Abstract: | A variational problem on phase transitions in elastic media with nonhomogeneous boundary conditions is considered. Necessary conditions for a local minimum of the energy functional are established. These conditions are derived in the weak form of some integral identity, as well as in the form of the classical equilibrium equations. In the first case, no additional smoothness of the solution is required, whereas, in the second case, some additional conditions on the smoothness of the replacement field and the boundary of the interface of the phases are imposed. As was shown, even in the case of nonhomogeneous boundary conditions, the boundary of the interface of the phases intersects the boundary of the domain occupied by an elastic medium only at right angles. Bibliography: 3 titles. |