Abstract
The equations of motion and the constitutive relations are derived for the theory of micropolar generalized two-temperature thermoelasticity. An equation of energy balance, including the strain energy function, is deduced and the uniqueness theorem for the case of anisotropic solid is proved by the aid of the energy equation. The formulation is applied to a thermal shock half-space problem, to study the effect of two-temperature influence on the distribution of relevant variables.