Foundations of the mathematical theory of elasticity – stress in a body point, geometry of position changes, static equilibrium equations, physical equations, duality in a solution procedure of elastomechanic problems, examples solve in a close form.
Foundations of the thermoelasticity – elementary equations for the thermal elasticity, thermal stress.
Potential energy of deformation and reshape work – mechanical work and potential energy, principle of virtual works and classical variety principles, Ritz’s method, method of a structural analysis.
Approximate methods of elasticity problem solutions – finite element method.
Foundations of a plasticity theory
Life cycle of a body loaded during higher temperatures - creep, parametric equations and extrapolations.
Foundations of the thermoelasticity – elementary equations for the thermal elasticity, thermal stress.
Potential energy of deformation and reshape work – mechanical work and potential energy, principle of virtual works and classical variety principles, Ritz’s method, method of a structural analysis.
Approximate methods of elasticity problem solutions – finite element method.
Foundations of a plasticity theory
Life cycle of a body loaded during higher temperatures - creep, parametric equations and extrapolations.