National Conference on Geometry and Topology
Author: National Conference on Geometry and Topology
Publisher:
Published: 1988
Total Pages: 228
ISBN-13:
DOWNLOAD EBOOKRead and Download eBook Full
Author: National Conference on Geometry and Topology
Publisher:
Published: 1988
Total Pages: 228
ISBN-13:
DOWNLOAD EBOOKAuthor:
Publisher:
Published: 1988
Total Pages: 228
ISBN-13:
DOWNLOAD EBOOKAuthor: P. Enghis
Publisher:
Published: 1988
Total Pages:
ISBN-13:
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Publisher:
Published: 1996
Total Pages:
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DOWNLOAD EBOOKAuthor: P. Enghiș
Publisher:
Published: 1988
Total Pages: 240
ISBN-13:
DOWNLOAD EBOOKAuthor:
Publisher:
Published: 1988
Total Pages: 228
ISBN-13:
DOWNLOAD EBOOKAuthor: P. Enghis
Publisher:
Published: 1988
Total Pages: 228
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DOWNLOAD EBOOKAuthor: Adrian C. Albu
Publisher:
Published: 1996
Total Pages:
ISBN-13: 9789735780913
DOWNLOAD EBOOKAuthor: P.L. Antonelli
Publisher: Springer Science & Business Media
Published: 2012-12-06
Total Pages: 305
ISBN-13: 9401142351
DOWNLOAD EBOOKThe International Conference on Finsler and Lagrange Geometry and its Applications: A Meeting of Minds, took place August 13-20, 1998 at the University of Alberta in Edmonton, Canada. The main objective of this meeting was to help acquaint North American geometers with the extensive modern literature on Finsler geometry and Lagrange geometry of the Japanese and European schools, each with its own venerable history, on the one hand, and to communicate recent advances in stochastic theory and Hodge theory for Finsler manifolds by the younger North American school, on the other. The intent was to bring together practitioners of these schools of thought in a Canadian venue where there would be ample opportunity to exchange information and have cordial personal interactions. The present set of refereed papers begins ·with the Pedagogical Sec tion I, where introductory and brief survey articles are presented, one from the Japanese School and two from the European School (Romania and Hungary). These have been prepared for non-experts with the intent of explaining basic points of view. The Section III is the main body of work. It is arranged in alphabetical order, by author. Section II gives a brief account of each of these contribu tions with a short reference list at the end. More extensive references are given in the individual articles.
Author: Gordana Matic
Publisher: American Mathematical Soc.
Published: 2003
Total Pages: 370
ISBN-13: 0821835076
DOWNLOAD EBOOKSince 1961, the Georgia Topology Conference has been held every eight years to discuss the newest developments in topology. The goals of the conference are to disseminate new and important results and to encourage interaction among topologists who are in different stages of their careers. Invited speakers are encouraged to aim their talks to a broad audience, and several talks are organized to introduce graduate students to topics of current interest. Each conference results in high-quality surveys, new research, and lists of unsolved problems, some of which are then formally published. Continuing in this 40-year tradition, the AMS presents this volume of articles and problem lists from the 2001 conference. Topics covered include symplectic and contact topology, foliations and laminations, and invariants of manifolds and knots. Articles of particular interest include John Etnyre's, ``Introductory Lectures on Contact Geometry'', which is a beautiful expository paper that explains the background and setting for many of the other papers. This is an excellent introduction to the subject for graduate students in neighboring fields. Etnyre and Lenhard Ng's, ``Problems in Low-Dimensional Contact Topology'' and Danny Calegari's extensive paper,``Problems in Foliations and Laminations of 3-Manifolds'' are carefully selected problems in keeping with the tradition of the conference. They were compiled by Etnyre and Ng and by Calegari with the input of many who were present. This book provides material of current interest to graduate students and research mathematicians interested in the geometry and topology of manifolds.