https://orcid.org/0000-0001-5836-6847
References
- John F. Blow-up of solutions of nonlinear wave equations in three space dimensions. Manuscrip Math. 1979;28:235-–268.
- Strauss WA. Nonlinear scattering theory at low energy. J Funct Anal. 1981;41(1):110–133.
- Georgiev V, Lindblad H, Sogge CD. Weighted Strichartz estimates and global existence for semilinear wave equations. Am J Math. 1997;119(6):1291–1319.
- Glassey RT. Finite-time blow-up for solutions of nonlinear wave equations. Math Z. 1981;177:323–340.
- Glassey RT. Existence in the large for utt−Δu=F(u) in two space dimensions. Math Z. 1981;178:233–261.
- Lai N-A, Zhou Y. An elementary proof of Strauss conjecture. J Funct Anal. 2014;267(5):1364–1381.
- Schaeffer J. The equation utt−Δu=|u|p for the critical value of p. Proc R Soc Edinburgh Sec A. 1985;101(1–2):31–44.
- Sideris TC. Nonexistence of global solutions to semilinear wave equations in high dimensions. J Differ Equ. 1984;52(3):378–406.
- Yordanov BT, Zhang Qi S. Finite time blow up for critical wave equations in high dimensions. J Funct Anal. 2006;231(2):361–374.
- Zhou Y. Blow up of solutions to semilinear wave equations with critical exponent in high dimensions. Chin Ann Math. 2007;28B(2):205–212.
- Zhang QS. A new critical behavior for nonlinear wave equations. J Comput Anal Appl. 2000;2(4):277–292.
- Han Y. Integral equations on compact CR manifolds. Discrete Contin Dyn Syst Ser S. 2021;41(5):2187–2204.
- Mohammed A, Rădulescu VD, Vitolo A. Blow-up solutions for fully nonlinear equations: existence, asymptotic estimates and uniqueness. Adv Nonlinear Anal. 2020;9(1):39–64.
- Sasaki T. Convergence of a blow-up curve for a semilinear wave equation. Discrete Contin Dyn Syst Ser S. 2021;14(3):1133–1134.
- Bardos C, Lebeau G, Rauch J. Sharp sufficient conditions for the observation, control, and stabilization of waves from the boundary. SIAM J Control Optim. 1992;30(5):1024–1065.