# Search results

Fixed Point Theory and Applications > 2015 > 2015 > 1 > 1-11

Journal of Inequalities and Applications > 2015 > 2015 > 1 > 1-27

*H*be a real Hilbert space and let

*C*be a nonempty, closed, and convex subset of

*H*. We assume that ( A + B ) − 1 0 ∩ U ≠ ∅ $(A+B)^{-1}0\cap U\neq\emptyset$ , where A : C → H $A:C\rightarrow H$ is an

*α*-inverse-strongly monotone mapping, B : H → H $B:H\rightarrow H$ is a maximal monotone operator, the domain of

*B*is included in

*C*. Let

*U*denote the solution...

Journal of Inequalities and Applications > 2015 > 2015 > 1 > 1-23

Fixed Point Theory and Applications > 2013 > 2013 > 1 > 1-13

*k*-strict pseudo-contractions...

Journal of Optimization Theory and Applications > 2013 > 157 > 3 > 781-802

Positivity > 2012 > 16 > 3 > 429-453

*H*be a real Hilbert space and let

*C*be a nonempty closed convex subset of

*H*. Let

*α*> 0 and let

*A*be an

*α*-inverse-strongly monotone mapping of

*C*into

*H*and let

*B*be a maximal monotone operator on

*H*. Let

*F*be a maximal monotone operator on

*H*such that the domain of

*F*is included in

*C*. Let 0 <

*k*< 1 and let

*g*be a

*k*-contraction of

*H*into itself. Let

*V*be a $${\overline{\gamma}}$$ -strongly...

Fixed Point Theory and Applications > 2011 > 2011 > 1 > 1-16

*κ*

_{ i }

*-*strict pseudo-contractions and a sequence of positive real numbers. By using this mapping, we consider an iterative method for finding a common element of the set of a generalized equilibrium problem of the set of solution to a system of variational inequalities, and of the set of fixed points of an infinite family...

Nonlinear Analysis: Real World Applications > 2010 > 11 > 4 > 2963-2972

Journal of Computational and Applied Mathematics > 2010 > 233 > 8 > 2013-2026

Journal of Applied Mathematics and Computing > 2010 > 32 > 1 > 69-82

Nonlinear Analysis > 2009 > 71 > 10 > 4852-4861

Nonlinear Analysis > 2009 > 71 > 9 > 4203-4214

Nonlinear Analysis > 2009 > 70 > 5 > 1902-1911

Computers and Mathematics with Applications > 2009 > 57 > 3 > 455-465

Journal of Applied Mathematics and Computing > 2009 > 30 > 1-2 > 65-74

Journal of Mathematics and Applications > 2008 > Vol. 30 > 137-149

Nonlinear Analysis > 2007 > 67 > 7 > 2258-2271

Journal of Mathematical Analysis and Applications > 2007 > 329 > 1 > 336-346