[[1] Abbas, Saïd et al. “Existence and attractivity results for coupled systems of nonlinear Volterra-Stieltjes multidelay fractional partial integral equations.” Abstr. Appl. Anal. (2018): Art. ID 8735614. Cited on 204.]Search in Google Scholar
[[2] Abbas, Saïd, and Mouffak Benchohra, and Juan J. Nieto Roig. “Global attractivity of solutions for nonlinear fractional order Riemann-Liouville Volterra-Stieltjes partial integral equations.” Electron. J. Qual. Theory Differ. Equ. (2012): Article no. 81. Cited on 204.]Search in Google Scholar
[[3] Abbas, Saïd et al. “Existence and stability results for nonlinear fractional order Riemann-Liouville Volterra-Stieltjes quadratic integral equations.” Appl. Math. Comput. 247 (2014): 319-328. Cited on 203.]Search in Google Scholar
[[4] Aghajani, Asadollah, and Ali Shole Haghighi. “Existence of solutions for a system of integral equations via measure of noncompactness.” Novi Sad J. Math. 44, no. 1 (2014): 59-73. Cited on 204, 206 and 209.]Search in Google Scholar
[[5] Aghajani, Asadollah, Reza Allahyari, and Mohammad Mursaleen. “A generalization of Darbo’s theorem with application to the solvability of systems of integral equations.” J. Comput. Appl. Math. 260 (2014): 68-77. Cited on 204 and 206.]Search in Google Scholar
[[6] Akhmerov, R.R. et al. Measures of Noncompactness and Condensing Operators Vol. 55 of Operator Theory: Advances and Applications. Basel: Birkhäuser Verlag, 1992. Cited on 204, 205 and 206.10.1007/978-3-0348-5727-7]Search in Google Scholar
[[7] Baghdad, Said, and Mouffak Benchohra. “Global existence and stability results for Hadamard-Volterra-Stieltjes integral equations.” Commun. Fac. Sci. Univ. Ank. Ser. A1. Math. Stat. 68, no. 2 (2019): 1387-1400. Cited on 204.]Search in Google Scholar
[[8] Banaś, Józef. “Existence results for Volterra-Stieltjes quadratic integral equations on an unbounded interval.” Math. Scand. 98, no. 1 (2006): 143-160. Cited on 204.]Search in Google Scholar
[[9] Banaś, Józefet et al. “Monotonic solutions of a class of quadratic integral equations of Volterra type.” Comput. Math. Appl. 49, no. 5-6 (2005): 943-952. Cited on 203, 204 and 206.]Search in Google Scholar
[[10] Banaś, Józef, and Szymon Dudek. “The technique of measures of noncompactness in Banach algebras and its applications to integral equations.” Abstr. Appl. Anal. (2013): Art. ID 537897. Cited on 204, 205 and 207.]Search in Google Scholar
[[11] Banaś, Józef, and Kazimierz Goebel. Measures of noncompactness in Banach spaces vol. 60 of Lecture Notes in Pure and Applied Mathematics. New York: Marcel Dekker, Inc., 1980. Cited on 204, 205 and 206.]Search in Google Scholar
[[12] Banaś, Józef, Millenia Lecko, and Wagdy Gomaa El-Sayed. “Existence theorems for some quadratic integral equations.” J. Math. Anal. Appl. 222, no. 1 (1998): 276-285. Cited on 203 and 204.]Search in Google Scholar
[[13] Banaś, Józef, and Leszek Olszowy. “On a class of measures of noncompactness in Banach algebras and their application to nonlinear integral equations.” Z. Anal. Anwend. 28, no. 4 (2009): 475-498. Cited on 204, 205 and 207.]Search in Google Scholar
[[14] Banaś, Józef, and Donal O’Regan. “On existence and local attractivity of solutions of a quadratic Volterra integral equation of fractional order.” J. Math. Anal. Appl. 345, no. 1 (2008): 573-582. Cited on 203, 204 and 210.]Search in Google Scholar
[[15] Banaś, Józef, Méndez, and Kishin B. Sadarangani. “On a class of Urysohn-Stieltjes quadratic integral equations and their applications.” J. Comput. Appl. Math. 113, no. 1-2 (2000): 35-50. Cited on 203 and 204.]Search in Google Scholar
[[16] Banaś, Józef, and Beata Rzepka. “Monotonic solutions of a quadratic integral equation of fractional order.” J. Math. Anal. Appl. 332, no. 2 (2007): 1371-1379. Cited on 203 and 204.]Search in Google Scholar
[[17] Banaś, Józef, and Kishin B. Sadarangani. “Solvability of Volterra-Stieltjes operator-integral equations and their applications.” Comput. Math. Appl. 41, no. 12 (2001): 1535-1544. Cited on 204.]Search in Google Scholar
[[18] Chandrasekhar, Subrahmanyan. Radiative transfer. New York: Dover Publications, 1960. Cited on 203.]Search in Google Scholar
[[19] Corduneanu, Constantin. Integral equations and stability of feedback systems. Vol. 104 of Mathematics in Science and Engineering. New York, London: Academic Press, 1973. Cited on 203.]Search in Google Scholar
[[20] Dhage, Bapurao Chandrabhan. “A coupled hybrid fixed point theorem involving the sum of two coupled operators in a partially ordered Banach space with applications.” Differ. Equ. Appl. 9, no. 4 (2017): 453-477. Cited on 203, 204 and 206.]Search in Google Scholar
[[21] Dhage, Bapurao Chandrabhan and Sidheshwar Sangram Bellale. “Local asymptotic stability for nonlinear quadratic functional integral equations.” Electron. J. Qual. Theory Differ. Equ. (2008): Art. no. 10. Cited on 203, 204 and 210.]Search in Google Scholar
[[22] Kilbas, Anatoly Aleksandrovich, Hari Mohan Srivastava, and Juan J. Trujillo. Theory and applications of fractional differential equations Vol. 204 of North-Holland Mathematics Studies. Amsterdam: Elsevier Science B.V., 2006. Cited on 207.]Search in Google Scholar
[[23] Lebesgue, Henri Leon. Leçons sur l’intégration et la recherche des fonctions primitives professées au Collège de France. Cambridge Library Collection. Cambridge: Cambridge University Press, 2009. Reprint of the 1904 original. Cited on 209.10.1017/CBO9780511701825]Search in Google Scholar
[[24] Isidor Pavlovič Natanson. Theory of functions of a real variable Vol. 85 of North-Holland Mathematics Studies. Berlin: Akademie-Verlag, 1981. Cited on 208 and 209.]Search in Google Scholar
[[25] Schwabik, Štefan, Milan Tvrdý and Otto Vejvoda. Differential and integral equations. Dordrecht, Boston, London: D. Reidel Publishing Co., 1979. Cited on 203, 208 and 209.]Search in Google Scholar
[[26] Sikorski, Roman. Funkcje rzeczywiste. Warszawa: Państwowe Wydawnictwo Naukowe, 1958. Cited on 209.]Search in Google Scholar
