Cheshkova Mira Artemovna

Publications in Math-Net.Ru

1. Windings of tori and models of the projective plane
   
   Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 181 (2020),  118–120
2. Construction of geodesics circle for surfaces of revolution of constant Gaussian curvature
   
   Sib. J. Pure and Appl. Math., 18:3 (2018),  64–74
3. Congruences of Hypersheres
   
   Mat. Tr., 9:1 (2006),  169–175
4. On Pairs of Hypersurfaces in Euclidean Space
   
   Mat. Zametki, 75:3 (2004),  474–475
5. Geometry of a Doubly Canal Hypersurface in the Euclidean Space $\mathbb E^n$
   
   Mat. Tr., 6:1 (2003),  169–181
6. Molding hypersurfaces in Euclidean space
   
   Izv. Vyssh. Uchebn. Zaved. Mat., 2001, no. 3,  73–74
7. Evolute Surfaces in $E^4$
   
   Mat. Zametki, 70:6 (2001),  951–953
8. Conformal Mapping of Orthogonal Surfaces in $E^{2n}$
   
   Mat. Zametki, 70:5 (2001),  798–800
9. Double canal hypersurfaces in the Euclidean space $E^n$
   
   Mat. Sb., 191:6 (2000),  155–160
10. On the geometry of the central projection of an $n$-surface in the Euclidean space $E^{n+m}$
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1998, no. 6,  96–98
11. On a property of orthogonal surfaces
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1998, no. 3,  63–64
12. The Bianchi transformation of $n$-surfaces in $E^{2n-1}$
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1997, no. 9,  71–74
13. On a torse-forming vector field
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1997, no. 1,  66–68
14. On geometry of a pair of orthogonal $n$-surfaces in $E_{2n}$
    
    Sibirsk. Mat. Zh., 36:1 (1995),  228–232
15. Connections associated with the Codazzi tensor field
    
    Tr. Geom. Semin., 22 (1994),  89–90
16. Hypersurfaces found in the Peterson correspondence
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1993, no. 10,  69–72
17. Geometry of a vector field on a Riemannian manifold
    
    Mat. Zametki, 54:5 (1993),  153–155
18. On the geometry of a normalized surface
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1991, no. 9,  67–68
19. A deformation algebra that is associated with a Codazzi field
    
    Sibirsk. Mat. Zh., 31:5 (1990),  190–193
20. On the geometry of the manifold $M_{n-1}$ ($L_{n-1}$) in $A_n$
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1972, no. 1,  94–101
21. The manifold $M_{n-1}$ ($L_{n-1}$) in the $n$-dimensional equiaffine space $E_n$
    
    Izv. Vyssh. Uchebn. Zaved. Mat., 1969, no. 7,  96–100