Boundary rigidity and filling volume minimality of metrics close to a flat one
成果类型:
Article
署名作者:
Burago, Dmitri; Ivanov, Sergei
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2010.171.1183
发表日期:
2010
页码:
1183-1211
关键词:
asymptotic volume
AREA
MANIFOLDS
distance
SURFACES
SPACES
摘要:
We say that a Riemannian manifold (M, g) with a non-empty boundary partial derivative M is a minimal orientable filling if, for every compact orientable. ((M) over tilde, (g) over tilde) with partial derivative(M) over tilde = partial derivative M, the inequality d((g) over tilde)(x, y) >= d(g)(x, y) for all x, y is an element of partial derivative M implies vol((M) over tilde, (g) over tilde) >= vol(M, g). We show that if a metric g on a region M subset of R-n with a connected boundary is sufficiently C-2-close to a Euclidean one, then it is a minimal filling. By studying the equality case vol((M) over tilde, (g) over tilde) = vol(M, g) we show that if d((g) over tilde)(x, y) = d(g)(x, y) for all x, y is an element of partial derivative M then (M, g) is isometric to ((M) over tilde, (g) over tilde). This gives the first known open class of boundary rigid manifolds in dimensions higher than two and makes a step towards a proof of Michel's conjecture.