In the present paper, we investigate the well-posedness of the global solutionfor the Cauchy problem of generalized long-short wave equations. Applying Kato's methodfor abstract quasi-linear evolution equations and a...In the present paper, we investigate the well-posedness of the global solutionfor the Cauchy problem of generalized long-short wave equations. Applying Kato's methodfor abstract quasi-linear evolution equations and a priori estimates of solution,we get theexistence of globally smooth solution.展开更多
Motivated by the results of J. Y. Chemin in "J. Anal. Math., 77, 1999, 27- 50" and G. Furioli et al in "Revista Mat. Iberoamer., 16, 2002, 605-667", the author considers further regularities of the mild solutions ...Motivated by the results of J. Y. Chemin in "J. Anal. Math., 77, 1999, 27- 50" and G. Furioli et al in "Revista Mat. Iberoamer., 16, 2002, 605-667", the author considers further regularities of the mild solutions to Navier-Stokes equation with initial data uo ∈ L^d(R^d). In particular, it is proved that if u C ∈([0, T^*); L^d(R^d)) is a mild solution of (NSv), then u(t,x)- e^vt△uo ∈ L^∞((0, T);B2/4^1,∞)~∩L^1 ((0, T); B2/4^3 ,∞) for any T 〈 T^*.展开更多
In this paper,we study the Kato's inequality on locally finite graphs.We also study the application of Kato's inequality to Ginzburg-Landau equations on such graphs.Interesting properties of elliptic and parab...In this paper,we study the Kato's inequality on locally finite graphs.We also study the application of Kato's inequality to Ginzburg-Landau equations on such graphs.Interesting properties of elliptic and parabolic equations on the graphs and a Liouville type theorem are also derived.展开更多
文摘In the present paper, we investigate the well-posedness of the global solutionfor the Cauchy problem of generalized long-short wave equations. Applying Kato's methodfor abstract quasi-linear evolution equations and a priori estimates of solution,we get theexistence of globally smooth solution.
基金the National Natural Science Foundation of China(Nos.10525101,10421101)the 973 Project of the Ministry of Science and Technology of China and the innovation grant from Chinese Academy of Sciences.
文摘Motivated by the results of J. Y. Chemin in "J. Anal. Math., 77, 1999, 27- 50" and G. Furioli et al in "Revista Mat. Iberoamer., 16, 2002, 605-667", the author considers further regularities of the mild solutions to Navier-Stokes equation with initial data uo ∈ L^d(R^d). In particular, it is proved that if u C ∈([0, T^*); L^d(R^d)) is a mild solution of (NSv), then u(t,x)- e^vt△uo ∈ L^∞((0, T);B2/4^1,∞)~∩L^1 ((0, T); B2/4^3 ,∞) for any T 〈 T^*.
基金supported by National Natural Science Foundation of China (Grant No.10631020)Doctoral Program Foundation of the Ministry of Education of China (Grant No. 20090002110019)
文摘In this paper,we study the Kato's inequality on locally finite graphs.We also study the application of Kato's inequality to Ginzburg-Landau equations on such graphs.Interesting properties of elliptic and parabolic equations on the graphs and a Liouville type theorem are also derived.
