Basic properties of Sobolev’s spaces on time scales. (English) Zbl 1139.39022
Summary: We study the theory of Sobolev spaces of functions defined on a closed subinterval of an arbitrary time scale endowed with the Lebesgue \(\Delta \)-measure; analogous properties to that valid for Sobolev spaces of functions defined on an arbitrary open interval of the real numbers are derived.
MSC:
| 39A12 | Discrete version of topics in analysis |
| 46E35 | Sobolev spaces and other spaces of “smooth” functions, embedding theorems, trace theorems |
References:
| [1] | Bohner M, Peterson A (Eds): Advances in Dynamic Equations on Time Scales. Birkhäuser Boston, Massachusetts; 2003:xii+348. · Zbl 1025.34001 |
| [2] | Brezis H: Analyse Fonctionnelle: Thèorie et Applications. Masson, Paris; 1996. |
| [3] | Cabada A, Vivero DR: Criterions for absolute continuity on time scales.Journal of Difference Equations and Applications 2005,11(11):1013-1028. 10.1080/10236190500272830 · Zbl 1081.39011 · doi:10.1080/10236190500272830 |
| [4] | Cabada A, Vivero DR: Expression of the Lebesgue Δ-integral on time scales as a usual Lebesgue integral. Application to the calculus of Δ-antiderivatives. to appear in Mathematical and Computer Modelling · Zbl 1092.39017 |
| [5] | Guseinov GSh: Integration on time scales.Journal of Mathematical Analysis and Applications 2003,285(1):107-127. 10.1016/S0022-247X(03)00361-5 · Zbl 1039.26007 · doi:10.1016/S0022-247X(03)00361-5 |
| [6] | Hewitt E, Stromberg K: Real and Abstract Analysis. A Modern Treatment of the Theory of Functions of a Real Variable, Graduate Texts in Mathematics, no. 25. 3rd edition. Springer, New York; 1975:x+476. · Zbl 0307.28001 |
| [7] | Rudin W: Real and Complex Analysis. 1st edition. McGraw-Hill, New York; 1966:xi+412. · Zbl 0142.01701 |
| [8] | Rudin W: Real and Complex Analysis. 3rd edition. McGraw-Hill, New York; 1987:xiv+416. · Zbl 0925.00005 |
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