BACKWARD NESTED DESCRIPTORS ASYMPTOTICS WITH INFERENCE ON STEM CELL DIFFERENTIATION
成果类型:
Article
署名作者:
Huckemann, Stephan F.; Eltzner, Benjamin
署名单位:
University of Gottingen
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/17-AOS1609
发表日期:
2018
页码:
1994-2019
关键词:
extrinsic sample means
RIEMANNIAN-MANIFOLDS
principal
uniqueness
location
locus
摘要:
For sequences of random backward nested subspaces as occur, say, in dimension reduction for manifold or stratified space valued data, asymptotic results are derived. In fact, we formulate our results more generally for backward nested families of descriptors (BNFD). Under rather general conditions, asymptotic strong consistency holds. Under additional, still rather general hypotheses, among them existence of a.s. local twice differentiable charts, asymptotic joint normality of a BNFD can be shown. If charts factor suitably, this leads to individual asymptotic normality for the last element, a principal nested mean or a principal nested geodesic, say. It turns out that these results pertain to principal nested spheres (PNS) and principal nested great subsphere (PNGS) analysis by Jung, Dryden and Marron [Biometrika 99 (2012) 551-568] as well as to the intrinsic mean on a first geodesic principal component (IMolGPC) for manifolds and Kendall's shape spaces. A nested bootstrap two-sample test is derived and illustrated with simulations. In a study on real data, PNGS is applied to track early human mesenchymal stem cell differentiation over a coarse time grid and, among others, to locate a change point with direct consequences for the design of further studies.