It seems that the sequence must tend to a limit. How does one show this? Can we find the coordinates of that limit? Does the path traced out by these points constitute one of finite or infinite length? We will investigate these questions not just for the specific problem stated above, but for similarly-generated sequences starting with an n -gon.
Extractions: The forerunner of the Mathematical Society of Japan was the "Tokyo Sugaku Kaisha", founded in 1877. This was the first academic society in Japan. The Mathematical Society of Japan (MSJ) was established in its present form in 1946. Currently the MSJ has more than 5,000 members, who enjoy the various benefits the MSJ has to offer, as well as the opportunity to participate in programs at MSJ meetings which take place in spring and in autumn each year. Members have the opportunity to announce their own research at MSJ meetings.