Descombes, Stéphane and Moussaoui, Mohand:
Global existence and regularity of solutions for complex Ginzburg-Landau equations
Bollettino dell'Unione Matematica Italiana Serie 8 3-B (2000), fasc. n.1, p. 193-211, Unione Matematica Italiana (English)
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Si considerano equazioni di Ginzburg-Landau complesse del tipo $u_{t}-\alpha\Delta u+ P(|u|^{2})u=0$ in $\mathbb{R}^{N}$ dove $P$ è polinomio di grado $K$ a coefficienti complessi e $\alpha$ è un numero complesso con parte reale positiva $\Re\alpha$. Nell'ipotesi che la parte reale del coefficiente del termine di grado massimo $P$ sia positiva, si dimostra l'esistenza e la regolarità di una soluzione globale nel caso $|\alpha| < C\Re\alpha$, dove $C$ dipende da $K$ e $N$.
Referenze Bibliografiche
[1]
C. R. DOERING-
J. D. GIBBON-
C. D. LEVERMORE,
Weak and strong solutions of the complex Ginzburg-Landau equation,
Physica D,
71 (
1994), n. 3, 285-318. |
MR 1264120 |
Zbl 0810.35119[2]
G. DORE-
A. VENNI,
On the closedness of the sum of two closed operators,
Mathematische Zeitschrift,
195 (
1997), 279-286. |
Zbl 0615.47002[3] S. FAUVE-O. THUAL, Localized structures generated by subcritical instabilities, J. Phys. France, 49 (1988), 1829-1833.
[4]
J. GINIBRE-
G. VELO,
The Cauchy problem in local spaces for the complex Ginzburg-Landau equation. I. Compactness methods,
Physica D,
95 (
1996), no. 3-4, 191-228. |
MR 1406282 |
Zbl 0889.35045[5]
J. GINIBRE-
G. VELO,
The Cauchy problem in local spaces for the complex Ginzburg-Landau equation. II. Contraction methods,
Comm. Math. Phys.,
187 (
1997), no. 1, 45-79. |
MR 1463822 |
Zbl 0889.35046[6]
M. HIBER-
J. PRÜSS,
Heat kernels and maximal $L^{p}$-$L^{q}$ estimates for parabolic evolution equations,
Comm. Partial Differential Equations,
22 (
1997), no. 9-10, 1647-1669. |
MR 1469585 |
Zbl 0886.35030[7]
O. A. LADYZHENSKAYA-
V. A. SOLONNIKOV-
N. N. URAL'TSEVA,
Linear and quasilinear equations of parabolic type,
Nauka, Moscou, (
1967); English transl.
Amer. Math. Soc. Providence, RI (
1968). |
Zbl 0174.15403[8]
P. DE MOTTONI-
M. SCHATZMAN,
Geometrical evolution of developed interfaces,
Transactions of the American Mathematical Society, Volume
347, Number 5 (
1995), 1533-1589. |
MR 1672406 |
Zbl 0840.35010[9]
J. PRÜSS-
H. SOHR,
On operators with bounded imaginary powers in Banach spaces,
Mathematische Zeitschrift,
203 (
1990), 429-452. |
MR 1038710 |
Zbl 0665.47015[11]
R. SEELEY,
Norms and domains of the complex powers $A^{z}_{B}$,
Am. Jour. Math.,
93 (
1971), 299-309. |
MR 287376 |
Zbl 0218.35034[12]
H. TRIBEL,
Interpolation Theory, Function Spaces, Differential Operators,
North Holland, Amterdam, New York, Oxford (
1978). |
Zbl 0387.46032
Con il contributo del Ministero per i Beni e le Attività Culturali