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The Curve Fitting Problem: A Solution1
British Journal for the Philosophy of Science 41 (4):509-530 (1990)
Abstract
Much of scientific inference involves fitting numerical data with a curve, or functional relation. The received view is that the fittest curve is the curve which best balances the conflicting demands of simplicity and accuracy, where simplicity is measured by the number ofparameters in the curve. The problem with this view is that there is no commonly accepted justification for desiring simplicity.This paper presents a measure of the stability of equations. It is argued that the fittest curve is the curve which best balances stability and accuracy. The received view is defended with a proof that simplicity corresponds to stability, for linear regression equations.My notes
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Citations of this work
How to Tell When Simpler, More Unified, or Less A d Hoc Theories Will Provide More Accurate Predictions.Malcolm R. Forster & Elliott Sober - 1994 - British Journal for the Philosophy of Science 45 (1):1-35.
The Curve Fitting Problem: A Bayesian Approach.Prasanta S. Bandyopadhayay, Robert J. Boik & Susan Vineberg - 1996 - Philosophy of Science 63 (S3):S264-S272.
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