Literature DB >> 23258950

Stochastic solution to a time-fractional attenuated wave equation.

Mark M Meerschaert1, Peter Straka, Yuzhen Zhou, Robert J McGough.   

Abstract

The power law wave equation uses two different fractional derivative terms to model wave propagation with power law attenuation. This equation averages complex nonlinear dynamics into a convenient, tractable form with an explicit analytical solution. This paper develops a random walk model to explain the appearance and meaning of the fractional derivative terms in that equation, and discusses an application to medical ultrasound. In the process, a new strictly causal solution to this fractional wave equation is developed.

Entities:  

Year:  2012        PMID: 23258950      PMCID: PMC3523720          DOI: 10.1007/s11071-012-0532-x

Source DB:  PubMed          Journal:  Nonlinear Dyn        ISSN: 0924-090X            Impact factor:   5.022


  9 in total

1.  Stochastic solution of space-time fractional diffusion equations.

Authors:  Mark M Meerschaert; David A Benson; Hans-Peter Scheffler; Boris Baeumer
Journal:  Phys Rev E Stat Nonlin Soft Matter Phys       Date:  2002-03-28

2.  Modified Szabo's wave equation models for lossy media obeying frequency power law.

Authors:  W Chen; S Holm
Journal:  J Acoust Soc Am       Date:  2003-11       Impact factor: 1.840

3.  Fractional kinetic equations: solutions and applications.

Authors:  Alexander I. Saichev; George M. Zaslavsky
Journal:  Chaos       Date:  1997-12       Impact factor: 3.642

4.  Fractional Laplacian time-space models for linear and nonlinear lossy media exhibiting arbitrary frequency power-law dependency.

Authors:  W Chen; S Holm
Journal:  J Acoust Soc Am       Date:  2004-04       Impact factor: 1.840

5.  Modeling power law absorption and dispersion for acoustic propagation using the fractional Laplacian.

Authors:  Bradley E Treeby; B T Cox
Journal:  J Acoust Soc Am       Date:  2010-05       Impact factor: 1.840

6.  Full wave modeling of therapeutic ultrasound: efficient time-domain implementation of the frequency power-law attenuation.

Authors:  Marko Liebler; Siegfried Ginter; Thomas Dreyer; Rainer E Riedlinger
Journal:  J Acoust Soc Am       Date:  2004-11       Impact factor: 1.840

7.  Fractal travel time estimates for dispersive contaminants.

Authors:  Danelle D Clarke; Mark M Meerschaert; Stephen W Wheatcraft
Journal:  Ground Water       Date:  2005 May-Jun       Impact factor: 2.671

8.  Finite element analysis of broadband acoustic pulses through inhomogenous media with power law attenuation.

Authors:  Margaret G Wismer
Journal:  J Acoust Soc Am       Date:  2006-12       Impact factor: 1.840

9.  Analytical time-domain Green's functions for power-law media.

Authors:  James F Kelly; Robert J McGough; Mark M Meerschaert
Journal:  J Acoust Soc Am       Date:  2008-11       Impact factor: 1.840
  9 in total
  4 in total

1.  STOCHASTIC SOLUTIONS FOR FRACTIONAL WAVE EQUATIONS.

Authors:  Mark M Meerschaert; René L Schilling; Alla Sikorskii
Journal:  Nonlinear Dyn       Date:  2015-06-01       Impact factor: 5.022

2.  Exact and approximate analytical time-domain Green's functions for space-fractional wave equations.

Authors:  Luke M Wiseman; James F Kelly; Robert J McGough
Journal:  J Acoust Soc Am       Date:  2019-08       Impact factor: 1.840

3.  FRACTIONAL WAVE EQUATIONS WITH ATTENUATION.

Authors:  Peter Straka; Mark M Meerschaert; Robert J McGough; Yuzhen Zhou
Journal:  Fract Calc Appl Anal       Date:  2013-03-01       Impact factor: 3.126

4.  NUMERICAL METHODS FOR SOLVING THE MULTI-TERM TIME-FRACTIONAL WAVE-DIFFUSION EQUATION.

Authors:  F Liu; M M Meerschaert; R J McGough; P Zhuang; Q Liu
Journal:  Fract Calc Appl Anal       Date:  2013-03       Impact factor: 3.126
  4 in total

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