Unification of visco-elastic wave equations

TL;DR

This paper presents a unification framework for various visco-elastic wave equations in seismology, integrating rheological models, fractional calculus, and existing formulations to clarify their relationships and enhance seismic imaging techniques.

Contribution

It introduces a unification formalism based on rheological elements, connecting different visco-elastic wave equations and incorporating fractional models like the constant Q model.

Findings

Unified description of visco-elastic wave equations

Clarified links between rheological models and seismic equations

Facilitated integration of fractional calculus into seismic modeling

Abstract

Visco-elasticity is the essential ingredient for quantitative seismic imaging and geological interpretation in a number of contexts, such as in the presence of gas clouds. Decades of developments of numerical simulation of visco-elastic wave equations in seismology are mainly based on constant Q model, leading to numerous different forms of time-domain visco-elastic wave equations. Based on rheological models, Emmerich and Korn (1987) adopted the Generalized Maxwell body (GMB) to implement visco-elastic wave equations in time domain. Carcione, Kosloff, and Kosloff (1988a) incorporated the Generalized Zener body (GZB) into the time-domain visco-elastic wave equation. Moczo and Kristek (2005) proved that visco-elastic complex modulus based on GMB and GZB are equivalent. However, from the rheological point of view, this formalism can not incorporate the fractional visco-elastic wave equations based on the constant Q model (Kjartansson, 1979). Mainardi (2010) first mentioned that the constant Q model is based on a fractional Scott-Blair model. The stress-strain relationship of the Scott-Blair model is between a spring and a dashpot. Therefore, we review the various visco-elastic wave equations in the text of seismology. Based on the stress-strain constitutive law of rheological models, we propose a unification way to describe the existed visco-elastic wave equations. The unification formalism indicates that each kind of visco-elastic wave equation is composed by the combination of basic rheological elements, e.g., GMB, GZB. In this paper, we gather knowledge usually available in separated papers in the fields of fractional calculus, rheology, mechanics, and seismology. By unification formalism, we can establish more clearly links between different approaches used in seismology.