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Zhou, Jianxin - Department of Mathematics, Texas A&M University
A Local Min-Orthogonal Method for Finding Multiple Saddle Points
Control of Nonlinear Distributed Parameter Systems Goong Chen, Texas A&M University, College Station, Texas
Convergence Analysis of an Optimal Scaling Algorithm for Semilinear Elliptic Boundary Value Problems
INSTABILITY ANALYSIS OF SADDLE POINTS BY A LOCAL MINIMAX METHOD
Robust Boundary Control of the Stokes Fluids with Boundary Point Observations
NUMERICAL METHODS FOR COMPUTING NONLINEAR EIGENPAIRS: PART II. NON ISO-HOMOGENEOUS CASES
On Homotopy Continuation Method for Computing Multiple Solutions to the Henon Equation
Optimization with Some Uncontrollable Variables: A Min-Equilibrium Approach
Numerical Methods for Computing Nonlinear Eigenpairs: Part I. Iso-Homogeneous Cases
Unified Convergence Results on a Minimax Algorithm for Finding Multiple Critical Points in Banach Spaces
PROD. TYPE: FTP PP:1-10 (col.fig.: nil)
Computational Theory and Methods for Finding Multiple Critical Points
Local Characterizations of Saddle Points and Their Morse Indices and Jianxin Zhou
A Minimax Method for Finding Multiple Critical Points and Its Applications to Semilinear PDE
OPTIMAL BOUNDARY CONTROL OF THE STOKES FLUIDS WITH POINT VELOCITY OBSERVATIONS
International Journal of Bifurcation and Chaos, Vol. 10, No. 7 (2000) 15651612 c World Scientific Publishing Company
A Local Minimax-Newton Method for Finding Multiple Saddle Points with Symmetries
Convergence Results of A Local Minimax Method for Finding Multiple Critical Points
Contemporary Mathematics A Note on the Elliptic Sine-Gordon Equation
MATHEMATICS OF COMPUTATION S 0025-5718(10)02336-7
Finding Multiple Solutions to Elliptic PDE with Nonlinear Boundary Conditions
ON FINDING MULTIPLE SOLUTIONS TO A SINGULARLY PERTURBED NEUMANN PROBLEM
