Geodesic
Measure of noncompactness of subsets of Lebesgue spaces
Časopis pro pěstování matematiky, Tome 103 (1978) no. 1, pp. 67-72

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DOI : 10.21136/CPM.1978.117972
Classification : 46E30 
Otáhal, Antonín. Measure of noncompactness of subsets of Lebesgue spaces. Časopis pro pěstování matematiky, Tome 103 (1978) no. 1, pp. 67-72. doi: 10.21136/CPM.1978.117972
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[2] L. S. Goldstein A. S. Markus: On the measure of noncompactness of bounded sets and linear operators. Issled. po algebre i mat. anal. Kismev, 1965, pp. 45-54 (in Russian).

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[4] R. D. Nussbaum: A generalization of the Ascoli theorem and an application to functional differential equations. J. Math. Anal. Appl. 35, 1971, 600-610. | MR | Zbl

[5] J. Daneš: On densifying and related mappings and their application in nonlinear functional analysis. Theory of Nonlinear Operators. Proc. Summer Schocl, October 1972. Akademie Verlag, Berlin 1974, pp. 15-56. | MR

[6] K. Goebel: The measure of noncompactness in metric spaces and its applications in fixed point theory. Dissertation. Lublin 1970 (in Polish).

[7] M. A. Krasnoselskij, P. P. Zabrejko: Geometrical Methods of Nonlinear Analysis. Nauka, Moscow 1975 (in Russian).

[8] B. N. Sadovskij: On the measure of noncompactness and densifying operators. Problemy Mat. Anal. Slož. Sistemy 2, 1968, Voronezh, 89-119 (in Russian).

[9] B. N. Sadovskij: Limit compact and densifying operators. Uspechi Mat. Nauk 27, no 1, 1972, 81 - 146 (in Russian). | MR

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