相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。Signal propagation in electromagnetic media described by fractional-order models
Tomasz P. Stefanski et al.
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2020)
Revisiting the 1D and 2D Laplace Transforms
Manuel Duarte Ortigueira et al.
MATHEMATICS (2020)
On Applications of Elements Modelled by Fractional Derivatives in Circuit Theory
Jacek Gulgowski et al.
ENERGIES (2020)
A NOTE ON HOLOMORPHIC FUNCTIONS AND THE FOURIER-LAPLACE TRANSFORM
Marcus Carlsson et al.
MATHEMATICA SCANDINAVICA (2017)
From a generalised Helmholtz decomposition theorem to fractional Maxwell equations
Manuel D. Ortigueira et al.
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2015)
On the mathematics underlying dispersion relations
Cecille Labuda et al.
EUROPEAN PHYSICAL JOURNAL H (2014)
Cauchy and Signaling Problems for the Time-Fractional Diffusion-Wave Equation
Yuri Luchko et al.
JOURNAL OF VIBRATION AND ACOUSTICS-TRANSACTIONS OF THE ASME (2014)
A note on fractional electrodynamics
Hosein Nasrolahpour
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION (2013)
Propagation speed of the maximum of the fundamental solution to the fractional diffusion-wave equation
Yuri Luchko et al.
COMPUTERS & MATHEMATICS WITH APPLICATIONS (2013)
Fractional wave equation and damped waves
Yuri Luchko
JOURNAL OF MATHEMATICAL PHYSICS (2013)
Kramers-Kronig, Bode, and the meaning of zero
John Bechhoefer
AMERICAN JOURNAL OF PHYSICS (2011)
An Approach to Introducing Fractional Integro-Differentiation in Classical Electrodynamics
A. N. Bogolyubov et al.
MOSCOW UNIVERSITY PHYSICS BULLETIN (2009)
Fractional integro-differential equations for electromagnetic waves in dielectric media
V. E. Tarasov
THEORETICAL AND MATHEMATICAL PHYSICS (2009)
Fractional vector calculus and fractional Maxwell's equations
Vasily E. Tarasov
ANNALS OF PHYSICS (2008)
Alternative approach to the derivation of dispersion relations for optical constants
Frederick W. King
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL (2006)
Causality and Kramers-Kronig relations for waveguides
MW Haakestad et al.
OPTICS EXPRESS (2005)
Causality-imposed (Kramers-Kronig) relationships between attenuation and dispersion
KR Waters et al.
IEEE TRANSACTIONS ON ULTRASONICS FERROELECTRICS AND FREQUENCY CONTROL (2005)
Differential forms of the Kramers-Kronig dispersion relations
KR Waters et al.
IEEE TRANSACTIONS ON ULTRASONICS FERROELECTRICS AND FREQUENCY CONTROL (2003)
On a time-domain representation of the Kramers-Kronig dispersion relations
KR Waters et al.
JOURNAL OF THE ACOUSTICAL SOCIETY OF AMERICA (2000)
On the applicability of Kramers-Kronig relations for ultrasonic attenuation obeying a frequency power law
KR Waters et al.
JOURNAL OF THE ACOUSTICAL SOCIETY OF AMERICA (2000)