1992 Joint Mathematics Meetings, Program by Special Session
Joint Mathematics Meetings Program by Special Session
Current as of Tuesday, April 12, 2005 15:08:55
1992 Joint Mathematics Meetings
Baltimore, MD, January 8-11, 1992
Lance W Small, AMS email@example.com
Kenneth A Ross, MAA firstname.lastname@example.org
AMS Special Session on Stability and Control
Friday January 10, 1992, 8:00 a.m.-10:50 a.m.
AMS Special Session on Stability and Control, I
V. Lakshmikantham*, Florida Institute of Technology
Higher derivatives of Lyapunov functions and stability analysis.
S. Sivasundaram*, Embry-Riddle Aeronautical University
Instability for autonomous functional differential equations.
John R. Haddock*, Memphis State University
Younhee Ko, Memphis State University
Invariance, stability and viability in control systems.
Emilio Roxin*, University of Rhode Island
Stability of impulsive differential systems.
S. K. Kaul, University of Regina
S. Leela*, State University of New York, College at Geneseo
Parabolic quenching phenomena.
C. Y. Chan*, University of Southwestern Louisiana
Friday January 10, 1992, 1:00 p.m.-3:20 p.m.
AMS Special Session on Stability and Control, II
A generalization of the Kalman-Yakubovic lemma.
A. V. Balakrishnan*, University of California, Los Angeles
A block-parallel Newton's method: Convergence and control applications.
D. D. Siljak*, Santa Clara University
A. Zecevic, Santa Clara University
Robust stability of distributed parameter countrol systems.
G. S. Ladde*, University of Texas, Arlington
I-Tsung Li, General Dynamics, Michigan
Bilinear control systems with special structure.
Otomar H\'ajek*, Case Western Reserve University
Uniform boundary stabilizability of von Karman plate with a light viscous damping.
M. Bradley, University of Virginia
I. Lasiecka*, University of Virginia
Saturday January 11, 1992, 8:00 a.m.-9:50 a.m.
AMS Special Session on Stability and Control, III
On mathematical models of hysteresis.
I. D. Mayergoyz*, University of Maryland, College Park
On a certain type of Higher Order Maximum Principle (HMP).
Urszula Ledzewicz-Kowalewska*, Southern Illinois University, Edwardsville
Global stability via perturbing Lyapunov functions.
A. S. Vatsala*, University of Southwestern Louisiana
S. G. Rajalakshmi, Southwest Missouri State University
Nonlinear variation of parameters formula for matrix differential equations.
Donald W. Fausett*, Florida Institute of Technology