Liste Des Nouvelles Acquisitions - Septembre - Octobre 2004 higman, graham. Existentially Closed Groups. Oxford University Press. 1988.08.0796. IVANOV, AA. Geometry of Sporadic Groups I Petersen and Tilds http://www.desargues.univ-lyon1.fr/Sept_Oct_2004.htm
Extractions: Liste des nouvelles acquisitions - Septembre - Octobre 2004 ADEM, Alejandro Cohomology of Finite Groups Springer- Verlag AKIVIS, Maks Differential Geometry of Varieties with Degenerate Gauss Maps. Springer-Verlag AMBARTZUMIAN, R.V. Factorization calculus and geometric probability Cambridge University Press BAKER George A., JR. Padé Approximants. (2nd Edition.) Cambridge University Press BANKS, John Chaos : A mathematical Introduction. Cambridge University Press BAPAT, R. B. NonNegative Matrices and Applications Cambridge University Press BEN-ISRAEL, Adi Generalized Inverses :Theory and Applications Springer-Verlag BENSOUSSAN, Alain; CIARLET, Philippe G.; Oeuvres choisies de Jacques-Louis Lions. (Vol. 1) SMAI / EDP Sciences BENSOUSSAN, Alain; CIARLET, Philippe G.; Oeuvres choisies de Jacques-Louis Lions. (Vol. 2) SMAI / EDP Sciences BENSOUSSAN, Alain; CIARLET, Philippe G.; Oeuvres choisies de Jacques-Louis Lions. (Vol. 3) SMAI / EDP Sciences BERNSTEIN , J. GELBART , S. ( Eds An Introduction to the Langland Program Birkhäuser BIALYNICKI-BIRULA, Andrzej Invariant Theory and Algebraic Transformation Groups II Springer-Verlag BJORNER, A.
MaCuData Report, In '' Format. Wilson RJ, Rice A. (2001) Interview with graham higman in Interview with grahamhigman Sep 2001 edition issue 41 pp. 1213 European Mathematical Society (ed http://mcs-notes1.open.ac.uk:8080/MaCuData.nsf/$$ViewTemplate for Bibliography\I
Oxford University Press: Existentially Closed Groups: Elizabeth Scott graham higman and Elizabeth Scott. bookshot Add to Cart graham higman,Mathematical Institute, Oxford University, and Elizabeth Scott, Department of http://www.oup.com/us/catalog/general/subject/Mathematics/PureMathematics/?view=
Balliol College, Oxford: Calendar Entry higman, graham, MA, D.Phil., FRS * Knowles, Jeremy Randall, CBE, MA, D.Phil., FRS *Thomas, Sir Keith Vivian, MA, FBA * Hinde, Robert Aubrey, MA, D.Phil., http://www.akme.btinternet.co.uk/oclball2.html
Extractions: In addition to the fellowships established or authorized by the statutes of the College, the Jowett Fellowships were founded in 1906 by James Hozier, second Baron Newlands, in memory of the Revd Benjamin Jowett, Master of the College 1870-93. These are held, with their other fellowships, by Fellows of the College.
Magdalen Calendar Entry, Fellows, 2003-4 higman, graham, MA, D.Phil., FRS Stoye, John Walter, MA, D.Phil. Jones, EmrysLloyd, MA, FBA Pasicy, Sir John Malcolm Sabine, MA, FBA http://www.akme.btinternet.co.uk/oclmage2.html
Extractions: OR FOR THE COLLEGE'S OWN WEBSITE (TAKES YOU OUT OF WWW.AKME) College arms: "Lozengy ermine and sable, on a chief of the second three lilies argent slipped and seeded or" THIS college was founded in 1458, by William of Waynflete, successively Headmaster of Winchester and Eton Colleges, Provost of Eton, Bishop of Winchester, and sometime Lord High Chancellor of England, for a President, forty fellows, thirty scholars called demies, a schoolmaster, an usher, four chaplains, a steward, an informator choristarum , eight clerks, and sixteen choristers. Academical clerkships, scholarships, and exhibitions tenable by demies, clerks and other members of the College, have been added at different times by various benefactors. Under the existing Statutes there are the following classes of fellows: Official Fellows, Fellows by Special Election, Fellows by Examination, Professorial Fellows, and Supernumerary Fellows. There may be also Honorary Fellows, Waynflete Fellows, Visiting Fellows, and Emeritus Fellows. Of Professorial fellowships four are attached to the four Waynflete Professorships in the University, one to the Sherardian Professorship of Botany, one to the Fiat-Serena Professorship of Italian Studies, and one to the Nuffield Professorship of Clinical Medicine.
