Optimal Function-on-Scalar Regression over Complex Domains
作者: Bharath Sriperumbudur , Matthew Reimherr , Hyun Bin Kang
DOI:
关键词: Estimator 、 Applied mathematics 、 Mathematics 、 Hilbert space 、 Minimax 、 Riemannian manifold 、 Scalar (mathematics) 、 Sobolev space 、 Reproducing kernel Hilbert space 、 Partial differential equation
摘要: In this work we consider the problem of estimating function-on-scalar regression models when functions are observed over multi-dimensional or manifold domains and with potentially multivariate output. We establish minimax rates convergence present an estimator based on reproducing kernel Hilbert spaces that achieves rate. To better interpret derived rates, extend well-known links between RKHS Sobolev to case where domain is a compact Riemannian manifold. This accomplished using interesting connection Weyl's Law from partial differential equations. conclude numerical study application 3D facial imaging.
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arxiv.org参考文章(14)
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