Estimating a Function and Its Derivatives Under a Smoothness Condition
成果类型:
Article
署名作者:
Lim, Eunji
署名单位:
Adelphi University
刊物名称:
MATHEMATICS OF OPERATIONS RESEARCH
ISSN/ISSBN:
0364-765X
DOI:
10.1287/moor.2020.0161
发表日期:
2025
关键词:
smoothing noisy data
least-squares
spline functions
regression
CONVERGENCE
rates
interpolation
asymptotics
Consistency
BEHAVIOR
摘要:
We consider the problem of estimating an unknown function f & lowast; : Rd d -> R and its partial derivatives from a noisy data set of n observations, where we make no assumptions about f & lowast; except that it is smooth in the sense that it has square integrable partial derivatives of order m . A natural candidate for the estimator of f & lowast; in such a case is the best fit to the data set that satisfies a certain smoothness condition. This estimator can be seen as a least squares estimator subject to an upper bound on some measure of smoothness. Another useful estimator is the one that minimizes the degree of smoothness subject to an upper bound on the average of squared errors. We prove that these two estimators are computable as solutions to quadratic programs, establish the consistency of these estimators and their partial derivatives, and study the convergence rate as n -> infinity . The effectiveness of the estimators is illustrated numerically in a setting where the value of a stock option and its second derivative are estimated as functions of the underlying stock price.