Abstract
In this Chapter we present some mathematical definitions and some results of non linear wave problems for a generic quasi-linear hyperbolic system of balance laws type.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
G. Boillat, La Propagation des Ondes, Gauthier-Villars, Parigi (1965).
G. Boillat, Chocs caractéristiques. C.R. Acad. Sc. Paris 274A, 1018 (1972).
S. K. Godunov, An interesting class of quasilinear systems. Sov.Math. 2 (1961).
K.O. Friedrichs & P.D. Lax, Systems of conservation equations with a convex extension. Proc. Nat. Acad. Sci. USA., 68 (1971).
G. Boillat, Sur V existence et la recherche d’équations de conservation supplémentaires pour les systémes hyperboliques. C.R.Acad.Sci., Paris, 278 A (1974).
T. Ruggeri & A. Strumia, Main field and convex covariant density for quasi-linear hyperbolic systems. Relativistic fluid dynamics. Ann.Inst. H.Poincaré, 34 (1981).
T. Ruggeri, Struttura dei Sistemi alle derivate parziali compatibili con un Principio di Entropia e Termodinamica Estesa. Suppl. BUMI Fisica Matematica, 4, 261 (1985).
A. Muracchini, T. Ruggeri and L. Seccia, Dispersion relation in High Frequency limit and non linear Wave Stability for Hyperbolic Dis-sipative System. Wave Motion, 15, (2) (1992).
G. Boillat & T. Ruggeri, On the evolution law of the weak discontinuities for hyperbolic quasi-linear systems. Wave Motion 1, 149 (1979).
T. Ruggeri, Stability and Discontinuity Waves for Symmetric Hyperbolic Systems, in Non linear Wave Motion. Ed. by A. Jeffrey, Longman (1989).
P. Chen, Growth and decay of waves in solids in Mechanics of Solids III, Handbuch der Physik, 6A/3, 303 Springer-Verlag (1973).
Y. Choquet-Bruhat, Ondes Asymptotiques et Approchées pour des Systémes d’équation aux dérivées partielles non linéaires, J. Math. Pures et Appl. 48, 117 (1969).
G. Boillat, Ondes asymptotiques non linéaires, Ann. Mat. Pura Appl. 111, 31 (1976).
K. S. Eckhoff, On Stability for Symmetric Hyperbolic Systems, Journ. Diff. Eq. 40, 94 (1981).
A. Donato & F. Oliveri, Instability Conditions for Symmetric Quasi Linear Hyperbolic Systems, Atti Sem. Mat. Fis. Univ. Modena. 35, 191 (1987).
P.D. Lax, Hyperbolic Systems of Conservation Laws, Comm. Pure Appl. Math. 10, 537 (1957);
T. Ruggeri, A. Muracchini and L. Seccia, Continuum Approach to Phonon Gas and Shape of Second Sound via Shock Waves Theory Nuovo Cimento 16, n. 1, 15 (1994). See also Shock Waves and Second Sound in a Rigid Heat Conductor: A Critical Temperature for NaF and Bi Phys. Rev. Lett. 64, 2640, (1990).
G. Boillat & T. Ruggeri, Reflection and transmission of discontinuity waves through a shock wave. General theory including also the case of characteristic shocks. Proc. of the Royal Soc. of Edinburgh., 83 A, 17 (1979).
L. Brun, Ondes de choc finies dans les solides èlastiques, in Mechanical waves in solids, J. Mandel and L. Brun Eds. Springer, Wien (1975).
A. Jeffrey, Quasilinear hyperbolic systems and waves Pitman, London (1976).
P.D. Lax, Shock Waves and Entropy, in Contribution to non linear functional analysis Zarantonello ed. Academic Press, New York (1971).
G. Boillat, Sur une fonction croissant comme l’entropie et generatrice des chocs dans les systemes hyperboliques. C.R. Acad. Sc. Paris 283-A, 409 (1976).
C. Dafermos, Generalized characteristics in Hyperbolic Systems of conservation laws. Arch. Rat. Mech. and Anal. 107, 127 (1989).
I. Müller & T. Ruggeri, Extended Thermodynamics, Springer Tracts on Natural Philosophy 37 — Springer Verlag — New York (1993).
T. Ruggeri & L. Seccia, Hyperbolicity and Wave propagation in Extended Thermodynamics. Meccanica 24, 127 (1989).
A. Muracchini & L. Seccia, Thermo-acceleration waves and shock formation in Extended Thermodynamics of gravitational gases. Continuum Mech. Thermodyn. 1, 227 (1989).
