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Minimax Risk Inequalities for the Location–Parameter Classification Problem
- Source :
- Journal of Multivariate Analysis. 66(2):255-269
- Publication Year :
- 1998
- Publisher :
- Elsevier BV, 1998.
-
Abstract
- Minimax risk inequalities are obtained for the location-parameter classification problem. For the classical single observation case with continuous distributions, best possible bounds are given in terms of their Lévy concentration, establishing a conjecture of Hill and Tong (1989). In addition, sharp bounds for the minimax risk are derived for the multiple (i.i.d.) observations case, based on the tail concentration and the Lévy concentration. Some fairly sharp bounds for discontinuous distributions are also obtained.
- Subjects :
- convexity theorem
Statistics and Probability
Numerical Analysis
Conjecture
Location parameter
Inequality
media_common.quotation_subject
partition range
Minimax
Lévy process
Combinatorics
tail concentration
classification
Continuous distributions
Optimal-partitioning
concentration function
minimax risk
Applied mathematics
Statistics, Probability and Uncertainty
Concentration function
Mathematics
media_common
Subjects
Details
- ISSN :
- 0047259X
- Volume :
- 66
- Issue :
- 2
- Database :
- OpenAIRE
- Journal :
- Journal of Multivariate Analysis
- Accession number :
- edsair.doi.dedup.....cf24e7df46237889af5eaad9c5200f5b
- Full Text :
- https://doi.org/10.1006/jmva.1998.1748