论文信息 - The Falling Factorial Basis and Its Statistical Applications

The Falling Factorial Basis and Its Statistical Applications

We study a novel spline-like basis, which we name the falling factorial basis, bearing many similarities to the classic truncated power basis. The advantage of the falling factorial basis is that it enables rapid, linear-time computations in basis matrix multiplication and basis matrix inversion. The falling factorial functions are not actually splines, but are close enough to splines that they provably retain some of the favorable properties of the latter functions. We examine their application in two problems: trend filtering over arbitrary input points, and a higher-order variant of the two-sample Kolmogorov-Smirnov test.

[1] Bernhard Schölkopf,et al. A Kernel Two-Sample Test , 2012, J. Mach. Learn. Res..

[2] M. Nussbaum. Spline Smoothing in Regression Models and Asymptotic Efficiency in $L_2$ , 1985 .

[3] David L. Donoho,et al. WaveLab and Reproducible Research , 1995 .

[4] C. R. Deboor,et al. A practical guide to splines , 1978 .

[5] R. Tibshirani. Adaptive piecewise polynomial estimation via trend filtering , 2013, 1304.2986.

[6] Philippe Barbe,et al. Limiting distribution of the maximal spacing when the density function admits a positive minimum , 1992 .

[7] F. Wilcoxon. Individual Comparisons by Ranking Methods , 1945 .

[8] Stephen P. Boyd,et al. 1 Trend Filtering , 2009, SIAM Rev..

[9] M. Stephens,et al. K-Sample Anderson–Darling Tests , 1987 .

[10] S. Geer,et al. Locally adaptive regression splines , 1997 .

[11] G. Wahba. Spline models for observational data , 1990 .

[12] D. Darling,et al. A Test of Goodness of Fit , 1954 .