61. STDC 2008, Spring Topology And Dynamics Conference The University of Wisconsin–Milwaukee and Marquette University are hosting the 42nd annual Spring topology and Dynamics Conference at the Hyatt Regency in http://www.uwm.edu/Dept/Math/Events/stdc2008/

The 42 ND Annual Spring Topology and Dynamics Conference Hyatt Regency Milwaukee, Wisconsin, USA Welcome Keynote Speakers Special Sessions Schedule ... Submit Abstracts (deadline Feb. 28) Travel and Accommodation Travel Grants List of Participants Acknowledgements ... Proceedings ATTENTION: HOTEL ISSUES! The block of rooms we had set aside at the Hyatt for the conference is now full. If you would like to attend the conference but do not yet have a room reservation, you could check the List of Participants , to see if you can find a friend who is willing to share their room with you. Alternately, the Ramada is a half mile from the Hyatt and has agreed to offer a discounted rate for conference participants. For information, see Travel and Accommodation And now... Welcome to STDC 2008! The and Marquette University are hosting the 42nd annual Spring Topology and Dynamics Conference at the Hyatt Regency in downtown Milwaukee, Wisconsin. 2008 Local Organizers: Paul Bankston (Marquette Univ.) Lois Kailhofer (Alverno College) You may be interested to read a history of the Spring Topology and Dynamics Conference, including information about the 41 previous meetings.

62. Conference In Goemetric Topology (A Satellite Conference of ICM 2002.) Shanxi Normal University, Xi an, China; 1216 August 2002. http://www.math.uiowa.edu/~wu/gtc/

Homepage Organizing Cmte. Advisory Committee Plenary speakers Special Sessions knot theory and quantum topology 3-manifolds 4-manifolds Geometric group theory and related topics ... Passport and Visa Useful Links Map of China ICM 2002 About Xi'an Qujiang Hotel GEOMETRIC TOPOLOGY A Satellite Conference of ICM 2002, Beijing (Second Announcement) Time: August 12 16, 2002 Location: Shaanxi Normal University, Xi'an, CHINA In conjunction with the next International Congress of Mathematicians (Beijing, 8/2028, 2002), we are organizing a week-long Conference in Geometric Topology as one of its satellite conferences. It will be held during the week before ICM 2002, at Shaanxi Normal University in the historic city XI'AN in northwest China, with support coming from various sources including the National Science Foundation of China. This Conference in Geometric Topology is aimed at reflecting the current state of the art in the study of low dimensional topology and related subjects. The specific range of topics we intend to cover is well represented by the interests of the members of the advisory committee. Please use the links on the left to find information about the conference, including the list of plenary speakers. Xi'an is a very attractive tourist city because of the famous Terra-Cotta Warriors and Horses, as well as many other historical museums, pagodas, and temples. See the web page

63. SourceForge.net: JTS Topology Suite The JTS topology Suite (JTS) is an API providing spatial object model and fundamental geometric functions. It implements the geometry model defined in the http://www.jump-project.org/project.php?PID=JTS&SID=OVER

64. What Is Algebraic Topology? Introductory essay by Joe Neisendorfer, University of Rochester. http://www.math.rochester.edu/people/faculty/jnei/algtop.html

WHAT IS ALGEBRAIC TOPOLOGY? THE BEGINNINGS OF ALGEBRAIC TOPOLOGY Algebraic topology is a twentieth century field of mathematics that can trace its origins and connections back to the ancient beginnings of mathematics. For example, if you want to determine the number of possible regular solids, you use something called the Euler characteristic which was originally invented to study a problem in graph theory called the Seven Bridges of Konigsberg. Can you cross the seven bridges without retracing your steps? No and the Euler characteristic tells you so. Later, Gauss defined the so-called linking number, a precise invariant which tells you whether two circles are linked. It is called an invariant because it remains the same even if we continuously deform the geometric object. Gauss also found a relationship between the total curvature of a surface and the Euler characteristic. All of these ideas are bound together by the central idea that continuous geometric phenomena can be understood by the use of discrete invariants. The winding number of a curve illustrates two important principles of algebraic topology. First, it assigns to a geometric odject, the closed curve, a discrete invariant, the winding number which is an integer. Second, when we deform the geometric object, the winding number does not change, hence, it is called an invariant of deformation or, synomynously, an invariant of homotopy.

65. Page Not Found I want to access my records, apply to PSU, buy books, check email, find a class, find a job, find a person/office, get maps/directions, get transcripts http://www.mth.pdx.edu/cts/

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