Wave Propagation Dynamics in a Fractional Zener Model with Stochastic Excitation

Wave Propagation Dynamics in a Fractional Zener Model with Stochastic Excitation

Equations of motion for a Zener model describing a viscoelastic rod are investigated and conditions ensuring the existence, uniqueness and regularity properties of solutions are obtained. Restrictions on the coefficients in the constitutive equation are determined by a weak form of the dissipation i...

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Veröffentlicht in:Fractional calculus & applied analysis 2020-12, Vol.23 (6), p.1570-1604
Hauptverfasser: Atanacković, Teodor, Pilipović, Stevan, Seleši, Dora
Format: Artikel
Sprache:eng
Schlagworte:
35R11
35R60
60G15
74D05
74J05
82D30
Abstract Harmonic Analysis
Analysis
constitutive equation
Constitutive equations
Constitutive relationships
Equations of motion
fractional derivatives
Functional Analysis
Integral Transforms
Karhunen-Loéve expansion
Mathematics
Operational Calculus
Primary 26A33
Secondary 35L05
stochastic excitation
Stochastic models
stochastic process
Stochastic processes
Survey Paper
thermodynamical restrictions
Wave propagation
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Beschreibung
Zusammenfassung:Equations of motion for a Zener model describing a viscoelastic rod are investigated and conditions ensuring the existence, uniqueness and regularity properties of solutions are obtained. Restrictions on the coefficients in the constitutive equation are determined by a weak form of the dissipation inequality. Various stochastic processes related to the Karhunen-Loéve expansion theorem are presented as a model for random perturbances. Results show that displacement disturbances propagate with an infinite speed. Some corrections of already published results for a non-stochastic model are also provided.
ISSN:1311-0454
1314-2224
DOI:10.1515/fca-2020-0079