• NAM, ILL-HYEON (Dept. of Mathematics, Chonnam National University) ;
  • JU, HYEONG-KWAN (Dept. of Mathematics Education, Chonnam National University) ;
  • KIM, IHN-SUE (Dept. of Mathematics Education, Chonnam National University)
  • Received : 1995.05.11
  • Published : 1995.07.30




Supported by : Korea Research Foundation


  1. J. of Differential Equations v.55 Single point blow-up for a semilinear initial value problem Weissler, F.B.
  2. Appl. Math. Soc. v.83 Mathematical Problems from Combusion Theory Bebernes, J.;Eberly, D.
  3. Indiana Univ. Math. J. v.39 no.4 On the asymptotic shape of blow-up Bressan, A.
  4. J. Fac. Sci. Univ. Tokyo Sect. IA, Math. v.34 A Single Point Blow-up for Solutions of Semilinear Parabolic Systems Friedman, A.;Giga, Y.
  5. Indiana Univ. Math. J. v.34 Blow-up of positive solutions of semilinear heat equations Friedman, A.;McLeod, B.
  6. Comm. on Pure and Applied Math. v.38 Asymptotically self-similar blow-up of semilinear heat equations Giga, Y.;Kohn, R.
  7. J. of Differential Equations v.77 The blow-up rate of solutaions of semilinear heat equations Liu, W.
  8. Differential and Integral Inequalities Vol. I Lakshmikantham, V.;Leela, S.
  9. Systems of Nonlinear Partial Differential Equations Leung, A.W.
  10. SIAM Rev. v.32 The role of critical exponents in blow-up theorems Levine, H.A.
  11. J. of Differential Equations v.104 Non-existence of global solutions to systems of semilinear parabolic equations Gang, L.;Sleeman, B.D.
  12. Shock Wave and Reaction-Diffusion Equations Smoller, J.