Thermo-viscoelastic materials with fractional relaxation operators
暂无分享,去创建一个
[1] Magdy A. Ezzat,et al. Boundary integral equation formulation for the generalized thermoviscoelasticity with two relaxation times , 2004, Appl. Math. Comput..
[2] K. Rajagopal,et al. On the dynamics of non-linear viscoelastic solids with material moduli that depend upon pressure , 2007 .
[3] M. Othman,et al. State space approach to generalized thermo-viscoelasticity with two relaxation times , 2002 .
[4] G. Honig,et al. A method for the numerical inversion of Laplace transforms , 1984 .
[5] Wei Cheng,et al. Source term identification for an axisymmetric inverse heat conduction problem , 2010, Comput. Math. Appl..
[6] Y. Povstenko. Fundamental solutions to the fractional heat conduction equation in a ball under Robin boundary condition , 2014 .
[7] A. El-Bary,et al. Thermo-electric-visco-elastic material , 2010 .
[8] M. Ezzat,et al. On uniqueness and reciprocity theorems for generalized thermo- viscoelasticity with thermal relaxation , 2003 .
[9] H. Lord,et al. A GENERALIZED DYNAMICAL THEORY OF THERMOELASTICITY , 1967 .
[10] N. Tschoegl. Time Dependence in Material Properties: An Overview , 1997 .
[11] M. Fayik,et al. Fractional calculus in one-dimensional isotropic thermo-viscoelasticity , 2013 .
[12] M. Ezzat. The relaxation effects of the volume properties of electrically conducting viscoelastic material , 2006 .
[13] M. Ezzat,et al. The uniqueness and reciprocity theorems for generalized thermo-viscoelasticity with two relaxation times , 2002 .
[14] M. Ezzat,et al. STATE-SPACE FORMULATION TO GENERALIZED THERMOVISCOELASTICITY WITH THERMAL RELAXATION , 2001 .
[15] M. Ezzat,et al. Two-temperature theory in generalized magneto-thermo-viscoelasticity , 2009 .
[16] M. Ezzat,et al. On the boundary integral formulation of thermo-viscoelasticity theory , 2002 .
[17] M. Ezzat. State space approach to generalized magneto-thermoelasticity with two relaxation times in a medium of perfect conductivity , 1997 .
[18] M. Ezzat. STATE SPACE APPROACH TO UNSTEADY TWO-DIMENSIONAL FREE CONVECTION FLOW THROUGH A POROUS MEDIUM , 1994 .
[19] J. Ferry,et al. Mathematical Structure of the Theories of Viscoelasticity , 1955 .
[20] Jiong Tang,et al. A state-space approach for the dynamic analysis of viscoelastic systems , 2004 .
[21] M. Ezzat,et al. State Space Approach to Viscoelastic Fluid Flow of Hydromagnetic Fluctuating Boundary‐Layer through a Porous Medium , 1997 .
[22] M. Ezzat,et al. Fractional order theory of a perfect conducting thermoelastic medium , 2011 .
[23] M. Ezzat. Thermoelectric MHD non-Newtonian fluid with fractional derivative heat transfer , 2010 .
[24] R. Bera,et al. Effect of thermal relaxation on electro-magnetic-thermo-visco-elastic plane waves in rotating media , 1992 .
[25] Francesco Mainardi,et al. Linear models of dissipation in anelastic solids , 1971 .
[26] K. Adolfsson,et al. On the Fractional Order Model of Viscoelasticity , 2005 .
[27] Colin Atkinson,et al. Theoretical aspects of fracture mechanics , 1995 .
[28] H. Youssef,et al. Two-Temperature Theory in Three-Dimensional Problem for Thermoelastic Half Space Subjected to Ramp Type Heating , 2014 .
[29] H. Sherief,et al. Application of fractional order theory of thermoelasticity to a 1D problem for a half‐space , 2014 .
[30] D. Chandrasekharaiah,et al. Hyperbolic Thermoelasticity: A Review of Recent Literature , 1998 .
[31] Magdy A. Ezzat,et al. Magneto-thermoelasticity with thermoelectric properties and fractional derivative heat transfer , 2011 .
[32] M. Othman,et al. Generalized thermo-viscoelastic plane waves with two relaxation times , 2002 .
[33] A. El-Bary,et al. Generalized thermo-viscoelasticity with memory-dependent derivatives , 2014 .
[34] Iu.N. Rabotnov. Elements of hereditary solid mechanics , 1980 .
[35] M. Ezzat. Fundamental solution in generalized magneto-thermoelasticity with two relaxation times for perfect conductor cylindrical region , 2004 .
[36] M. Ezzat. Theory of fractional order in generalized thermoelectric MHD , 2011 .
[37] M. Ezzat,et al. Free convection effects on a viscoelastic boundary layer flow with one relaxation time through a porous medium , 1997 .
[38] M. Caputo. Vibrations of an infinite viscoelastic layer with a dissipative memory , 1974 .
[39] M. Ezzat,et al. Effects of modified Ohm's and Fourier's laws on generalized magneto- viscoelastic thermoelasticity with relaxation volume properties , 2010 .
[40] M. Ezzat,et al. State space formulation to viscoelastic fluid flow of magnetohydrodynamic free convection through a porous medium , 1996 .
[41] M. Ezzat,et al. DISCONTINUITIES IN GENERALIZED THERMO-VISCOELASTICITY UNDER FOUR THEORIES , 2004 .
[42] M. Biot. Thermoelasticity and Irreversible Thermodynamics , 1956 .
[43] M. Ezzat. Thermoelectric MHD with modified Fourier’s law , 2011 .
[44] M. Ezzat,et al. Thermal shock problem in generalized thermo-viscoelasticty under four theories , 2004 .
[45] Guy Jumarie,et al. Derivation and solutions of some fractional Black-Scholes equations in coarse-grained space and time. Application to Merton's optimal portfolio , 2010, Comput. Math. Appl..
[46] H. Sherief,et al. Effect of variable thermal conductivity on a half-space under the fractional order theory of thermoelasticity , 2013 .