Abstract
Measures of noncompactness are very useful tools which are widely used in fixed point theory, differential equations, functional equations, integral and integro-differential equations, and optimization etc. In recent years measures of noncompactness have also been used in defining geometric properties of Banach spaces as well as in characterizing compact operators between sequence spaces. In this survey article, we present a study on applications of measures of noncompactness to infinite system of differential equations of first and second order and fractional differential equations in some classical sequence spaces.
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Aghajani, A., Banaś, J., Sabzali, N.: Some generalizations of Darbo fixed point theorem and applications. Bull. Belg. Math. Soc. Simon Stevin 20(2), 345–358 (2013)
Aghajani, A., Pourhadi, E., Trujillo, J.J.: Application of measure of noncompactness to a Cauchy problem for fractional differential equations in Banach spaces. Fract. Calc. Appl. Anal. 16(4), 962–977 (2013)
Aghajani, A., Allahyari, R., Mursaleen, M.: A generalizations of Darbo’s theorem with applications to the solvability of systems of integral equations. J. Comput. Appl. Math. 260, 68–77 (2014)
Aghajani, A., Mursaleen, M.: Shole Haghighi, A.: Fixed point theorems for Meir-Keeler condensing operators via measure of noncompactness. Acta Math. Sci. 35B(3), 552–566 (2015)
Aghajani, A., Pourhadi, E.: Application of measure of noncompactness to \(\ell _{1}\)-solvability of infinite systems of second order differential equations. Bull. Belg. Math. Soc. Simon Stevin 22(1), 105–118 (2015)
Aghajani, A., Sabzali, N.: Existence of coupled fixed points via measure of noncompactness and applications. J. Nonlinear Convex Anal. 15(5), 941–952 (2014)
Akhmerov, R.R., Kamenskij, M.I., Potapov, A.S., Rodkina, A.E., Sadovskii, B.N.: Measures of noncompactness and condensing operators, operator theory: advances and applications, vol. 55. Birkhäuser, Basel (1992)
Appell, J.: Measures of noncompactness, condensing operators and fixed points: an application-oriented survey. Fixed Point Theory 6(2), 157–229 (2005)
Banaś, J., Mursaleen, M.: Sequence spaces and measures of noncompactness with applications to differential and integral equations. Springer, India (2014)
Banaś, J., Goebel, K.: Measures of noncompactness in Banach Spaces. Lecture Notes in Pure and Applied Mathematics, vol. 60. Marcel Dekker, New York (1980)
Banaś, J., Lecko, M.: Solvability of infinite systems of differential equations in Banach sequence spaces. J. Comput. Appl. Math. 137, 363–375 (2001)
Banaś, J., Lecko, M.: An existence theorem for a class of infinite systems of integral equations. Math. Comput. Model. 34, 533–539 (2001)
Banaś, J., Martinon, A.: Measures of noncompactness in Banach sequence spaces. Math. Slovaca 42, 497–503 (1992)
Başarır, M., Kara, E.E.: On compact operators on the Riesz \(B^{m}\)-difference sequence spaces. Iran. J. Sci. Tech. Trans. A 35(A4), 279–285 (2011)
Başarır, M., Kara, E.E.: On the \(B\)-difference sequence space derived by generalized weighted mean and compact operators. J. Math. Anal. Appl. 391, 67–81 (2012)
Başarır, M., Kara, E.E.: On compact operators on the Riesz \(B^{m}\)-difference sequence spaces-II. Iran. J. Sci. Tech. Trans. A 36(A3), 371–377 (2012)
Başar, F., Malkowsky, E.: The characterization of compact operators on spaces of strongly summable and bounded sequences. Appl. Math. Comput. 217, 5199–5207 (2011)
Bothe, D.: Multivalued perturbations of m-accretive differential inclusions. Isr. J. Math. 108, 109–138 (1998)
Chang, S.S., Cho, Y.J., Huang, N.J.: Coupled fixed point theorems with applications. J. Korean Math. Soc. 33(3), 575–585 (1996)
Daneš, J.: On the Istrǎţesku’s measure of noncompactness. Bull. Math. Soc. Sci. Math. RSR 16(4), 403–406 (1972)
Daneš, J.: On densifying and related mappings and their application in nonlinear functional analysis, Theory of Nonlinear Operators. Akademic-Verlag, Berlin (1974)
Darbo, G.: Punti uniti in transformazioni a condominio non compatto. Rend. Semin. Math. Univ. Padova 24, 84–92 (1955)
de Malafosse, B., Malkowsky, E., Rakočević, V.: Measure of noncompactness of operators and matrices on the spaces \(c\) and \( c_{0}\). Int. J. Math. Math. Sci. 2006, 1–5 (2006)
de Malafosse, B., Rakočević, V.: Applications of measure of noncompactness in operators on the spaces \(s_{\alpha }\), \( s_{\alpha }^{0}\), \(s_{\alpha }^{(c)}\), \(\ell _{\alpha }^{p}\). J. Math. Anal. Appl. 323(1), 131–145 (2006)
Deimling, K.: Ordinary differential equations in Banach spaces. Lecture Notes in Mathematics, vol. 596. Springer, Berlin (1977)
