000 02207cam a22002418i 4500
001 23577569
005 20250613153043.0
008 240222s2024 nju b 001 0 eng
020 _a9789811290404
040 _aCSL
_beng
_cCSL
041 _2eng
_aeng
084 _aB334 R4
_qCSL
100 1 _aZhou, Yong,
_eauthor.
_9443507
245 1 0 _aFractional partial differential equations
260 _aSingapore:
_bWorld Scientific,
_c2024.
300 _axv, 302p.
_c; 24 cm
504 _aIncludes bibliographical references and index.
520 _a"This monograph offers a comprehensive exposition of the theory surrounding time-fractional partial differential equations, featuring recent advancements in fundamental techniques and results. The topics covered encompass crucial aspects of the theory, such as well-posedness, regularity, approximation, and optimal control. The book delves into the intricacies of fractional Navier-Stokes equations, fractional Rayleigh-Stokes equations, fractional Fokker-Planck equations, and fractional Schrödinger equations, providing a thorough exploration of these subjects. Numerous real-world applications associated with these equations are meticulously examined, enhancing the practical relevance of the presented concepts. The content of this monograph reflects the culmination of the author's research endeavors, as well as collaborative contributions from experts over the past five years. Rooted in the latest advancements, it not only serves as a valuable resource for understanding the theoretical foundations but also lays the groundwork for delving deeper into the subject and navigating the extensive research landscape. Geared towards researchers, graduate students, and PhD scholars specializing in differential equations, applied analysis, and related research domains, this monograph facilitates a nuanced understanding of time-fractional partial differential equations and their broader implications"--
_cProvided by publisher.
650 0 _aFractional differential equations.
_9812856
650 0 _aDifferential equations, Partial.
_9812385
650 0 _aFractional calculus.
_9812857
942 _2CC
_cTEXL
_hB334 R4
_n0
999 _c1431723
_d1431723