Rybalov J V

Publications in Math-Net.Ru

1. Interior and exterior Neumann problems for a degenerate elliptic equation in divergence form
   
   Dokl. Akad. Nauk SSSR, 302:1 (1988),  24–27
2. The Neumann problem for a degenerate elliptic equation in divergence form
   
   Differ. Uravn., 24:12 (1988),  2134–2143
3. The exterior Neumann problem for an elliptic equation that is degenerate at infinity
   
   Differ. Uravn., 24:11 (1988),  1955–1967
4. A problem with an integral condition for an elliptic equation with strong degeneration on the whole boundary
   
   Trudy Mat. Inst. Steklov., 180 (1987),  190–192
5. The discreteness of the spectrum of the first boundary value problem for a nonregular elliptic equation
   
   Differ. Uravn., 20:9 (1984),  1602–1611
6. Boundary value problems of the first kind for elliptic equations that degenerate on the entire boundary of the domain
   
   Differ. Uravn., 19:11 (1983),  1937–1948
7. Boundary value problems in a half space with a boundary condition at a point
   
   Differ. Uravn., 19:5 (1983),  834–845
8. Boundary value problems in the whole space
   
   Differ. Uravn., 18:4 (1982),  645–656
9. Sobolev imbeddings of the weighted closure of the functions of compact support
   
   Differ. Uravn., 18:3 (1982),  466–476
10. A boundary value problem in a half-space with a boundary condition at infinity
    
    Differ. Uravn., 15:12 (1979),  2193–2204
11. The traces of functions of weight classes, defined on a half-space
    
    Sibirsk. Mat. Zh., 20:3 (1979),  610–623
12. Completely continuous imbeddings in weighted classes of functions, and conditions for discreteness of the spectrum of a nonregular elliptic operator
    
    Differ. Uravn., 13:3 (1977),  516–528
13. Estimation of the derivative of a function in terms of derivatives of higher order; application to the solvability of the first homogeneous boundary value problem for a linear nonregular elliptic equation
    
    Differ. Uravn., 11:9 (1975),  1664–1677
14. The mutual imbedding of a weighted closure of the compactly supported functions and a weighted Sobolev space of functions with zero values on the boundary of the domain
    
    Differ. Uravn., 11:8 (1975),  1437–1452
15. On imbedding theorems for a natural extension of the sobolev class $W^l_p(\Omega)$
    
    Izv. Akad. Nauk SSSR Ser. Mat., 34:1 (1970),  145–155
16. Imbedding theorems for functions which are defined in unbounded regions, and their application to the spectral theory of elliptic selfadjoint operators
    
    Dokl. Akad. Nauk SSSR, 184:5 (1969),  1041–1043