Language:   Search:   Contact
Zentralblatt MATH has released its new interface!
For an improved author identification, see the new author database of ZBMATH.

Query:
Fill in the form and click »Search«...
Format:
Display: entries per page entries
Zbl 1252.47047
Garcia-Falset, J.; Latrach, K.; Moreno-Gálvez, E.; Taoudi, M.-A.
Schaefer-Krasnoselskii fixed point theorems using a usual measure of weak noncompactness.
(English)
[J] J. Differ. Equations 252, No. 5, 3436-3452 (2012). ISSN 0022-0396

In [A fixed point theorem of Krasnoselskii-Schaefer type", Math. Nachr. 189, 23--31 (1998; Zbl 0896.47042)], {\it T. A. Burton} and {\it C. Kirk} proved the following theorem of Krasnoselskii-Schaefer type. Let $\left( X,\| \cdot \| \right)$ be a Banach space and let $A,B: X\rightarrow X$ be two continuous mappings. If $A$ maps bounded subsets into compact sets and $B$ is a strict contraction, i.e., there exists $k\in [0,1)$ such that $\|Bx-By\| \leq k\| x-y\|$ for every $x,y\in X,$ then either $A+B$ has a fixed point or the set $\left\{ x\in X:x=\lambda B\left( \frac{x}{\lambda }\right) +\lambda Ax\right\}$ is unbounded for each $\lambda \in (0,1)$. In the paper under review, the authors establish some variants of the above result. They use their results to study the existence of solutions of a nonlinear integral equation in the context of $L^{1}$-spaces.
[Giulio Trombetta (Arcavaceta di Rende)]
MSC 2000:
*47H08
47H10 Fixed point theorems for nonlinear operators on topol.linear spaces
47H30 Particular nonlinear operators

Keywords: Krasnoselskij fixed point theorem; measure of weak noncompactness; nonlinear integral equations

Citations: Zbl 0896.47042

Highlights
Master Server