Isotonic regression

In numerical analysis, isotonic regression (IR) involves finding a weighted least-squares fit $x\in \Bbb{R}^n$ to a vector $a\in \Bbb{R}^n$ with weights vector $w\in \Bbb{R}^n$ subject to a set of monotonicity constraints giving a simple or partial order over the variables. The monotonicity constraints define a directed acyclic graph $G = (C, P)$ over the nodes $N={1,2,\ldots,n}$ corresponding to the variables $x={x_1,x_2,\ldots,x_n}$ . Thus, the IR problem where a simple order is defined corresponds to the following quadratic program (QP):

$\min \sum_{i=1}^n w_i (x_i - a_i)^2$ $\mathrm{subject~to~}x_i\ge x_j~\forall (i,j)\in E.$

In the case when $G = (N, E)$ is a total order, a simple iterative algorithm for solving this QP is called the pool adjacent violators algorithm (PAVA). Best and Chakravarti (1990) have studied the problem as an active set identification problem, and have proposed a primal algorithm in O(n), the same complexity as the PAVA, which can be seen as a dual algorithm.

IR has applications in statistical inference, for example, computing the cost at the minimum of the above goal function, gives the "stress" of the fit of an isotonic curve to mean experimental results when an order is expected.

Another application is nonmetric multidimensional scaling (Kruskal, 1964), where a low-dimensional embedding for data points is sought such that order of distances between points in the embedding matches order of dissimilarity between points. Isotonic regression is used iteratively to fit ideal distances to preserve relative dissimilarity order.

Isotonic regression is also sometimes referred to as monotonic regression. Correctly speaking, isotonic is used when the direction of the trend is strictly increasing, while monotonic could imply a trend that is either strictly increasing or strictly decreasing.

Isotonic Regression under the $L p$ for $p > 0$ is defined as follows:

$\min \sum_{i=1}^n w_i |x_i - a_i|^p$ $\mathrm{subject~to~}x_i\ge x_j~\forall (i,j)\in E.$

Simply ordered case

To illustrate the above, let $x_1 \leq x_2 \leq \ldots \leq x_n$ , and $f(x_1) \leq f(x_2) \leq \ldots \leq f(x_n)$ , and $w_i \geq 0$ .

The isotonic estimator, $g *$ , minimizes the weighted least squares-like condition:

$\min_g \sum_{i=1}^n w_i (g(x_i) - f(x_i))^2$

Where $g$ is the unknown function we are estimating, and $f$ is a known function.

Software has been developed in the R statistical package for computing isotone (monotonic) regression.^[1]

References

^ De Leeuw, Jan; K. Hornik, P. Mair (2009). "Isotone Optimization in R: Pool-Adjacent-Violators Algorithm (PAVA) and Active Set Methods". Journal of statistical software 32 (5): 1.

Best, M.J.; & Chakravarti N. (1990). "Active set algorithms for isotonic regression; a unifying framework". Mathematical Programming 47: 425–439. doi:10.1007/BF01580873.
Robertson, T.; Wright, F.T.; & Dykstra, R.L. (1988). Order restricted statistical inference. New York: Wiley, 1988. ISBN 0-471-91787-7

Barlow, R. E.; Bartholomew, D.J.; Bremner, J. M.; & Brunk, H. D. (1972). Statistical inference under order restrictions; the theory and application of isotonic regression. New York: Wiley, 1972. ISBN 0-471-04970-0.

Kruskal, J. B. (1964). "Nonmetric Multidimensional Scaling: A numerical method". Psychometrika 29 (2): 115–129. doi:10.1007/BF02289694.
Shively, T.S., Sager, T.W., Walker, S.G. (2009). "A Bayesian approach to non-parametric monotone function estimation". J.R.Statist.Soc. B 71 (1): 159–175. doi:10.1111/j.1467-9868.2008.00677.x.
Wu, W. B.; Woodroofe, M.; & Mentz, G. (2001). "Isotonic regression: Another look at the changepoint problem". Biometrika 88 (3): 793–804. doi:10.1093/biomet/88.3.793.

Categories:

Articles to be expanded with sources
Regression analysis
Non-parametric regression
Non-parametric Bayesian methods
Numerical analysis

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Isotonic regression

Simply ordered case

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Simply ordered case

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