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Fixed point theorems for nonexpansive operators with dissipative perturbations in cones

Shih-sen Chang; Yu-Qing Chen; Yeol Je Cho; Byung-Soo Lee — 1998

Commentationes Mathematicae Universitatis Carolinae

Let $P$ be a cone in a Hilbert space $H$ , $A : P \to 2^{P}$ be an accretive mapping (equivalently, $- A$ be a dissipative mapping) and $T : P \to P$ be a nonexpansive mapping. In this paper, some fixed point theorems for mappings of the type $- A + T$ are established. As an application, we utilize the results presented in this paper to study the existence problem of solutions for some kind of nonlinear integral equations in $L^{2} (Ω)$ .

Coincidence point theorems in certain topological spaces

Jong Soo Jung; Yeol Je Cho; Shin Min Kang; Yong Kab Choi; Byung Soo Lee — 1999

Discussiones Mathematicae, Differential Inclusions, Control and Optimization

In this paper, we establish some new versions of coincidence point theorems for single-valued and multi-valued mappings in F-type topological space. As applications, we utilize our main theorems to prove coincidence point theorems and fixed point theorems for single-valued and multi-valued mappings in fuzzy metric spaces and probabilistic metric spaces.

Random fixed point theorems for a certain class of mappings in Banach spaces

Jong Soo Jung; Yeol Je Cho; Shin Min Kang; Byung-Soo Lee; Balwant Singh Thakur — 2000

Czechoslovak Mathematical Journal

Let $(Ω, Σ)$ be a measurable space and $C$ a nonempty bounded closed convex separable subset of $p$ -uniformly convex Banach space $E$ for some $p > 1$ . We prove random fixed point theorems for a class of mappings $T Ω \times C \to C$ satisfying: for each $x, y \in C$ , $ω \in Ω$ and integer $n \geq 1$ , $∥ T^{n} (ω, x) - T^{n} (ω, y) ∥ \leq a (ω) \cdot ∥ x - y ∥ + b (ω) {∥ x - T^{n} (ω, x) ∥ + ∥ y - T^{n} (ω, y) ∥} + c (ω) {∥ x - T^{n} (ω, y) ∥ + ∥ y - T^{n} (ω, x) ∥},$ where $a, b, c Ω \to [0, \infty)$ are functions satisfying certain conditions and $T^{n} (ω, x)$ is the value at $x$ of the $n$ -th iterate of the mapping $T (ω, \cdot)$ . Further we establish for these mappings some random fixed point theorems in a Hilbert space, in $L^{p}$ spaces, in Hardy spaces $H^{p}$ and in Sobolev spaces $H^{k, p}$ ...

Some results on fixed point theorems for multivalued mappings in complete metric spaces.

Ume, Jeong Sheok; Lee, Byung Soo; Cho, Sung Jin — 2002

International Journal of Mathematics and Mathematical Sciences

A general vector-valued variational inequality and its fuzzy extension.

Park, Sehie; Lee, Byung-Soo; Lee, Gue Myung — 1998

International Journal of Mathematics and Mathematical Sciences

Fixed point theorems for compatible mappings with applications to the solutions of functional equations arising in dynamic programmings.

Huang, Nanjing; Lee, Byung Soo; Kang, Mee Kwang — 1997

International Journal of Mathematics and Mathematical Sciences

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Currently displaying 1 – 9 of 9

Fixed point theorems for nonexpansive operators with dissipative perturbations in cones

Coincidence point theorems in certain topological spaces

Random fixed point theorems for a certain class of mappings in Banach spaces

Some results on fixed point theorems for multivalued mappings in complete metric spaces.

A general vector-valued variational inequality and its fuzzy extension.

Fixed point theorems for compatible mappings with applications to the solutions of functional equations arising in dynamic programmings.

On the semi-inner product in locally convex spaces.

Random vector variational inequalities and random noncooperative vector equilibrium.

Common fixed points for nonexpansive and nonexpansive type fuzzy mappings.