AAS-Interview With Cheryl Praeger When I arrived I was interviewed by graham higman, the chairman of the MathematicalInstitute. He said it was time I learnt some more group theory, http://www.science.org.au/scientists/cp.htm
Extractions: A wonderful tutorial after 16 years Professor Cheryl Praeger, mathematician, was interviewed in 1999 for the Australian Academy of Science's '100 Years of Australian Science' project funded by the National Council for the Centenary of Federation. This project is part of the Interviews with Australian scientists program. The interview was conducted by Professor Bernhard Neumann . Here is an edited transcript. You can order the videotape from us for $65.50 (including GST). List of edited transcripts Quite mixed forebears Cheryl, I would like to start with your ancestry. Your forebears were from Chemnitz, in East Germany, and from Ireland. Do you know anything about them? I do know a little bit about my forebears. The last three generations have all been born in Australia, including all of my grandparents. It took me a long time to find out just where the Praeger side came from, because although I had a letter between my Dads brother, Uncle Doug, and his cousin in Germany, the town had been renamed Karl-Marx-Stadt after World War II and so I couldnt find it by looking in current atlases. My forebears from Chemnitz had moved temporarily to Dublin, where I think the husband was in the diplomatic corps. After he died, his wife and family stayed in Dublin for a bit and then moved back. But, according to family legend, the Praegers came out to Queensland from Ireland rather than from Germany.
Read This: Combinatorial Group Theory having an unsolvable word problem; and graham higman, in 1961, characterizedsubgroups of finitely related groups in terms of recursive functions. http://www.maa.org/reviews/MagnusKarrassSolitar.html
Extractions: by W. Magnus, A. Karrass, and D. Solitar From about the middle of the 19th century, group theory divided itself into two parts: discrete groups and topological groups. Most research about discrete groups centered around finite groups. However, by the end of the century, finitely generated abelian groups had been classified, and von Dyck had introduced free groups and presentations of groups by generators and relations. Inspired by questions about fundamental groups, Dehn posed the word problem: does every finitely presented group possess an algorithm which can determine whether an arbitrary word on its generators is equal to the identity? For the next fifty years, finite groups continued to be the main focus of research in discrete groups, but some important results about infinite groups were discovered: the Schreier-Neilsen theorem that subgroups of free groups are free, and its generalization by Kurosh that subgroups of free products are themselves free products; the Freiheitssatz of Magnus described the structure of groups with only one defining relation; Ulm classified all countable torsion abelian groups; Baer began the study of torsion-free abelian groups.
AMERICAN MATHEMATICAL MONTHLY - December 2001 The error group has an associated geometry via the theory of extra specialpgroups, developed in the 1950s by Philip Hall and graham higman. http://www.maa.org/pubs/monthly_dec01_toc.html
Extractions: Until very recently, mathematical pictures consisted almost entirely of black and white graphs in two or three dimensions. There is the potential, in modern computational environments, to completely change this. A visualization is most interesting when it reveals new and unexpected structure; when it makes complicated phenomena transparent; or when it suggests the right method of proof. This paper, primarily through examples of phenomena chosen from some fairly elementary problems in number theory, aims to support these claims. The main purpose of this article is to show how to use ones calculus/differential equations intuition to solve certain discrete differential equations. We do this by first developing discrete calculus and along the way, we easily obtain closed formulas for sums such as k+k2++km, and discrete analogues of Taylors formula and the Chain Rule (involving moving averages). Discrete integrating factors allow us to express the solutions of certain discrete differential equations naturally as convolutions. We can interpret these solutions as the convolution of the impulse response with the driving sequence. This has an analog in differential equations: The driven harmonic oscillator whose solution is the convolution of the impulse response with the driver. Our main point is to show how to use discrete calculus to solve certain discrete differential equations, whose solutions are usually found by guessing and induction.
