CURVATURE INVARIANTS, DIFFERENTIAL-OPERATORS AND LOCAL HOMOGENEITY

Authors
PRUFER F TRICERRI F VANHECKE L
Citation
F. Prufer et al., CURVATURE INVARIANTS, DIFFERENTIAL-OPERATORS AND LOCAL HOMOGENEITY, Transactions of the American Mathematical Society, 348(11), 1996, pp. 4643-4652
Citations number
24
Categorie Soggetti
Mathematics, General",Mathematics
Journal title
Transactions of the American Mathematical SocietyACNP
ISSN journal
00029947
Volume
348
Issue
11
Year of publication
1996
Pages
4643 - 4652
Database
ISI
SICI code
0002-9947(1996)348:11<4643:CIDALH>2.0.ZU;2-C
Abstract
We first prove that a Riemannian manifold (M, g) with globally constan t additive Weyl invariants is locally homogeneous. Then we use this re sult to show that a manifold (M, g) whose Laplacian commutes with all invariant differential operators is a locally homogeneous space.