# Solvability of a nonlinear problem of Kirchhoff shell

@inproceedings{Odisharia1995SolvabilityOA, title={Solvability of a nonlinear problem of Kirchhoff shell}, author={Vladimer Odisharia and Jemal Peradze}, year={1995} }

Conditions of existence and uniqueness of a weak solution are proven for a boundary problem for the Mushtari-Donnell-Vlasov system of equations 1 Statement of the problem Let us consider the system of equations, corresponding to deformation of a sloping shell [1] @N1 @x1 + @T @x2 + p1 = 0; @T @x1 + @N2 @x2 + p2 = 0; @2M1 @x21 + 2 @H @x1@x2 + @2M2 @x22 + k1N1 + k2N2 + @ @x1 N1 @w @x1 + T @w @x2 + @ @x2 T @w @x1 +N2 @w @x2 + q = 0; (1)

## References

SHOWING 1-10 OF 18 REFERENCES

Dierence scheme for the problem of strong bending of a shell

- Proc. Inst. Appl. Math. Tbil. State Univ
- 1991

Diierence scheme for the problem of strong bending of a shell

- Proc. Inst. Appl. Math. Tbil. State Univ
- 1991

Odisharia. Di erence scheme for the problem of strong bending of a shell

- Proc. Inst. Appl. Math. Tbil. State Univ.,
- 1991

Mathematical problems of the nonlinear theory of sloping shells

- Mathematical problems of the nonlinear theory of sloping shells
- 1989

Some usefulness of functional analysis in mathematical physics

- Some usefulness of functional analysis in mathematical physics
- 1988

Dierence scheme for bending of thin plates

- Dierence scheme for bending of thin plates
- 1977

Dierence scheme for the boundary problem on bending of sloping shells, Issled. po prikl

- Dierence scheme for the boundary problem on bending of sloping shells, Issled. po prikl
- 1977

Diierence scheme for bending of thin plates, Zhurn. vichisl. matem. i matem. phis

- Diierence scheme for bending of thin plates, Zhurn. vichisl. matem. i matem. phis
- 1977

Diierence scheme for the boundary problem on bending of sloping shells, Issled. po prikl

- Diierence scheme for the boundary problem on bending of sloping shells, Issled. po prikl
- 1977

Karchevski i. Di erence scheme for bending of thin plates, Zhurn

- vichisl. matem. i matem. phis.,
- 1977