AMS Sectional Meeting Program by Special Session
Current as of Tuesday, April 12, 2005 15:21:41
2004 Spring Western Section Meeting
Los Angeles, CA, April 3-4, 2004
Meeting #996
Associate secretaries: Michel L Lapidus, AMS lapidus@math.ucr.edu, lapidus@mathserv.ucr.edu
Special Session on Modern Problems of Integration: Theory and Applications
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Saturday April 3, 2004, 3:00 p.m.-5:50 p.m.
Special Session on Modern Problems of Integration: Theory and Applications, I
Room 108, Mark Taper Hall of Humanities
Organizers:
Mark Burgin, University of California Los Angeles mburgin@math.ucla.edu
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3:00 p.m.
Functional Integration without Integration.
Louis Hirsch Kauffman*, University of Illinois at Chicago
(996-28-11) -
3:30 p.m.
Aspects of nonabsolute integration.
M. M. Rao*, University of California, Riverside
(996-28-13) -
4:00 p.m.
The distributional Denjoy integral.
Erik Talvila*, University College of the Fraser Valley
(996-26-24) -
4:30 p.m.
A Hilbert Space Structure for the Class of KH-Integrable Functions.
Tepper L. Gill*, Howard University
V Steadman, University of the District of Columbia
W. W. Zachary, Howard University
(996-28-52) -
5:00 p.m.
A General Definition of the Feynman Integral.
Tepper L. Gill*, Howard University
W. W. Zachary, Howard University
(996-28-53) -
5:30 p.m.
Computations for nonsquare constants of Orlicz function spaces with Orlicz norm.
Z. D. Ren*, UC Riverside
(996-46-23)
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3:00 p.m.
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Sunday April 4, 2004, 8:30 a.m.-10:50 a.m.
Special Session on Modern Problems of Integration: Theory and Applications, II
Room 108, Mark Taper Hall of Humanities
Organizers:
Mark Burgin, University of California Los Angeles mburgin@math.ucla.edu
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8:30 a.m.
Stochastic integrals in topological vector spaces.
R. Mikulevicius*, University of Southern California
(996-60-103) -
9:00 a.m.
The $L^r$ Henstock-Kurzweil Integral.
Paul M Musial*, Chicago State University
Yoram Sagher, Florida Atlantic University
(996-28-122) -
9:30 a.m.
A Riemann approach to Feynman integrals.
P Muldowney*, University of Ulster
(996-28-94) -
10:00 a.m.
The Fundamental Theorem of Calculus for infinite intervals.
Mark Burgin*, UCLA
(996-28-51) -
10:30 a.m.
A Local Maximal Function Simplifying Measure Differentiation.
Peter A. Loeb*, University of Illinois, Champaign-Urbana
(996-28-33)
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8:30 a.m.