Joint Mathematics Meetings Program by Special Session
Current as of Wednesday, January 16, 2008 00:26:58
Program 
Deadlines 
Timetable 
Inquiries: meet@ams.org
Joint Mathematics Meetings
San Diego, CA, January 69, 2008 (Sunday  Wednesday)
Meeting #1035
Associate secretaries:
Michel L Lapidus, AMS lapidus@math.ucr.edu, lapidus@mathserv.ucr.edu
James J Tattersall, MAA tat@providence.edu
AMS Special Session on The Feynman Integral in Mathematics and Physics

Wednesday January 9, 2008, 9:00 a.m.11:00 a.m.
AMS Special Session on The Feynman Integral in Mathematics and Physics, I
Organizers:
Lance W. Nielsen, Creighton University lnielsen@creighton.edu

Wednesday January 9, 2008, 1:00 p.m.5:20 p.m.
AMS Special Session on the Feynman Integral in Mathematics and Physics, II
Organizers:
Lance W. Nielsen, Creighton University lnielsen@creighton.edu

1:00 p.m.
Disentanglement in the Construction Formulation of the Feynman Operator calculus.
Tepper L. Gill*, Department of E&CE, Howard University
Woodford W. Zachary, Department of E&CE, Howard University
(103547752)

1:30 p.m.
Inverse integral transforms and the generalized convolution product.
Seung Jun Chang*, Dankook University
(103544700)

2:00 p.m.
The WeylMcCoy operational calculi as a subfamily of Feynman's operational calculi for noncommuting operators.
Gerald W. Johnson*, University of NebraskaLincoln
Lisa M. Rezac, University of St. Thomas
(103528587)

2:30 p.m.
Feynman Integrals with Higly Singular Potentials.
Michel L. Lapidus*, University of California, Riverside
(103558471)

3:00 p.m.
FeynmanKac formulas, backward stochastic differential equations and Markov processes.
Jan A. Van Casteren*, University of Antwerp
(103560489)

3:30 p.m.
The Generalized FeynmanKac formula a LebesgueStieltjes measure.
Jun Tanaka*, University of California Riverside
(103581481)

4:00 p.m.
Multiple stochastic integrals with respect to Volterra random fields: Properties and Applications.
Anna Amirdjanova*, University of Michigan
(103560311)

4:30 p.m.
Integral Transforms of Functions in $L_{2}(C{a,b}[0,T])$.
Seung Jun Chang, Dankook University
Hyun Soo Chung, Dankook University
David L. Skoug*, University of NebraskaLincoln
(103528470)

5:00 p.m.
Quantum Hidden Subspace Algorithm.
Jeremy James Becnel*, Stephen F. Austin State University
(103546249)
MAA Online
Inquiries: meet@ams.org