Regularity of Difference Equations on Banach Spaces, 2014
Langue : Anglais
Auteurs : Agarwal Ravi P., Cuevas Claudio, Lizama Carlos
This work introduces readers to the topic of maximal regularity for difference equations. The authors systematically present the method of maximal regularity, outlining basic linear difference equations along with relevant results. They address recent advances in the field, as well as basic semi group and cosine operator theories in the discrete setting. The authors also identify some open problems that readers may wish to take up for further research. This book is intended for graduate students and researchers in the area of difference equations, particularly those with advance knowledge of and interest in functional analysis.
1. Discrete Semi groups and Cosine Operators.- 2. Maximal regularity and the method of Fourier Multipliers.- 3. First Order Linear Difference Equations.- 4. First Order Semi linear Difference Equations.- 5. Second Order Linear Difference Equations.- 6. Second Order Semi linear.- 7. Applications.
Presents the basic discrete semigroup theory and introduces the discrete cosine and sine operators Addresses applications of the theory of discrete maximal regularity to stability of concrete dynamics Introduces recent advances on theory of difference equations on Banach spaces
Date de parution : 09-2016
Ouvrage de 208 p.
15.5x23.5 cm
Date de parution : 07-2014
Ouvrage de 208 p.
15.5x23.5 cm
Thème de Regularity of Difference Equations on Banach Spaces :
Mots-clés :
banach spaces; difference equations; maximal regularity; semigroup theory
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