A fixed point theorem in Banach algebras involving three operators with applications. (English) Zbl 1057.47062
Let \(S\) be a closed, convex and bounded subset of a Banach algebra \(X\) and let \(A,C:X \to X\), \(B:S\to X\) be three operators. The author gives an existence theorem for the fixed point equation, \(AxBx+Cx=x\). Applications to some nonlinear functional integral equations are given.
Reviewer: Ioan A. Rus (Cluj-Napoca)
MSC:
| 47H10 | Fixed-point theorems |
| 47N20 | Applications of operator theory to differential and integral equations |
