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Weighted inequalities, limiting real interpolation and function spaces
Grover, Manvi ; Opic, Bohumír (advisor) ; Persson, Lars-Erik (referee) ; Nekvinda, Aleš (referee)
This thesis is focused on studying limiting interpolation spaces with weight func- tions of slowly varying type and properties of operators defined on them. In Paper 1 we establish conditions under which K-spaces in the limiting real interpolation involving slowly varying functions can be described by means of J-spaces and we also solve the reverse problem. Further, we apply our results to obtain density theorems for the corresponding limiting interpolation spaces. In paper 2 we study the properties of compactness of operators defined on lim- iting interpolation spaces and derive the quantitative estimates of measure of non-compactness. In paper 3 we estimate dual spaces of limiting interpolation spaces that involve weight functions of slowly varying type. 1
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Konjugovaná funkce
Bathory, Michal ; Opic, Bohumír (advisor) ; Bulíček, Miroslav (referee)
Using interpolation methods, new results on the boundedness of quasilinear joint weak type operators on Lorentz-Karamata (LK) spaces are established. LK spaces generalize many function spaces introduced before in literature, for example, the generalized Lorentz- Zygmund spaces, the Zygmund spaces, the Lorentz spaces and, of course, the Lebesgue spaces. The focus is mainly on the limiting cases of interpolation, where the spaces involved are, in certain sense, very close to the endpoint spaces. The results contain both necessary and sufficient conditions for the boundedness of the given operator on LK spaces. The complete characterization of embeddings of LK spaces is also included and the optimality of achieved results is then discussed. Finally, we apply our results to the conjugate function operator, which is known to be bounded on $L_p$ only if $1<p<\infty.$ Powered by TCPDF (www.tcpdf.org)
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Konjugovaná funkce
Bathory, Michal ; Opic, Bohumír (advisor) ; Bulíček, Miroslav (referee)
Using interpolation methods, new results on the boundedness of quasilinear joint weak type operators on Lorentz-Karamata (LK) spaces are established. LK spaces generalize many function spaces introduced before in literature, for example, the generalized Lorentz- Zygmund spaces, the Zygmund spaces, the Lorentz spaces and, of course, the Lebesgue spaces. The focus is mainly on the limiting cases of interpolation, where the spaces involved are, in certain sense, very close to the endpoint spaces. The results contain both necessary and sufficient conditions for the boundedness of the given operator on LK spaces. The complete characterization of embeddings of LK spaces is also included and the optimality of achieved results is then discussed. Finally, we apply our results to the conjugate function operator, which is known to be bounded on $L_p$ only if $1<p<\infty.$ Powered by TCPDF (www.tcpdf.org)
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Conjugate series to Fourier's ones
Bathory, Michal ; Opic, Bohumír (advisor) ; Zelený, Miroslav (referee)
This thesis focuses entirely on conjugate series to Fourier's ones. It provides a quick and intuitive introduction to this topic for the reader who is familiar with classical Fourier's series. The thesis contains simple tests for the convergence of conjugate series and for the existence of related conjugate functions. These concepts are illustrated with examples. Extensive and comprehensive works of Antoni Zygmund are dedicated to the conjugate series (among other topics) but the corresponding proofs are far from detailed. Thus, this thesis summarizes the basic assertions systematically, gives proofs in detail and offers author's own solutions to selected examples. Powered by TCPDF (www.tcpdf.org)
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The Z transformation and its application to solutions of difference equations
Hubatová, Michaela ; Opic, Bohumír (advisor) ; Johanis, Michal (referee)
This thesis uses knowledge from the introductory course of complex analysis, especially the theory of Laurent series. It provides basic information about the Z transformation and shows its mathematical applications. The text gives characterizations of exponential type sequences and defines their Z transformation. Presented theorems can be used to determine images of exponential type sequences and to find preimages of functions holomorphic at the point infinity. These theorems are given with proofs and illustrated with examples. Also some methods of the inverse tranformation are mentioned and a list of preimages of chosen rational functions holomorphic at infinity is included. In the last chapter the Z transformation is applied to solve linear difference equations. Powered by TCPDF (www.tcpdf.org)
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Limitní reiterační vzorce pro reálnou interpolaci a aplikaci
Opic, Bohumír
The aim of the paper is to describe reiteration formulal with the limiting value 0=1 for a real interpolation method. Limiting reiteration can be used to investigate a behaviour of linear and some quasi-linear operators in limiting situations. Results are applied to describe the limiting behaviour of the fractional maximal operator and to derive sharp limiting embeddings of Sobolev-Orlicz spaces W1 Ln(log L).alpha.(.omega.). In particular, if .alpha.= 0, we obtain the embedding which is due to Brézis and Wainger.
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