Interpolation of Random Hyperplanes
| Dublin Core | PKP Metadata Items | Metadata for this Document | |
| 1. | Title | Title of document | Interpolation of Random Hyperplanes |
| 2. | Creator | Author's name, affiliation, country | Ery Arias-Castro; University of California, San Diego |
| 3. | Subject | Discipline(s) | |
| 3. | Subject | Keyword(s) | Grassmann Manifold; Haar Measure; Pattern Recognition; Kolmogorov Entropy |
| 3. | Subject | Subject classification | 60D05; 62G10 |
| 4. | Description | Abstract | Let $\{(Z_i,W_i):i=1,\dots,n\}$ be uniformly distributed in $[0,1]^d \times \mathbb{G}(k,d)$, where $\mathbb{G}(k,d)$ denotes the space of $k$-dimensional linear subspaces of $\mathbb{R}^d$. For a differentiable function $f: [0,1]^k \rightarrow [0,1]^d$, we say that $f$ interpolates $(z,w) \in [0,1]^d \times \mathbb{G}(k,d)$ if there exists $x \in [0,1]^k$ such that $f(x) = z$ and $\vec{f}(x) = w$, where $\vec{f}(x)$ denotes the tangent space at $x$ defined by $f$. For a smoothness class ${\cal F}$ of Holder type, we obtain probability bounds on the maximum number of points a function $f \in {\cal F}$ interpolates. |
| 5. | Publisher | Organizing agency, location | |
| 6. | Contributor | Sponsor(s) | NSF grant DMS-0603890 and the Mathematical Sciences Research Institute |
| 7. | Date | (YYYY-MM-DD) | 2007-08-15 |
| 8. | Type | Status & genre | Peer-reviewed Article |
| 8. | Type | Type | |
| 9. | Format | File format | |
| 10. | Identifier | Uniform Resource Identifier | http://ejp.ejpecp.org/article/view/435 |
| 10. | Identifier | Digital Object Identifier | 10.1214/EJP.v12-435 |
| 11. | Source | Journal/conference title; vol., no. (year) | Electronic Journal of Probability; Vol 12 |
| 12. | Language | English=en | |
| 14. | Coverage | Geo-spatial location, chronological period, research sample (gender, age, etc.) | |
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