🌙

半参数广义线性模型中的自适应贝叶斯回归样条

Adaptive Bayesian Regression Splines in Semiparametric Generalized Linear Models

Journal of Computational and Graphical Statistics · 2000
被引 51
ABS 3

中文导读

提出一种全贝叶斯方法,在广义半参数模型中自动选择样条节点位置和数量,同时估计基系数,适用于非高斯响应数据的曲线估计和信用评分等问题。

Abstract

Abstract This article presents a fully Bayesian approach to regression splines with automatic knot selection in generalized semiparametric models for fundamentally non-Gaussian responses. In a basis function representation of the regression spline we use a B-spline basis. The reversible jump Markov chain Monte Carlo method allows for simultaneous estimation both of the number of knots and the knot placement, together with the unknown basis coefficients determining the shape of the spline. Since the spline can be represented as design matrix times unknown (basis) coefficients, it is straightforward to include additionally a vector of covariates with fixed effects, yielding a semiparametric model. The method is illustrated with datasets from the literature for curve estimation in generalized linear models, the Tokyo rainfall data, and the coal mining disaster data, and by a credit-scoring problem for generalized semiparametric models.

贝叶斯统计半参数回归样条方法马尔可夫链蒙特卡洛