References
- Friedman A. Partial differential equations of parabolic type. Prentice Hall, 1964.
- Uda Y. The critical exponent for a weakly coupled system of the generalized Fujita type reaction-diffusion equations. Z. Angew. Math. Phys. 1995;46:366–383.
- Fujita H. On the blowing up of solutions of Cauchy problem for ut = Δu + u1+α. J. Fac. Sci. Univ. Tokyo Sect. 1966;I(13):109–124.
- Aronson DJ, Weinberger HF. Multidimensional nonlinear diffusion arising in population genetics. Adv. in Math. 1978;30:33–76.
- Deng K, Levine HA. The role of critical exponents in blow-up theorems: the sequel. J. Math. Anal. Appl. 2000;243:85–126.
- Hayakawa K. On nonexistence and nonuniqueness theorems for nonlinear parabolic equations. Proc. Japan Acad. 1973;49:404–424.
- Kobayashi K, Siaro T, Tanaka H. On the blowing up problem for semilinearr heat equations. J. Math. Soc. Japan. 1977;29:407–424.
- Weissler FB. Existence and nonexistence of global solutions for a semilinear heat equation. Israel J. Math. 1981;38:29–40.
- Levine HA. The role of critical exponents in blow up theorems. SIAM Rev. 1990;32:262–288.
- Hu B. Blowup Theoreies for semilinear parabolic equations, lecture notes in mathematics 1022. Berlin: Springer-Verlarg; 2011.
- Quittner P, Souplet P. Superlinear parabolic problems. Global existence and steady states, Birkhäuser, Basel: Blow-up; 2007.
- Samarskii AA, Galakktionove VA, Kurdyumov SP, Mikhailov AP. Blow-up in Quasilinear Parabolic Equations. Berlin-New York: Walter de Gruyter; 1995.
- Bandle C, Levine HA. On the existence and nonexistence of global solutions of reaction-diffusion equations in sectorial domains. Trans. Amer. Math. Soc. 1989;316:595–622.
- Howard A. Levine. Peter Meier, The value of the critical exponent for reaction-diffusion equations in cones, Archive for rational mechanics and analysis. 1989;109:73–80.
- Toshihiko H. Non existence of global solutions of parabolic equation in conical domains. Tsukuba J. Math. 1995;19:15–25.
- Pinsky RG. Existence and nonexistence of global solutions for ut = Δu + a(x)up in ℝd. J. Differntial Equations. 1997;133:152–177.
- Meier P. Existence et non-existence de solutions globales d’une quation de la chaleur semi-linaire: extension d’un thorme de Fujita. (French) [Existence and nonexistence of global solutions of a semilinear heat equation: extension of a theorem of Fujita] C. R. Acad. Sci. Paris Sr. I Math. 303 (1986), 635–637.
- Bandle C. Blow up in exterior domains. Recent advances in nonlinear elliptic and parabolic problems, (Nancy, 1988), 15–C27, Pitman Res. Notes Math. Ser. 208, Longman Sci. Tech., Harlow, 1989.
- Escobedo M, Herrero MA. Boundedness and blow up for a semilinear reaction-diffusion system. J. Differntial Equations. 1991;89:176–202.
- Quirós F, Rossi JD. Blow-up set and Fujita type curve for a degenerate parabolic system wih nonliear boundary conditions. Indiana Univ. Math. J. 2008;50:629–654.
- Zheng SN, Song XF, Jinag ZX. Critical Fujita exponents for degenerate parabolic equations coupled via nonlinear boundary conditions. J. Math. Anal. Appl. 2004;298:308–324.
- Zheng SN, Tian MQ. Critical Fujita exponents for a coupled non-Newtonian filtration system. Adv. Differential Equations. 2010;15:381–400.
- Umeda N. Blow-up and large time behavior of solutions of a weakly coupled system of reaction-diffusion equations. Tsukuba J. Math. 2003;27:31–46.
- Mochizuki K, Huang Q. Existence and behavior of solutions for a weakly coupled system of reaction-diffusion equations. Methods Appl. Anal. 1998;5(2):109–129.
- Umeda N. Existence and nonexistence of global solutions of a weakly coupled system of reaction-diffusion equations. Commun. Appl. Anal. 2006;10:57–78.
- Igarashi T, Umeda N. Nonexistence of global solutions in time for reaction-diffusion systems with inhomogeneous terms in cones. Tsukuba J. Math. 2009;33:131–145.
- Igarashi T, Umeda N. Existence and nonexistence of global solutions in time for a reaction-diffusion system with inhomogeneous terms. Funkcial. Ekvac. 2008;51:17–37.