Title :
Kernel Conditional Quantile Estimation via Reduction Revisited
Author :
Quadrianto, Novi ; Kersting, Kristian ; Reid, Mark D. ; Caetano, Tibério S. ; Buntine, Wray L.
Author_Institution :
SML, ANU, Canberra, ACT, Australia
Abstract :
Quantile regression refers to the process of estimating the quantiles of a conditional distribution and has many important applications within econometrics and data mining, among other domains. In this paper, we show how to estimate these conditional quantile functions within a Bayes risk minimization framework using a Gaussian process prior. The resulting non-parametric probabilistic model is easy to implement and allows non-crossing quantile functions to be enforced. Moreover, it can directly be used in combination with tools and extensions of standard Gaussian processes such as principled hyperparameter estimation, sparsification, and quantile regression with input-dependent noise rates. No existing approach enjoys all of these desirable properties. Experiments on benchmark datasets show that our method is competitive with state-of-the-art approaches.
Keywords :
Bayes methods; Gaussian processes; data mining; econometrics; estimation theory; regression analysis; Bayes risk minimization; Gaussian process; data mining; econometrics; kernel conditional quantile estimation; quantile regression; Australia; Data mining; Econometrics; Gaussian noise; Gaussian processes; Kernel; Machine learning; Predictive models; Probability distribution; Risk management; Gaussian Processes; Quantile Regression; Regression;
Conference_Titel :
Data Mining, 2009. ICDM '09. Ninth IEEE International Conference on
Conference_Location :
Miami, FL
Print_ISBN :
978-1-4244-5242-2
Electronic_ISBN :
1550-4786
DOI :
10.1109/ICDM.2009.82
