Bent-Cable Regression Theory and Applications

We use the so-called “bent-cable” model to describe natural phenomena that exhibit a potentially sharp change in slope. The model comprises two linear segments, joined smoothly by a quadratic bend. The class of bent cables includes, as a limiting case, the popular piecewise-linear model (with a sharp kink), otherwise known as the broken stick. Associated with bent-cable regression is the estimation of the bend-width parameter, through which the abruptness of the underlying transition may be assessed. We present worked examples and simulations to demonstrate the regularity and irregularity of bent-cable regression encountered in finite-sample settings. We also extend existing bent-cable asymptotics that previously were limited to the basic model with known linear slopes of 0 and 1. Practical conditions on the design are given to ensure regularity of the full bent-cable estimation problem if the underlying bend segment has nonzero width. Under such conditions, the least-squares estimators are shown to be consistent and to asymptotically follow a multivariate normal distribution. Furthermore, the deviance statistic (or the likelihood ratio statistic, if the random errors are normally distributed) is shown to have an asymptotic chi-squared distribution.

[1]  D. Hinkley Inference about the intersection in two-phase regression , 1969 .

[2]  Leland Wilkinson,et al.  TRANSMUTING' WOMEN INTO MEN: GALTON'S FAMILY DATA ON HUMAN STATURE , 2005 .

[3]  Charles C. Brown Approaches to Intraspecies Dose Extrapolation , 1987 .

[4]  Using time lags in estimating anaerobic threshold , 1991 .

[5]  Bruce Cumings,et al.  A short review , 1983 .

[6]  A. Ronald Gallant,et al.  Inference for nonlinear models , 1975 .

[7]  J. H. Schuenemeyer,et al.  Generalized Linear Models (2nd ed.) , 1992 .

[8]  David W. Bacon,et al.  Estimating the transition between two intersecting straight lines , 1971 .

[9]  R. Juchems,et al.  Blood lactate response to exercise. , 1968, The New England journal of medicine.

[10]  V. Wigglesworth The Principles of Insect Physiology , 1940 .

[11]  P. D. di Prampero,et al.  The concept of lactate threshold. A short review. , 1995, The Journal of sports medicine and physical fitness.

[12]  G. Gaesser,et al.  Catecholamine and blood lactate responses to incremental rowing and running exercise. , 1994, Journal of applied physiology.

[13]  Andrew L. Rukhin,et al.  Change-Point Estimation as a Nonlinear Regression Problem , 1997 .

[14]  Ransom A. Myers,et al.  Still more spawner-recruitment curves: the hockey stick and its generalizations , 2000 .

[15]  Grace S. Chiu Bent-Cable Regression for Assessing Abruptness of Change , 2002 .

[16]  A. Ivanov Asymptotic Theory of Nonlinear Regression , 1996 .

[17]  P. McCullagh,et al.  Generalized Linear Models, 2nd Edn. , 1990 .

[18]  A. Tishler,et al.  A New Maximum Likelihood Algorithm for Piecewise Regression , 1981 .

[19]  Relationships between otolith microstructure, otolith growth, somatic growth, and ontogenetic transitions in two cohorts of windowpane , 2001 .

[20]  D R Bassett,et al.  Validity of the heart rate deflection point as a predictor of lactate threshold during running. , 1999, Journal of applied physiology.

[21]  P. McCullagh,et al.  Generalized Linear Models , 1992 .

[22]  F. Baranyovits The Principles of Insect Physiology, 7th Edition, V.S. Wigglesworth. Chapman & Hall, Berlin (1982), 827, Paperback £15.0 , 1983 .

[23]  Leland Wilkinson,et al.  Galton's Bend , 2003 .

[24]  K. A. Kline Metabolic effects of incremental exercise on Arabian horses fed diets containing corn oil and soy lecithin , 1997 .

[25]  Leland Wilkinson,et al.  Galton's Bend: An Undiscovered Nonlinearity in Galton's Family Stature Regression Data and a Likely Explanation Based on Pearson and Lee's Stature Data , 2003 .

[26]  A. Weltman,et al.  The blood lactate response to exercise , 1995 .

[27]  W L Beaver,et al.  Improved detection of lactate threshold during exercise using a log-log transformation. , 1985, Journal of applied physiology.

[28]  L. Lecam On the Assumptions Used to Prove Asymptotic Normality of Maximum Likelihood Estimates , 1970 .

[29]  Limit theorems for a class of tests of gradual changes , 2000 .

[30]  Change-point estimator in continuous quadratic regression , 2001 .

[31]  R. Mazzeo,et al.  Effect of mild dehydration on the lactate threshold in women. , 2000, Medicine and science in sports and exercise.

[32]  T. McLellan,et al.  Plasma catecholamine and blood lactate responses to incremental arm and leg exercise. , 2000, Medicine and science in sports and exercise.

[33]  D. Hinkley Inference in Two-Phase Regression , 1971 .

[34]  Grace S. Chiu,et al.  Bent-cable asymptotics when the bend is missing , 2002 .

[35]  Determination of anaerobic threshold: What anaerobic threshold? , 1991 .

[36]  Ing Rj Ser Approximation Theorems of Mathematical Statistics , 1980 .

[37]  A. Gallant The theory of nonlinear regression as it relates to segmented polynomial regressions with estimated join points , 1974 .

[38]  Sanford Weisberg,et al.  Confidence Curves in Nonlinear Regression , 1990 .

[39]  D. Pollard Another Look at Differentiability in Quadratic Mean , 1997 .

[40]  P. Feder On Asymptotic Distribution Theory in Segmented Regression Problems-- Identified Case , 1975 .

[41]  Grace S. Chiu,et al.  Asymptotic Theory for Bent-Cable Regression | the Basic Case , 2005 .

[42]  D. Jarušková Testing appearance of linear trend , 1998 .