in Ukrainian

Suhorol's'kyj Myhaylo Antonovych

Sientific results:

     The mathematical models for thin-walled stressed solids (homogeneous and layered), that are found under action of local and impulse loading (stress and temperature fields) or local interaction with other solids. In agree with this purpose are developed a mathematical formalism of generalized functions theory; functions describing local perturbation are present delta or delta-like functions.
     Considers:
- dynamic tasks about oscillation of envelope elements with values and expressions;
- contact problems about envelopes interaction with solids through nonlinear elastic layer and envelopes interaction between oneself;
- problems about local envelope heating or thin coverage, drifted on the solids;
- problems about local heating of layered envelope.
     A variant of the boundary elements method and finite elements method has been developed for solving a problems.