Минобрнауки России Ministry of Science and Higher Education of the Russian Federation
Federal State Budgetary Scientific Institution
«Institute of Applied Mathematics and Mechanics» (IAMM)
 
 
 


Contacts

Address: Russia DPR 283050, Donetsk, Voroshilovskiy district, Rosa Luxemburg Street, 74

Phone: +7 (856) 311-03-91
Fax: +7 (856) 311-01-75
E-mail:
 

Journals

Nonlinear boundary-value problems
Volume 16 (2006)
  1. Antoniouk A. Val., Antoniouk A. Vict.
     
    Nonlinear estimates approach to the non-lipschitz gap betwe en boundedness and continuity in C-properties of infinite dimensional semigroups
     
  2. Bogomolov Ya.L., Semenov E. S.,Yunakovsky A. D.
     
    Scattering of electromagnetic waves in an accelerating section of a supercollider
     
  3. Borodin M.A.
     
    Two-phase Stefan problem for elliptic and parabolic equations
     
  4. Kasyanov P.O., Mel'nik V.S.
     
    Differential-operator inclusions in Banach spaces with W-pseudomonotone maps
     
  5. Lieberman G.M.
     
    Holder regularity for the gradients of solutions of degenerate parabolic systems
     
  6. Muravnik A.B.
     
    On local blow-up of solutions of quasilinear elliptic and parabolic inequalities
     
  7. Sidorov N.A., Trufanov A.V. and Sidorov D.N.
     
    Generalized solutions of nonlinear integral-functional equations
     
  8. Baranovskiy, E.S.; Zvyagin, V.G.
     
    The construction of the degree of a class of multivalued perturbations of the operators, satisfying to the alpha-condition.
     
  9. Volkov, V.T.; Nefedov, N.N.
     
    Periodic contrast structures in a problem with balanced nonlinea
     
  10. Dzhafarov, R.M.
     
    Solvability of anisotropic nonlinear elliptic problem of the fourth order.
     
  11. Kosmodemvanskii, D.A.
     
    Spectral properties of some problems of the mechanics of strongly nonhomogeneous media
     
  12. Koshelev, A. I.; Narbut, M. A.
     
    Plane problems in non-linear theory of elasticity for hardening
     
  13. Krasnoschok, N.V.
     
    On a moving boundary problem in the theory of elasticity
     
  14. Lopushanska, H.
     
    Boundary traces in C of the solutions of semilinear elliptic equatio
     
  15. Nefedov, N.N.; Nikitin, A.G.
     
    Singularly perturbed integro-differential equations in the case
     
  16. Orlov, V. P.
     
    On a problem of the dynamics of viscoelastic medium with free boundary.
     
  17. Ptashnyk, B.I.; Symotyuk, M.M.
     
    Multi-point problem for perturbed partial differential equatio
     
  18. Pukalsky, I.D.
     
    Boundary value problems for the parabolic equations with degenerations
     
  19. Tovmasyan, N.E.; Babayan, O.A.
     
    An effective solution of Cauchy problem for a class of nonli
     
  20. Shamin R.V.; Druzhinin V.A.
     
    About modeling nonlinear evolutional functional differential equations.