Leray-Schauder-type fixed point theorems in Banach algebras and application to quadratic integral equations

Abstract: In this paper, we present new fixed point theorems in Banach algebras relative to the weak topology. Our fixed point results are obtained under Leray-Schauder-type boundary conditions. These results improve and complement a number of earlier works. As an application, we establish some existence results for a broad class of quadratic integral equations. MSC: 47H10; 45G10

“…A lot of these equations were considered in Banach algebra (cf. [1,5,6,9,10,14,15]) but only few were investigated in Fréchet algebra [8]. However, it seems that convenient environment for integral equations on unbounded interval R + are various Fréchet function spaces, which in the case of some types of the product integral equations, naturally lead to Fréchet algebras.…”

Fixed point theorems in Fréchet algebras and Fréchet spaces and applications to nonlinear integral equations

“…A lot of these equations were considered in Banach algebra (cf. [1,5,6,9,10,14,15]) but only few were investigated in Fréchet algebra [8]. However, it seems that convenient environment for integral equations on unbounded interval R + are various Fréchet function spaces, which in the case of some types of the product integral equations, naturally lead to Fréchet algebras.…”

Fixed point theorems in Fréchet algebras and Fréchet spaces and applications to nonlinear integral equations

“…Remark 3.7. Theorem 3.6 extend Corollary 2.4 in [27] to RWC-Banach algebras and relaxing the sequential weak continuity on A and C by assuming that A and C satisfy only Condition (H 2 ).…”

Leray Schauder Type Fixed Point Theorems in RWC-Banach Algebras and Application to Chandrasekhar Integral Equations

“…x ∞ = sup t∈[0,1] x(t) . In this section, we discuss the following abstract nonlinear quadratic integral equation ((FIE)) (see [30]):…”

Measure of Weak Noncompactness and Fixed Point Theorems in Banach Algebras with Applications