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Psychometrics, Dynamics, and Functional Data Analysis. “The views. Jim Ramsay McGill University. Testing as Input/Output Analysis. A test score is actually a derivative with respect to time. Consequently a differential equation model for testing data seems natural.
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Psychometrics, Dynamics, and Functional Data Analysis “The views Jim Ramsay McGill University
Testing as Input/Output Analysis • A test score is actually a derivative with respect to time. • Consequently a differential equation model for testing data seems natural. • Dynamic testing data will be more and more important. • We have some new tools for working with dynamic data. • So let’s consider how to use time as a covariate.
Learning to Play Golf • We buy some clubs. We play a few games, each being an 18 item test. It’s harder than it looks. • We take a lesson. We play a few games. Our score improves to a better level. • We take another lesson, play some games, and things improve again. • Key question: How quickly is a lesson reflected in an improvement in score?
Energy is defined as “the capacity to do work.” Kinetic energy E = Mv2/2, and involves mass, distance, and time. We are interested in “the capacity to solve problems.” Problems involve difficulties (=mass), number of problems (=distance) and time. Let’s call mental energy brainergy. Brainergy
Brain Power • What counts is problem solving per unit time. • Power = energy expended per unit time. • Brain power = maximum difficulty of problem solvable per unit time, or • number of lighter problems solved per unit time. • That is, brain power = d brainergy/dt.
Brain Power and Time Scales We need the concept of brain power when we consider intelligence on two time scales: • Long term: How much knowledge is available over large time intervals, like a school year • Short term: How much new knowledge can be acquired over a short time interval, like a single class.
Tests Measure Brain Power • Mental tests and psychological scales are one of the greatest technological achievements of the 20th century. • Tests work so well because they are time-limited. • Test scores reflect brain power rather than brainergy.
Inputs to Brain Power • Information about the structure of the problems. • A set of tools to solve them. • Training in the use of these tools. • All these require time. • Inputs to acquisition of brain power are functions of time.
A Differential Equation in Time • Links one or more time-derivatives, dx/dt, d2x/dt2,…, to the function x(t) itself. • Is a model for system dynamics: change over time. • Can also include one or more input or covariate functions. • x(t) is a long-term description. • dx/dt is a short-term description.
A Simple Example • E(t) is brainergy, dE/dt is brain power. • f(t) is an input function of time, such as education. • α and β are constants, β > 0.
Most differential equations don’t have explicit solutions, but this one does. • Let E0 be brainergy at time t = 0, and which will often be 0. • Let’s see what happens when α=1, β varies, and f(t) is a step function.
The slope of E(t) when f(t) goes positive is β. β controls how fast the system responds to the input f(t). If the system is a problem solver, then β indicates how quickly the person learns to solve a problem. After about 4/β time units, full capacity is reached, and the system is ready for more input.
Fitting Differential Equations • We have noisy discrete-time data, and want to use them to estimate a differential equation. • We want a solution E(t) to the equation to fit the data as well as possible. • We need lots of flexibility in choosing a differential equation, and we can’t assume that there is an explicit solution to the equation.
Functional Data Analysis • A collection of methods for analyzing curves or functions as data • A common theme is using derivatives in various ways • See Ramsay and Silverman (1997) Functional Data Analysis. Springer. • And Ramsay and Silverman (2002) Applied Functional Data Analysis. Springer.
Two Functional Data Analysis Techniques • L-spline Smoothing: given noisy data and a differential equation, find a function E(t) that will smooth the data and at the same time be nearly a solution to the differential equation. • Principal Differential Analysis: given a function E(t), estimate a linear differential equation for which E(t) is a solution.
Estimating a DIFE from noisy data • We’ve recently combined these two methods into a technique for estimating a differential equation from noisy data. • In our simple example, this amounts to estimating parameters α and β. • But much more complex DIFE’s can be estimated as well, including linear or nonlinear, and single or multiple variable systems.
An Oil Refinery • Here are some data from an oil refinery in Corpus Christi. • The input f(t) (reflux flow) is negatively coupled to the output E(t) (tray 47 level). • The smooth curve is a solution to the differential equation that best represents this relationship.
Many situations will call for multiple outputs: Performance with a putter, a driver, and an iron, for example. Or in algebra and geometry. • And many situations will involve multiple inputs: Regular classes, tutoring sessions, labs and etc. • The technology used in these illustrations can handle these situations, at least for linear differential equations. Nonlinear equations don’t pose any problem in principle.
Some Simulated Data • Imagine that the data are golf scores over successive games, and that the input is a set of three equally-spaced lessons from a golf pro. • The following slides show three golfers. Which is a future Tiger Woods?
Is this Model Good Enough? • Specifying β to be constant is too simple. Allowing for fatigue, boredom, and other things requires a function β(t). • A first order equation can’t allow for sudden transient effects like insight. We may need a differential equation involving higher derivatives. • We may need nonlinear equations as well.
A Nonlinear Differential Equation • The summed output from these two equations will exhibit both the rapid learning and long-term retention required of human learners. • See H. R. Wilson (1999) Spikes, Decisions and Actions, Oxford, for many more examples of differential equation models in neuroscience.
Control Theory • Engineers who work with input/output systems have developed ways of designing feedback loops to optimize outputs. • We’re working with a team of chemical engineers at Queen’s University.
Where Would the Data Come From? • Can we design customized learning situations, like golf, and track how a learner makes progress as a function of time and inputs? • Perhaps video and computer games are nearly what we need. • We already know that people will pay big money to have these experiences. • Would corporations with deep pockets pay for this kind of testing?
Conclusions • Dynamic testing would generate performance data over time that depend on one or more functional covariates. • New tools are available for these data that fit them with a differential equation. • Dynamic psychometrics looks promising!
