Fixed Point Theory and Applications, 3. sējumsNova Publishers, 2002 - 224 lappuses The aim of this volume is to introduce recent new topics in the areas of fixed point theory, variational inequality and complementarity problem theory, non-linear ergodic theory difference, differential and integral equations, control and optimisation theory, dynamic system theory, inequality theory, stochastic analysis and probability theory, and their applications. |
Saturs
1 | |
15 | |
33 | |
THE LOCAL PROPERTY R IN BANACH SPACES | 43 |
EXISTENCE THEOREMS OF SOLUTIONS FOR GENERALIZED QUASIVARIATIONAL INEQUALITIES IN NONCOMPACT GCONVEX SPAC... | 53 |
RELATED FIXED POINTS FOR TWO PAIRS OF SETVALUED MAPPINGS ON TWO METRIC SPACES | 63 |
FIXED POINT ITERATION FOR QUASICONTRACTIVE MAPPINGS | 71 |
ON COMMON FIXED POINT THEOREMS IN METRIC AND BANACH SPACES | 83 |
FIXED POINT THEOREMS IN FUZZY METRIC SPACES | 137 |
SOME EXISTENCE RESULTS FOR VECTOR OPTIMIZATION PROBLEMS | 147 |
GENERALIZED SYMMETRIC DUALITY FOR MULTIOBJECTIVE INVEX PROGRAMMING | 159 |
FIXED POINT PROPERTY FOR REVERSIBLE SEMIGROUP OF NONEXPANSIVE MAPPINGS ON WEAKCOMPACT CONVEX SETS | 167 |
EXISTENCE THEOREMS OF SOLUTIONS TO SOME GENERALIZED VECTOR VARIATIONALTYPE INEQUALITIES ON HSPACES | 173 |
EQUILIBRIUM THEOREMS OF MULTIMAPS AND FUZZY MAPPINGS | 181 |
GENERALIZED KIRSZBRAUNMINTY TYPE INEQUALITIES | 197 |
MANN ITERATION FOR WEAKLY QUASICONTRACTIVE MAPS IN REAL BANACH SPACES | 205 |
FIXED POINT AND COUPLED FIXED POINT THEOREMS FOR MULTIVALUED INCREASING OPERATORS IN ORDERED METRIC SPACES | 91 |
ISHIKAWA ITERATIVE PROCESS WITH MIXED ERRORS FOR LIPSCHITZIAN AND STRONGLY PSEUDOCONTRACTIVE MAPPINGS IN B... | 99 |
ITERATIVE PROCESSES WITH MIXED ERRORS FOR NONLINEAR EQUATIONS INVOLVING mACCRETIVE MAPPINGS | 113 |
FIXED POINT THEOREMS FOR NONLIPSCHITZIAN SELFMAPPINGS AND GEOMETRIC PROPERTIES OF BANACH SPACES | 125 |
GENERAL AUXILIARY DIFFERENTIAL VARIATIONAL INEQUALITY PROBLEM PRINCIPLE GADVIPP AND APPROXIMATION SOLVABI... | 209 |
INDEX | 221 |
Bieži izmantoti vārdi un frāzes
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Populāri fragmenti
91. lappuse - No. 98-0102-06-01-3 from the Basic Research Program of the Korea Science & Engineering Foundation. REFERENCES 1. RG Menendez and JE Bernard, "Flight Simulation in Synthetic Environments," IEEE Proceedings of the Digital Avionics Systems Conferences, vol.
27. lappuse - Let C be a nonempty closed convex subset of a Banach space E and let S — [T(t] : 0 < t < 00} be a one-parameter nonexpansive semigroup on C with F(S) ^ 0.
43. lappuse - Let C be a nonempty bounded closed convex subset of a Banach space X. A mapping T : C —> C is said to be nonexpansive whenever the inequality \\T(x)-T(y)\\< \\xy\\ holds for all x, y € C.
41. lappuse - A fixed point theorem for asymptotically nonexpansive mappings, Proc. Amer. Math. Soc. 35 (1972), 171-174.
31. lappuse - On the asymptotic behavior of almostorbits of nonlinear contraction semi-groups in Banach spaces', Nonlinear Analysis 6 (1982), 349-365.
63. lappuse - Department of Mathematics and Computer Science University of Leicester, Leicester, LEI 7RH, UK {S.
81. lappuse - WR Mann, Mean value methods in iteration, Proc. Amer. Math. Soc. 4 (1953), 506-510.
129. lappuse - Now let C be a bounded closed convex subset of a Banach space X and let T : C — > C be a uniformly Lipschitzian mapping; that is, T satisfies the condition for some constant k > 0.
52. lappuse - MM Rao and ZD Ren, Theory of Orlicz spaces, Marcel Dekker Inc., New York, Basel, Hong Kong, 1991.
35. lappuse - X is p-uniformly smooth if and only if there exists a constant c...