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Graham, Bryan S. [Author]; Niu, Fengshi [Author]; Powell, James [Author] ; National Bureau of Economic Research

Minimax Risk and Uniform Convergence Rates for Nonparametric Dyadic Regression

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  • Media type: E-Book
  • Title: Minimax Risk and Uniform Convergence Rates for Nonparametric Dyadic Regression
  • Contributor: Graham, Bryan S. [VerfasserIn]; Niu, Fengshi [VerfasserIn]; Powell, James [VerfasserIn]
  • Corporation: National Bureau of Economic Research
  • imprint: Cambridge, Mass: National Bureau of Economic Research, 2021
  • Published in: NBER working paper series ; no. w28548
  • Extent: 1 Online-Ressource; illustrations (black and white)
  • Language: English
  • DOI: 10.3386/w28548
  • Identifier:
  • Keywords: Nichtparametrisches Verfahren ; Regressionsanalyse ; Entscheidung unter Unsicherheit ; Schätztheorie ; Arbeitspapier ; Graue Literatur
  • Reproduction note: Hardcopy version available to institutional subscribers
  • Origination:
  • Footnote: System requirements: Adobe [Acrobat] Reader required for PDF files
    Mode of access: World Wide Web
  • Description: We study nonparametric regression in a setting where N(N-1) dyadic outcomes are observed for N randomly sampled units. Outcomes across dyads sharing a unit in common may be dependent (i.e., our dataset exhibits dyadic dependence). We present two sets of results. First, we calculate lower bounds on the minimax risk for estimating the regression function at (i) a point and (ii) under the infinity norm. Second, we calculate (i) pointwise and (ii) uniform convergence rates for the dyadic analog of the familiar Nadaraya-Watson (NW) kernel regression estimator. We show that the NW kernel regression estimator achieves the optimal rates suggested by our risk bounds when an appropriate bandwidth sequence is chosen. This optimal rate differs from the one available under iid data: the effective sample size is smaller and dimension of the regressor vector influences the rate differently
  • Access State: Open Access