Numerical Solution of a Quadratic Integral Equation through Classical Schauder Fixed Point Theorem
Abstract
In this paper, we investigate the existence of at least one solution on the closed interval for quadratic integral equations with non-linear modification of the argument in Hölder spaces using the technique in the classical Schauder fixed point theorem.
Keywords
Hölder condition , integral equation , schauder fixed point theorem
References
- [1] M. Benchohra, M. A. Darwish, On unique Solvability of Quadratic Integral Equations with Linear Modification of the Argument, Miskolc Math. Notes, 10 (2009), 3-10.
- [2] J. Banas, R. Nalepa, On the space of functions with growths tempered by a modulus of continuity and its applications, J. Funct. Space Appl. (2013), 13 pages, doi:http://dx.doi.org/10.1155/2013/820437.
- [3] J. Caballero, M. Abdalla, K. Sadarangani, Solvability of a quadratic integral equation of fredholm type in H¨older spaces, Electron. J. Differ. Eq., 31 (2014), 1-10.
- [4] J. Schauder, Der Fixpunktsatz in Funktionalriiumen, Studia Math., 2 (1930), 171-180.
- [5] J. Banas, A. Chlebowicz, On an elementrary inequality and its application in theory of integral equations, J. Math. Ineq., 11 (2) (2017), 595-605.
- [6] J. Caballero, B. Lopez, K. Sadarangani, Existence of nondecreasing and continuous solutions of an integral equation with linear modification of the argument, Acta Math. Sin. (Engl. Ser.), 23 (9) (2007), 1719-1728.
- [7] M. A. Darwish, On quadratic integral equation of fractional orders, J. Math. Anal. Appl., 311(1) (2005),112-119.
- [8] S. Hu, M. Khavanin, W. Zhuang, Integral equations arising in the kinetic theory of gases, Appl. Anal., 34 (1989),261-266.
- [9] C. A. Stuart, Existence theorems for a class of non-linear integral equations, Math. Z., 137 (1974) 49-66.
- [10] J. Banas, A. Chlebowicz, On existence of integrable solutions of a functional integral equation under Carath´eodory conditions, Nonlinear Anal., 70 (2009), 3172-3179.