Djolović, I., Malkowsky, E.: A note on compact operators on matrix domains. J. Math. Anal. Appl. 340(1), 291–303 (2008)
Geraghty, M.: On contractive mappings. Proc. Am. Math. Soc. 40, 604–608 (1973)
Goldenštein, L.S., Markus, A.S.: On a measure of noncompactness of bounded sets and linear operators. In: Studies in algebra and mathematical analysis, pp. 45–54. Kishinev (1965)
Goldenštein, L.S., Gohberg, I.T., Markus, A.S.: Investigations of some properties of bounded linear operators with their \(q\) -norms. Učen. Zap. Kishinevsk. Univ. 29, 29–36 (1957)
Istrăţescu, V.: On a measure of noncompactness. Bull. Math. Soc. Sci. Math. R.S. Roum. (N.S) 16, 195–197 (1972)
Jleli, M., Mursaleen, M., Samet, B.: On a class of \(q\) -integral equations of fractional orders. Electron. J. Differ. Equ. 2016(17), 1–14 (2016)
Kara, E.E., Başarır, M.: On compact operators and some Euler \(B^{(m)}\)-difference sequence spaces. J. Math. Anal. Appl. 379, 499–511 (2011)
Kilbas, A.A., Srivastava, H.M., Trujillo, J.J.: Theory and applications of fractional differential equations. North-Holland Mathematics Studies, vol. 204. Elsevier Science, Amsterdam (2006)
Kuratowski, K.: Sur les espaces complets. Fund. Math. 15, 301–309 (1930)
Lim, T.C.: On characterizations of Meir-Keeler contractive maps. Nonlinear Anal. 46, 113–120 (2001)
Malkowsky, E.: Modern functional analysis in the theory of sequence spaces and matrix transformations. Jordan J. Math. Stat. 1(1), 1–29 (2008)
Malkowsky, E.: Compact matrix operators between some \(BK\) spaces. In: Mursaleen, M. (ed.) Modern methods of analysis and its applications, pp. 86–120. Anamaya Publ, New Delhi (2010)
Malkowsky, E., Rakočević, V.: The measure of noncompactness of linear operators between spaces of \(m^{th}\)-order difference sequences. Studia Sci. Math. Hungar. 35, 381–395 (1999)
Malkowsky, E., Rakočević, V.: An introduction into the theory of sequence spaces and measures of noncompactness, Zbornik Radova. Mat. Institut SANU (Beograd) 9(17), 143–234 (2000)
Meir, A., Keeler, E.: A theorem on contraction mappings. J. Math. Anal. Appl. 28, 326–329 (1969)
Mursaleen, M., Noman, A.K.: Applications of Hausdorff measure of noncompactness in the spaces of generalized means. Math. Ineq. Appl. 16 (2013)
Mursaleen, M., Rizvi, S.M.H.: Solvability of infinite system of second order differential equations in \(c_{0}\) and \({\ell }_{1}\) by Meir-Keeler condensing operator. Proc. Am. Math. Soc. doi:10.1090/proc/13048 (in press)
Mursaleen, M., Karakaya, V., Polat, H., Simsek, N.: Measure of noncompactness of matrix operators on some difference sequence spaces of weighted means. Comput. Math. Appl. 62, 814–820 (2011)
Mursaleen, M.: Application of measure of noncompactness to infinite system of differential equations. Can. Math. Bull. 56, 388–394 (2013)
Mursaleen, M., Alotaibi, A.: Infinite systems of differential equations in some BK spaces. Abst. Appl. Anal. 2012, 20 (2012). (Article ID 863483)
Mursaleen, M., Mohiuddine, S.A.: Applications of measures of noncompactness to the infinite system of differential equations in \(l_p\) spaces. Nonlinear Anal. 75, 2111–2115 (2012)
Mursaleen, M., Noman, A.K.: Applications of the Hausdorff measure of noncompactness in some sequence spaces of weighted means. Comput. Math. Appl. 60, 1245–1258 (2010)
Mursaleen, M., Noman, A.K.: Compactness by the Hausdorff measure of noncompactness. Nonlinear Anal 73, 2541–2557 (2010)
Mursaleen, M., Noman, A.K.: The Hausdorff measure of noncompactness of matrix operators on some \(BK\) spaces. Oper. Matrices 5(3), 473–486 (2011)
Mursaleen, M., Noman, A.K.: Compactness of matrix operators on some new difference sequence spaces. Linear Algebra Appl. 436(1), 41–52 (2012)
Mursaleen, M., Noman, A.K.: Hausdorff measure of noncompactness of certain matrix operators on the sequence spaces of generalized means. J. Math. Anal. Appl. 417, 96–111 (2014)
Oguztoreli, M.N.: On the neural equations of Cowan and Stein. Utilitas Math. 2, 305–315 (1972)
Sikorski, R.: Real functions. PWN, Warsaw (1958). (in Polish)
Suzuki, T.: Fixed-point theorem for asymptotic contractions of Meir-Keeler type in complete metric spaces. Nonlinear Anal. 64, 971–978 (2006)
Toledano, J.M.A., Benavides, T.D., Azedo, G.L.: Measures of noncompactness in Metric Fixed Point Theory. Birkhäuser, Basel (1997)
Wang, G., Baleanu, D., Zhang, L.: Monotone iterative method for a class of nonlinear fractional differential equations. Fract. Calc. Appl. Anal. 15(2), 244–252 (2012)
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Mursaleen, M. Differential equations in classical sequence spaces. RACSAM 111, 587–612 (2017). https://doi.org/10.1007/s13398-016-0301-7
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DOI: https://doi.org/10.1007/s13398-016-0301-7