Extractions: Coauthors: Vincenzo Marra Graham Higman proved that a finitely generated group can be embedded in a finitely presented group iff it has a recursively enumerable set of defining relations. We consider the analogue for lattice-ordered groups. Clearly, the finitely generated lattice-ordered groups that can be l-embedded in finitely presented lattice-ordered groups must have recursively enumerable sets of defining relations. We prove the converse direction for a special class of lattice-ordered groups: The technique is an amalgamation of three disparate areas: (1) continued fractions, (2) recent advances in direct limits of Abelian lattice-ordered groups, and (3) using permutation groups to encode the necessary information (a technique whose origins can be found in work of Ralph McKenzie and Richard Thompson). Date received: January 9, 2002
Extractions: ASA News ASEE Prism Academe African American Review ... View all titles in this topic Hot New Articles by Topic Automotive Sports Top Articles Ever by Topic Automotive Sports Quantum error correction: Classic group theory meets a quantum challenge American Mathematical Monthly, The Dec 2001 by Pollatsek, Harriet Save a personal copy of this article and quickly find it again with Furl.net. It's free! Save it. 1. INTRODUCTION. Peter Shor's discovery of an algorithm that enables a quantum computer to factor large integers in polynomial time attracted the attention of computer scientists, physicists, and mathematicians. Although experts still debate when and if this algorithm might threaten the security of encryption schemes based on the difficulty of factoring, Shor's breakthrough has stimulated research in many directions. As is often the case with new technology, it has generated interesting mathematical problems whose solution employs mathematical tools and concepts developed long before the idea of quantum computation was first proposed in the early 1980's.
R. A. Bailey: Home Page I obtained a DPhil in Mathematics from the University of Oxford under thesupervision of graham higman. My thesis was about finite permutation groups. http://www.maths.qmul.ac.uk/~rab/
Extractions: R. A. Bailey: home page I am Professor of Statistics in the School of Mathematical Sciences at Queen Mary and Westfield College in the University of London. The street address and phone and fax numbers are given below . From September 1999 to August 2003 I was Head of School. I obtained a DPhil in Mathematics from the University of Oxford under the supervision of Graham Higman. My thesis was about finite permutation groups. I spent six years working in the Faculty of Mathematics at the Open University. In the middle of that period I had a post-doctoral research fellowship at Edinburgh University, where I worked with Desmond Patterson of the Agricultural Research Council's Unit of Statistics and converted myself into a statistician. I put my new knowledge into practice in 10 years in the Statistics Department of Rothamsted Experimental Station . Following that I was Professor of Mathematical Sciences at Goldsmiths' College, University of London, before moving to my present position. I have served on the British Combinatorial Committee , Council of the London Mathematical Society , the Research Section of the Royal Statistical Society , the Committee of the UK TeX Users' Group , the Joint Mathematical Council, and the Council of the International Biometric Society . From November 2000 to November 2002 I was president of the British Region of the International Biometric Society.
Publication List For Dr E. A. Scott Existentially Closed Groups, graham higman and Elizabeth Scott, LMS MonographsNew Series, No.3, Oxford University Press, (1988) http://www.cs.rhul.ac.uk/CompSci/Research/languages/publications/eas_publication
Extractions: // for key pages, replace undefined (below) with one of : // // home, about_us, contact_us, // research, news_and_events, studying, // for_alumni, for_business, for_schools, // for_staff, for_students // // for other pages, leave as undefined // thisPage = undefined // Suppression of redundant operations in reverse compiled code using data flow analysis, Adrian Johnstone and Elizabeth Scott, in: Proceedings of the 8th International Workshop on Software and Compilers for Embedded Systems, SCOPES2004, ed. Henk Schepers, Lecture Notes in Computer Science 3199, Springer-Verlag, Berlin (2004) The grammar tool box: a case study comparing GLR parsing algorithms, Adrian Johnstone, Elizabeth Scott and Giorgios Economopoulos, Proc. 4th Workshop on Language Descriptions, Tools and Applications LDTA2004 and Electronic Notes in Theoretical Computer Science, ed. Gorel Hedin and Eric Van Wick, Elsevier, (2004)
Dr E. A. Scott Dr Scott studied at Manchester and then at Oxford, where she completed a D.Phil underthe supervision of Professor graham higman. http://www.cs.rhul.ac.uk/people/staff/scott.html
Extractions: DPhil Oxon e-mail E.Scott@rhul.ac.uk Position Academic Staff Research Area Compilers Telephone Dr Scott studied at Manchester and then at Oxford, where she completed a D.Phil under the supervision of Professor Graham Higman. She then worked as a researcher first at Oxford and then at the Australian National Univeristy in Canberra, studying infinite group theory. On returning to the UK, Dr Scott joined Professor Ursula Martin's group at Royal Holloway. After a brief period at St Andrews University, Dr Scott returned to Royal Holloway and is now a senior lecturer in Computer Science. Dr Scott's current research interests lie in Theoretical Computer Science, particularly in language design and compiler theory. Her recent work centres on the formal properties of, and applicability of, generalised parsing. There has been a resurgence of interest in general parsing techniques because modern computer hardware is sufficiently powerful to enable such techniques to be used. Together with Adrian Johnstone , Dr Scott has developed correct, efficient algorithms for parsing general context free languages, extending Tomita's epsilon-free algorithm to include epsilon rules and Aycock and Horspool's algorithm to grammars with hidden left recursion. She is currently investigating their application to computer language parsing; compiler code generation; reverse compilation and bioinformatics, as well as the traditional domain of natural language parsing.
