pokój: 303, al. Armii Krajowej 21
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konsultacje w semestrze letnim 2023/2024
czwartek: 12-13
(bardzo proszę o wcze¶niejsze umówienie)Publikacje
M. Wróbel, Schramm spaces and composition operators, J. Appl. Math. Comput. Mech., 22 (2) (2023), 87-98.
M. Wróbel, Operators with memory in Schramm spaces, J. Appl. Math. Comput. Mech., 22 (3) (2023), 69-80.
M. Wróbel, Locally defined operators acting C^(infinity)(A) into C^(0)(A) , J. Appl. Math. Comput. Mech., 21 (2) (2022), 103-110.
M. Wróbel, The form of locally defined operators in Waterman spaces, Math. Slovaca 71 (6) (2021), 1529-1544.
M. Wróbel, Locally defined operators in the space of functions of bounded Jordan variation, in Selected Topics in Contemporary Mathematical Modeling 2021, ed. A.Z. Grzybowski , Chapter 10, 164-179.
J. Matkowski, M. Wróbel, On the Beckenbach-Gini-Lehmer means and means mappings, Mathematics 8 (9) (2020), 1569.
M. Wróbel, Locally defined operators in the space of C^(k,omega)-functions, Math. Slovaca 70 (3) (2020), 745-752.
H. Leiva, N. Merentes, S. Rivas, J. Sanchez, M. Wróbel, On functions of bounded (phi,k)-variation, Tatra Mt. Math. Publ. 74 (2) (2019), 91-116.
H. Izumi, L. Li, J. Matkowski, M. Wrobel, Sandwich with periodicity, Aequat. Math. 93 (2019). 699-709.
M. Lupa, M. Wróbel, Uniformly bounded Nemytskij operators acting between the Banach spaces of generalized Hölder functions, J. Appl. Math. Comput. Mech., 16 (4) (2017), 37-45.
T. Lara, J. Matkowski, N. Merentes, R. Quintero, M. Wróbel, A generalization of m-convexity and a sandwich theorem, Annales Mathematicae Silesianae 31 (2017), 107-126.
J. Matkowski, M. Wróbel, Sandwich theorem for m-convex functions, J. Math. Anal. Appl. 451 (2017), 924-930.
K. Domańska, M. Wróbel, About the ways of defining connected sets in the topological spaces, Scientific Issues, Jan Długosz University in Częstochowa, Mathematics XXI (2016), 11-16.
J.A. Guerrero, J. Matkowski, N. Merentes, M. Wróbel, Uniformly bounded set-valued composition operators in the spaces of functions of bounded variation in the sense of Wiener, Journal of Applied Mathematics and Computational Mechanic, 14(4) (2015), 41-51.
T.Ereu, N.Merentes, M.Wróbel, A remark on a uniformly bounded composition operator acting between Banach spaces of functions of two variables of bounded Schramm variation, Scientific Issues, Jan Długosz University in Częstochowa, Mathematics XVIII (2013), 19-27.
M.Wróbel, Locally defined operators in the space of functions of bounded phi-variation, Real Anal. Exch. 38(1) (2013), 79-94.
M.Wróbel, Uniformly bounded Nemytskij operators between the Banach spaces of functions of bounded n-th variation, J Math. Anal. Appl., 391(2012), 451-456.
W.Aziz, T.Ereu, N.Merentes, J.L.Sanchez, M.Wróbel, Uniformly continuous composition operators in the space of functions of two variables of bounded phi-variation in the sense of Schramm, Scientific Issues, Jan Długosz University in Częstochowa, Mathematics XVII (2012), 7-16.
T.Ereu, N.Merentes, J.L.Sanchez, M.Wróbel, Uniformly bounded set-valued composition operators in the space of functions of bounded variation in the sense of Schramm, Scientific Issues, Jan Długosz University in Częstochowa, Mathematics XVII (2012), 37-47.
J.Matkowski, M.Wróbel, Uniformly bounded set-valued Nemytskij operators acting between generalized Holder function spaces, Central European Journal of Mathematics, 10(2), (2012), 609-618.
T.Ereu, N.Merentes, J.L.Sanchez, M.Wróbel, Uniformly continuous composition operators in the space of bounded phi-variation functions in the Schramm sense, Opuscula Mathematica, (32)2012, 239-249.
J.Matkowski, M.Wróbel, Uniformly bounded Nemytskij operators generated by set-valued functions between generalized Holder function spaces, Discussiones Mathematicae Differential Inclusions, Control and Optimization, 31(2011), 183-198.
T.Ereu, N.Merentes, J.L.Sanchez, M.Wróbel, Uniformly continuous set-valued composition operators in the space of functions of bounded variation in the sense of Schramm, Scientific Issues of Jan Długosz University in Częstochowa, Mathematics XVI (2011), 23-32.
M.Wróbel, Locally defined operators in Holder spaces, Nonlinear Analysis: Theory, Methods and Applications, 74 (2011), 317-323.
J.Matkowski, M.Wróbel, The bounded local operators in the Banach space of Holder functions, Scientific Issues, Mathematics XV, Częstochowa (2010), 91-98.
J.Knop, M.Wróbel, A characteristic of i-connected spaces, Tatra Mt. Math. Publ. 46 (2010), 1-5.
M.Wróbel, Representation theorem for local operators in the space of continuous and monotone functions, J. Math. Anal. Appl. 372 (2010), 45-54.
M.Wróbel, Locally defined operators and a partial solution of a conjecture, Nonlinear Analysis: Theory, Methods and Applications 72 (2010), 495-506.
J.Matkowski, M.Wróbel, Representation theorem for locally defined operators in the space of Whitney differentiable functions, Manuscripta Mathematica, 129 (2009), 437-448.
J.Matkowski, M.Wróbel, Locally defined operators in the space of Whitney differentiable functions, Nonlinear Analysis: Theory, Methods and Applications, 68 (2008), 2933-2942.
M.Wróbel, Lichawski-Matkowski-Mi¶ Theorem of locally defined operators for functions of several variables, Annales Academiae Paedagogicae Cracoviensis Studia Mathematica, 7 ( 2008), 15-22.
J.Knop, M.Wróbel, Some properties of i-connected sets (Part II), Jan Długosz University of Częstochowa, Scientific Issues, Mathematics XII, Częstochowa (2007), 55-60.
J.Knop, M.Wróbel, Some properties of i-connected sets, Annales Academiae Paedagogicae Cracoviensis Studia Mathematica, 6 ( 2007), 51-56.
