Global Schrodinger maps in dimensions d ≥ 2: Small data in the critical Sobolev spaces
成果类型:
Article
署名作者:
Bejenaru, I.; Ionescu, A. D.; Kenig, C. E.; Tataru, D.
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2011.173.3.5
发表日期:
2011
页码:
1443-1506
关键词:
wave maps
well-posedness
cauchy-problem
REGULARITY
EXISTENCE
uniqueness
SCATTERING
equation
energy
SYSTEM
摘要:
We consider the Schrodinger map initial-value problem {partial derivative t phi - phi x Delta phi on R-d x R, phi(0) = phi(0) where phi: Rd x R -> R-2 hooked right arrow R-3 is a smooth function. In all dimensions d >= 2, we prove that the Schrodinger map initial-value problem admits a unique global smooth solution phi is an element of C (R : H-Q(infinity)), Q is an element of S-2 Q), Q 2 S 2, provided that the data phi(0) is an element of H-Q(infinity) is smooth and satisfies the smallness condition vertical bar vertical bar phi(0) - Q vertical bar vertical bar(Hd/2) << 1. We prove also that the solution operator extends continuously to the space of data in Hd/2 boolean AND H-Q(d/2-1) with small H-d/2 norm.