NEWSLETTER ARCHIVE Interview with graham higman, 12. The Methodology of Mathematics, part 2, 14.Mathematical Societies Norwegian, 17. Mathematical Societies Estonian, 18 http://emis.math.ecnu.edu.cn/newsletter/archive_contents.html
%_ \MR{295889} \bibitem{higman60} graham higman, ``Enumerating $p$groups.{I} {I}nequalities , \textit{ Proc.\ London Math.\ Soc. http://www.mpim-bonn.mpg.de/external-documentation/era-mirror/2001-01-001/2001-0
Untitled Document in particular the proof of the solubility of finite groups of odd order; hispaper with graham higman too, on the nonexistence of certain generalised http://www.lms.ac.uk/newsletter/332/332_06.html
Extractions: LONDON MATHEMATICAL SOCIETY GERT KJAERGAARD PEDERSEN Professor Gert Kjaergaard Pedersen, who was elected a member of the London Mathematical Society on 17 October 1986, died on 15 March 2004 aged 63. He was born in 1940 in Denmark, and graduated from the high school Skt. Annae Gymnasium (which specialises in music) in 1958. In 1964 he obtained the degree of Mag. Scient from University of Copenhagen, and he became Dr. Phil. in 1972. He was appointed associate Professor at the University of Copenhagen in 1968, and from 1975, at the age of 35 years, until his much too early death he served there as full Professor. Professor Pedersen worked on operator algebras, and started his productive career by solving two problems from a famous list of 20 problems posed by Kadison in 1967. He had a large network of co-workers, and was a popular and frequently sought-after speaker at international conferences. His bibliography counts more than 100 items including two much cited and often-used monographs. Back to Top HAROLD STANLEY ARTHUR POTTER Back to Top WALTER FEIT Walter Feit, who was the Societys Hardy Lecturer in 1993, died in New Haven on 29 July 2004, aged 73. He is best known for his joint work with John Thompson, in particular the proof of the solubility of finite groups of odd order; his paper with Graham Higman too, on the nonexistence of certain generalised polygons, formed an important step in the early stages of the classification of finite simple groups. However, it is the character theory in the odd order paper, extending ideas first used in his earlier work on Zassenhaus groups, that was his greatest tour de force.
Graham Higman Université Montpellier II Translate this page graham higman (1917-0BC). Cette image et la biographie complète en anglais résidentsur le site de luniversité de St Andrews Écosse http://ens.math.univ-montp2.fr/SPIP/article.php3?id_article=2177
References graham higman, Amalgams of pgroups. J. Algebra 1 (1964), 301-305. JM Howie andJR Isbell, Epimorphisms and dominions II, J. Algebra 6 (1967), 7-21. http://www.math.umt.edu/magidin/research/references.html
Extractions: General group theory J.J. Rotman, Introduction to the Theory of Groups, 4th Edition. GTM 119, Springer-Verlag, 1994. W.R. Scott, Group Theory. Prentice Hall, 1964. Varieties of groups and Universal Algebra George M. Bergman, An Invitation to General Algebra and Universal Constructions. Henry Helson, Publisher, 1998. Garrett Birkhoff, On the structure of abstract algebras. Proc. Cambridge Philos. Soc. Hanna Neumann, Varieties of Groups. Ergebnisse der Mathematic und ihrer Grenzgebiete, New Series, Vol. 37, Springer-Verlag 1967. Ruth Rebekka Struik, On nilpotent products of cyclic groups, Canad. J. Math. Dominions, amalgams and epimorphisms Graham Higman, Amalgams of p-groups. J. Algebra J.M. Howie and J.R. Isbell, Epimorphisms and dominions II , J. Algebra J.R. Isbell, Epimorphisms and dominions in Proc. of the Conference on Categorical Algebra, La Jolla, 1965, S. Eilenberg et al. ed. Lange and Springer, New York, 1966. Felix Leinen