TY - BOOK AU - Klafter,J. AU - Lim,S.C. AU - Metzler,Ralf TI - Fractional dynamics: recent advances SN - 9789814340588 AV - QC20.7.F73 F727 2012 PY - 2012///] CY - New Jersey PB - World Scientific KW - Fractional calculus KW - Dynamics KW - Diffusion KW - Mathematical models N1 - Includes bibliographical references and index; -- Anomalous diffusion and fractional transport equations; / R. Metzler and J.-H. Jeon; -- Stochastic diffusion and stable noise-induced phenomena; / B. Dybiec and E. Gudowska-Nowak; -- Characteristic times of anomalous diffusion in a potential; / W.T. Coffey, Y.P. Kalmykov and S.V. Titov; -- Reactions in subdiffusive media and associated fractional equations; / S.B. Yuste, E. Abad and K. Lindenberg; -- Natural and modified forms of distributed-order fractional diffusion equations; / A. Chechkin, I.M. Sokolov and J. Klafter; -- Anomalous transport in the presence of truncated Lévy flights; / D. del-Castillo-Negrete; -- Anomalous diffusion : from fractional master equations to path integrals; / R. Friedrich; -- Fractional Feynman-Kac equation for anomalous diffusion functionals; / S. Carmi and E. Barkai; -- Foundations of fractional dynamics : a short account; / R. Hilfer; -- Parametric subordination in fractional diffusion processes; / R. Gorenflo and F. Mainardi; -- Fractional calculus, anomalous diffusion, and probability; / M.M. Meerschaert; -- Fractional Langevin equation; / E. Lutz; -- Subdiffusive dynamics in washboard potentials : two different approaches and different universality classes; / I. Goychuk and P. Hänggi; -- Identification and validation of fractional subdiffusion dynamics; / K. Burnecki, M. Magdziarz and A. Weron; -- A class of CTRWs : compound fractional Poisson processes; / E. Scalas; -- Origin of allometry hypothesis; / B.J. West and D. West; -- Principles of fractional quantum mechanics; / N. Laskin; -- Two examples of fractional quantum dynamics; / A. Iomin; -- Fractional dynamics of open quantum systems; / V.E. Tarasov; -- Casimir effect associated with fractional Klein-Gordon field; / S.C. Lim and L.P. Teo ER -