T. Ruggeri, Shock Waves in Hyperbolic Dissipative Systems: Non Equilibrium Gases. Pitmân Research Notes in Mathematics 227. D. Fusco & A. Jeffrey Eds. Longman (1991).
L. Landau & E. Lifsits, Mècanique des Fluides, pag. 418 Moscow: MIR (1971).
D. Gilbarg & D. Paolucci, The Structure of Shock Waves in the Continuum Theory of Fluids. Journ. Rat. Mech, Anal. 2, 617 (1953).
H. Alsemeyer, Density profiles in argon and nitrogen shock waves measured by the absorption of an electron beam. J. Fluid Mech. 74, 497 (1976).
H. Grad, The Profile of a Steady Plane Shock Wave. Comm. Pure Appl. Math. 5, 257 (1952).
A. M. Anile & A. Majorana, Shock structure for heat conducting and viscid fluids. Meccanica 16 (3),149 (1981).
D. Jou & D. Pavon, Non local and Nonlinear effects in shock waves. Phys. Rev. A 44 (10), 6496 (1991).
T. Ruggeri, Breakdown of Shock Wave Structure Solutions. Phys. Rev. 47-E, (6) (1993).
W. Weiss, Hierarchie der Erweiterten Thermodynamik. Dissertation TU Berlin (1990).
T. Ruggeri, Galilean Invariance and Entropy Principle for Systems of Balance Laws. Cont. Mech. Thermodyn. 1 (1989).
G. Boillat & T. Ruggeri, Characteristic shocks: completely and strictly exceptional systems. Boll. Unione Mat. Ital. (U.M.I.) 15 A, 197 (1978).
N. Kopell & L.N. Howard, Bifurcations and Trajectories joining Critical Points. Advances in Math. 18, 306 (1975).
V. Peshkov, in: Report on an International Conference on Fundamental Particles and Low Temperature Physics Vol. II, The Physical Society of London, (1947).
R. A. Guyer & J. A. Krumhansl, Solution of the Linearized Phonon Boltzmann Equation. Phys. Rev. 148, 766 (1966).
R. A. Guyer & J. A. Krumhansl, Thermal Conductivity, Second Sound, and Phonon Hydrodynamic Phenomena in Nonmetallic Crystals. Phys. Rev. 148, 778 (1966).
T. Ruggeri, Thermodynamics and Symmetric Hyperbolic Systems. Rend. Sem. Mat. Univ. Torino. Fascicolo speciale Hyperbolic Equations, 167 (1987).
A. Morro & T. Ruggeri, Second Sound And Internal Energy In Solids. Int. J. Non-Linear Mech., 22, 27 (1987).
A. Morro & T. Ruggeri, Non-equilibrium properties of solids obtained from second-sound measurements. J. Phys. C.: Solid State Phys., 21, 1743 (1988).
B. D. Coleman, M. Fabrizio & D. R. Owen, On the thermodynamics of second sound in dielectric crystals. Arch. Rat. Mech. Anal. 80, 135 (1982).
G. Boillat & T. Ruggeri, Limite de la vitesse des chocs dans les champs a densité d’energie convexe. Compt. Rend. Acad. Sci. Paris, 289 A, 257 (1979).
H. E. Jackson, C. T. Walker & T. F. McNelly, Second Sound In NaF. Phys. Rev. Lett. 25, 26 (1970).
V. Narayanamurti & R. C. Dynes, Observation of Second Sound in Bismuth. Phys. Rev. Lett. 28, 1461 (1972).
B. D. Coleman & D. C. Newman, Implications of a nonlinearity in the theory of second sound in solids. Phys. Rev. B 37, 1492 (1988).
C. C. Ackerman & R. A. Guyer, Temperature Pulses in Dielectric Solids. Ann. of Phys. 50, 128 (1968).
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 1995 Springer-Verlag Wien
About this chapter
Cite this chapter
Ruggeri, T. (1995). Recent Results on Wave Propagation in Continuum Models. In: Galdi, G.P. (eds) Stability and Wave Propagation in Fluids and Solids. CISM International Centre for Mechanical Sciences, vol 344. Springer, Vienna. https://doi.org/10.1007/978-3-7091-3004-9_4
Download citation
DOI: https://doi.org/10.1007/978-3-7091-3004-9_4
Publisher Name: Springer, Vienna
Print ISBN: 978-3-211-82687-4
Online ISBN: 978-3-7091-3004-9
eBook Packages: Springer Book Archive