Selection of a quasisolution of the problem of recovering the balance curve of an alpine glacier

1. S. S. Grigoryan, M. S. Krass, and P. A. Shumskii, “Mathematical models of the basic glacier types,” in:Mechanics of Glaciers [in Russian], Moscow (1977), pp. 3–37.

2. A. N. Salamatin and A. B. Mazo, “A study of a general mathematical model of a cupola-shaped glacier by the methods of similarity theory,”Issled. po Prikl. Mat., No. 10, 139–149.

3. A. N. Salamatin and A. B. Mazo, “Formulation and study of the problem of recovering the bed of a glacier from the profile of its surface,”Mater. Glyatsiol. Issled., No. 52, 99–104 (1985).

   Google Scholar 

4. B. Kamb, “Sliding motion of glaciers: theory and observation,”Rev. Geophys. Space Phys.,8, No. 4, 673–728 (1970).

   Google Scholar 

5. A. B. Mazo and V. A. Chugunov, “Numerical simulation of the isothermic flow of thin films of a nonlinearly viscous fluid,”Model. v Mekh.,2(19), No. 4, 106–115 (1988).

   Google Scholar 

6. A. N. Tikhonov and V. Ya. Arsenin,Solutions of Ill-posed Problems, Halsted Press, New York (1977).

   Google Scholar 

7. A. B. Mazo and G. E. Glazyrin, “Methods of computing the volume of a stationary mountain glacier,”Tr. SANII Goskomgidromet, No. 117(198), 88–98 (1986).

   Google Scholar 

8. A. N. Krenke,Mass Exchange in Glacial Systems on the Territory of the USSR [in Russian], Leningrad (1979).

Download references