RUS  ENG
Full version
JOURNALS // Sibirskii Matematicheskii Zhurnal
Sibirsk. Mat. Zh., 1997, Volume 38, Number 1, Pages 109–124 (Mi smj428)
Increasing the smoothness of solutions of some hyperbolic problems
M. M. Lavrent'ev (Jn.), N. A. Lyul'ko

This publication is cited in the following articles:
  1. Kmit I., Lyul'ko N., “Perturbations of Superstable Linear Hyperbolic Systems”, J. Math. Anal. Appl., 460:2 (2018), 838–862  crossref  mathscinet  zmath  isi  scopus
  2. I. Kmit, Pseudo-Differential Operators, Generalized Functions and Asymptotics, 2013, 219  crossref
  3. Kmit I., “Smoothing solutions to initial-boundary problems for first-order hyperbolic systems”, Appl Anal, 90:11 (2011), 1609–1634  crossref  mathscinet  zmath  isi  elib  scopus
  4. N. Yu. Selivanova, M. V. Shamolin, “Lokalnaya razreshimost odnoi zadachi so svobodnoi granitsei”, Vestn. SamGU. Estestvennonauchn. ser., 2011, no. 8(89), 86–94  mathnet
  5. N. A. Lyul'ko, “The increasing smoothness property of solutions to some hyperbolic problems in two independent variables”, Sib. elektron. matem. izv., 7 (2010), 413–424  mathnet  elib
  6. N. A. Lyul'ko, “Increasing smoothness of solutions to a hyperbolic system on the plane with delay in the boundary conditions”, Siberian Math. J., 49:6 (2008), 1062–1077  mathnet  crossref  mathscinet  isi  elib
  7. Mendziv M.V., Romanovskii R.K., “Direct Lyapunov method for hyperbolic systems on the plane with time–periodic coefficients”, Differential Equations, 44:2 (2008), 267–273  crossref  mathscinet  zmath  isi  elib  scopus
  8. O. G. Zhukova, R. K. Romanovskii, “Dvustoronnee granichnoe upravlenie protsessom teploperenosa v odnomernom materiale. Giperbolicheskaya model”, Sib. zhurn. industr. matem., 10:4 (2007), 32–40  mathnet  mathscinet
  9. R. K. Romanovskii, M. V. Mendziv, “Stability of solutions to the Cauchy problem for a plane hyperbolic system with time-periodic coefficients”, Siberian Math. J., 48:5 (2007), 913–918  mathnet  crossref  mathscinet  zmath  isi  elib  elib
  10. I. D. Makarova, “$W_2^1$-ustoichivost resheniya smeshannoi zadachi dlya pochti lineinoi giperbolicheskoi sistemy na ploskosti”, Trudy chetvertoi Vserossiiskoi nauchnoi konferentsii s mezhdunarodnym uchastiem (29–31 maya 2007 g.). Chast 3, Differentsialnye uravneniya i kraevye zadachi, Matem. modelirovanie i kraev. zadachi, SamGTU, Samara, 2007, 132–135  mathnet
  11. R. K. Romanovskii, E. N. Stratilatova, “Reshenie odnomernoi odnofaznoi giperbolicheskoi zadachi Stefana metodom granichnykh integralnykh uravnenii”, Sib. zhurn. industr. matem., 7:3 (2004), 119–131  mathnet  mathscinet  zmath
  12. R. K. Romanovskii, E. V. Vorobeva, I. D. Makarova, “Ob ustoichivosti reshenii smeshannoi zadachi dlya pochti lineinoi giperbolicheskoi sistemy na ploskosti”, Sib. zhurn. industr. matem., 6:1 (2003), 118–124  mathnet  mathscinet  zmath
  13. Akramov T.A., Belonosov V.S., Zelenyak T.I., Lavrent'ev M.M., Slin'ko M.G., Sheplev V.S., “Mathematical foundations of modeling of catalytic processes: A review”, Theoretical Foundations of Chemical Engineering, 34:3 (2000), 263–273  crossref  isi  scopus

© Steklov Math. Inst. of RAS, 2026