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Results: 1-25/26
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, The set of divergent descent methods in a Banach space is sigma-porous, SIAM J OPTI, 11(4), 2001, pp. 1003-1018
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Well-posedness and porosity in optimal control without convexity assumptions, CALC VAR P, 13(3), 2001, pp. 265-293
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, The set of noncontractive mappings is sigma-porous in the space of all nonexpansive mappings, CR AC S I, 333(6), 2001, pp. 539-544
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Generic existence and uniqueness of positive eigenvalues and eigenvectors, INTEG EQ OP, 41(4), 2001, pp. 455-471
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Porosity of the set of divergent descent methods, NONLIN ANAL, 47(5), 2001, pp. 3247-3258
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Existence of solutions of optimization problems and porosity, NONLIN ANAL, 47(2), 2001, pp. 1137-1147
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Existence of solutions of optimal control problems for a generic integrandwithout convexity assumptions, NONLIN ANAL, 43(3), 2001, pp. 339-361
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Attracting mappings in Banach and hyperbolic spaces, J MATH ANAL, 253(1), 2001, pp. 250-268
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Generic aspects of metric fixed point theory, HANDBOOK OF METRIC FIXED POINT THEORY, 2001, pp. 557-575
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Generic convergence of infinite products of nonexpansive mappings in Banach and hyperbolic spaces, APPL OPTIM, 47, 2001, pp. 371-402
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Existence and structure of solutions of optimal control problems, APPL OPTIM, 47, 2001, pp. 429-457
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, On a generic existence result in optimization, SIAM J OPTI, 11(1), 2000, pp. 189-198
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Convergence of Krasnoselskii-Mann iterations of nonexpansive operators, MATH COMP M, 32(11-13), 2000, pp. 1423-1431
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Generic convergence of descent methods in Banach spaces, MATH OPER R, 25(2), 2000, pp. 231-242
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Generic well-posedness of optimal control problems without convexity assumptions, SIAM J CON, 39(1), 2000, pp. 250-280
Authors:
Ioffe, AD
Zaslavski, AJ
Citation: Ad. Ioffe et Aj. Zaslavski, Variational principles and well-posedness in optimization and calculus of variations, SIAM J CON, 38(2), 2000, pp. 566-581
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, The turnpike property for extremals of nonautonomous variational problems with vector-valued functions, NONLIN ANAL, 42(8), 2000, pp. 1465-1498
Authors:
Reich, S
Rubinov, A
Zaslavski, AJ
Citation: S. Reich et al., Generic power convergence of order-preserving mappings, NONLIN ANAL, 40(1-8), 2000, pp. 537-547
Authors:
Zaslavski, AJ
Citation: Aj. Zaslavski, Existence and structure of optimal solutions of infinite-dimensional control problems, APPL MATH O, 42(3), 2000, pp. 291-313
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Convergence of generic infinite products of order-preserving mappings, POSITIVITY, 3(1), 1999, pp. 1-21
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Generic convergence of infinite products of positive linear operators, INTEG EQ OP, 35(2), 1999, pp. 232-252
Authors:
Reich, S
Zaslavski, AJ
Citation: S. Reich et Aj. Zaslavski, Convergence of generic infinite products of nonexpansive and uniformly continuous operators, NONLIN ANAL, 36(8), 1999, pp. 1049-1065
Authors:
Marcus, M
Zaslavski, AJ
Citation: M. Marcus et Aj. Zaslavski, The structure of extremals of a class of second order variational problems, ANN IHP-AN, 16(5), 1999, pp. 593-629
Existence and uniqueness of a solution for a minimization problem with a generic increasing function
Authors:
Rubinov, AM
Zaslavski, AJ
Citation: Am. Rubinov et Aj. Zaslavski, Existence and uniqueness of a solution for a minimization problem with a generic increasing function, J AUS MAT A, 67, 1999, pp. 85-103
Authors:
Marcus, M
Zaslavski, AJ
Citation: M. Marcus et Aj. Zaslavski, On a class of second order variational problems with constraints, ISR J MATH, 111, 1999, pp. 1-28