Maximum Dissipation Non-Equilibrium Thermodynamics and Its Geometric Structure

Maximum Dissipation Non-Equilibrium Thermodynamics and its Geometric Structure explores the thermodynamics of non-equilibrium processes in materials. The book develops a general technique to construct nonlinear evolution equations describing non-equilibrium processes, while also developing a geometric context for non-equilibrium thermodynamics. Solid materials are the main focus in this volume, but the construction is shown to also apply to fluids. This volume also:   ¿             Explains the theory behind a thermodynamically-consistent construction of non-linear evolution equations for non-equilibrium processes, based on supplementing the second law with a maximum dissipation criterion ¿             Provides a geometric setting for non-equilibrium thermodynamics in differential topology and, in particular, contact structures that generalize Gibbs ¿            Models processes that include thermoviscoelasticity, thermoviscoplasticity, thermoelectricity and dynamic fracture ¿            Recovers several standard time-dependent constitutive models as maximum dissipation processes ¿            Produces transport models that predict finite velocity of propagation ¿            Emphasizes applications to the time-dependent modeling of soft biological tissue Maximum Dissipation Non-Equilibrium Thermodynamics and its Geometric Structure will be valuable for researchers, engineers and graduate students in non-equilibrium thermodynamics and the mathematical modeling of material behavior.