Your search keyword '"Primary 28B20"' showing total 6 results

1. Convergence for varying measures in the topological case

Author

Valeria Marraffa, Luisa di Piazza, Kazimierz Musial, Anna Rita Sambucini, Valeria Marraffa, Luisa di Piazza, Kazimierz Musial, and Anna Rita Sambucini

Subjects

Mathematics - Functional Analysis, 28B05, Primary 28B20, Secondary 26E25, 26A39, 28B05, 46G10, 54C60, 54C65, 26A39, setwise convergence, vaguely convergence, weak convergence of measures, locally compact Hausdorff space, Vitali's Theorem, Settore MAT/05 - Analisi Matematica, 54C60, FOS: Mathematics, Primary 28B20, Secondary 26E25, 54C65, Functional Analysis (math.FA), 46G10

Abstract

In this paper convergence theorems for sequences of scalar, vector and multivalued Pettis integrable functions on a topological measure space are proved for varying measures vaguely convergent., 21 pages

Published

2023

2. A Decomposition of Henstock-Kurzweil-Pettis Integrable Multifunctions

Author

Di Piazza, Luisa, Musiał, Kazimierz, Gohberg, I., editor, Alpay, D., editor, Arazy, J., editor, Atzmon, A., editor, Ball, J. A., editor, Bart, H., editor, Ben-Artzi, E., editor, Bercovici, H., editor, Böttcher, A., editor, Clancey, K., editor, Curto, R., editor, Davidson, K. R., editor, Demuth, M., editor, Dijksma, A., editor, Douglas, R. G., editor, Duduchava, R., editor, Ferreira dos Santos, A., editor, Frazho, A. E., editor, Fuhrmann, P. A., editor, Gramsch, B., editor, Kaper, H. G., editor, Kuroda, S. T., editor, Lerer, L. E., editor, Mityagin, B., editor, Olshevski, V., editor, Putinar, M., editor, Ran, A. C. M., editor, Rodman, L., editor, Rovnyak, J., editor, Schulze, B.-W., editor, Speck, F., editor, Spitkovsky, I. M., editor, Treil, S., editor, Tretter, C., editor, Upmeier, H., editor, Vasilevski, N., editor, Verduyn-Lunel, S., editor, Voiculescu, D., editor, Xia, D., editor, Yafaev, D., editor, Curbera, Guillermo P., editor, Mockenhaupt, Gerd, editor, and Ricker, Werner J., editor

Published

2010

3. Some Applications of Nonabsolute Integrals in the Theory of Differential Inclusions in Banach Spaces

Author

Cichoń, Kinga, Cichoń, Mieczysław, Gohberg, I., editor, Alpay, D., editor, Arazy, J., editor, Atzmon, A., editor, Ball, J. A., editor, Bart, H., editor, Ben-Artzi, E., editor, Bercovici, H., editor, Böttcher, A., editor, Clancey, K., editor, Curto, R., editor, Davidson, K. R., editor, Demuth, M., editor, Dijksma, A., editor, Douglas, R. G., editor, Duduchava, R., editor, Ferreira dos Santos, A., editor, Frazho, A. E., editor, Fuhrmann, P. A., editor, Gramsch, B., editor, Kaper, H. G., editor, Kuroda, S. T., editor, Lerer, L. E., editor, Mityagin, B., editor, Olshevski, V., editor, Putinar, M., editor, Ran, A. C. M., editor, Rodman, L., editor, Rovnyak, J., editor, Schulze, B.-W., editor, Speck, F., editor, Spitkovsky, I. M., editor, Treil, S., editor, Tretter, C., editor, Upmeier, H., editor, Vasilevski, N., editor, Verduyn-Lunel, S., editor, Voiculescu, D., editor, Xia, D., editor, Yafaev, D., editor, Curbera, Guillermo P., editor, Mockenhaupt, Gerd, editor, and Ricker, Werner J., editor

Published

2010

4. Comparison Between Birkhoff Integral and Gould Integral.

Author

Croitoru, Anca and Gavriluţ, Alina

Abstract

In this paper, results concerning relationships between Birkhoff integrability and Gould integrability, with special considerations on atoms/finitely purely atomic measures, are established. [ABSTRACT FROM AUTHOR]

Published

2015

5. Relations among Henstock, McShane and Pettis integrals for multifunctions with compact convex values.

Author

Piazza, Luisa and Musiał, Kazimierz

Abstract

Fremlin (Ill J Math 38:471-479, ) proved that a Banach space valued function is McShane integrable if and only if it is Henstock and Pettis integrable. In this paper we prove that the result remains valid also in case of multifunctions with compact convex values being subsets of an arbitrary Banach space (see Theorem 3.4). Di Piazza and Musiał (Monatsh Math 148:119-126, ) proved that if $$X$$ is a separable Banach space, then each Henstock integrable multifunction which takes as its values convex compact subsets of $$X$$ is a sum of a McShane integrable multifunction and a Henstock integrable function. Here we show that such a decomposition is true also in case of an arbitrary Banach space (see Theorem 3.3). We prove also that Henstock and McShane integrable multifunctions possess Henstock and McShane (respectively) integrable selections (see Theorem 3.1). [ABSTRACT FROM AUTHOR]

Published

2014

6. Relations among Henstock, McShane and Pettis integrals for multifunctions with compact convex values

Author

Di Piazza, Luisa and Musiał, Kazimierz

Published

2014