On Uniqueness and Continuous Dependence in the Theory of Micropolar Thermoelastic Mixtures
This paper studies questions of continuous data dependence and uniqueness for solutions of initial boundary value problems in linear micropolar thermoelastic mixtures. Logarithmic convexity arguments are used to establish results with no definiteness assumptions upon the internal energy.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:49546", author = "Catalin Gales and Ionel Dumitrel Ghiba", title = "On Uniqueness and Continuous Dependence in the Theory of Micropolar Thermoelastic Mixtures", abstract = "This paper studies questions of continuous data dependence and uniqueness for solutions of initial boundary value problems in linear micropolar thermoelastic mixtures. Logarithmic convexity arguments are used to establish results with no definiteness assumptions upon the internal energy.
", keywords = "Cellular materials, continuous dependence, micro polar mixtures, uniqueness.", volume = "4", number = "10", pages = "1350-5", }