论文信息 - Computing a family of reproducing kernels for statistical applications

Computing a family of reproducing kernels for statistical applications

For an open subset Ω of ℝ, an integer,m, and a positive real parameter τ, the Sobolev spacesHm (Ω) equipped with the norms: ∥u∥2=∫u(t)2dt+(1/τ2m∫u(m)(t)2 constitute a family of reproducing kernel Hilbert spaces. When Ω is an open interval of the real line, we describe the computation of their reproducing kernels. We derive explicit formulas for these kernels for all values ofm in the case of the whole real line, and form=1 andm=2 in the case of a bounded open interval.

Christine Thomas-Agnan | C. Thomas-Agnan

[1] G. Wahba,et al. Some New Mathematical Methods for Variational Objective Analysis Using Splines and Cross Validation , 1980 .

[2] H. Weinert. Reproducing kernel Hilbert spaces: Applications in statistical signal processing , 1982 .

[3] N. Aronszajn. Theory of Reproducing Kernels. , 1950 .

[4] Christine Thomas-Agnan. Spline Functions and Stochastic Filtering , 1991 .

[5] S. Agmon. Lectures on Elliptic Boundary Value Problems , 1965 .

[6] B. Silverman,et al. Spline Smoothing: The Equivalent Variable Kernel Method , 1984 .

[7] Marc Duc-Jacquet,et al. Approximation des fonctionnelles linéaires sur les espaces Hilbertiens autoreproduisants , 1973 .

[8] Christine Thomas-Agnan,et al. Functional estimation under shape constraints , 1996 .