Ka-fu Wong © 2003 Lab 1-1 Dr. Ka-fu WONG ECON1003 Analysis of Economic Data
Ka-fu Wong © 2003 Lab 1-2 Counting Green Beans in the Bottle We are interested in knowing the number of green beans in the bottle. Tools: We do not have a weight balance. If we have a balance, we can take out a small number of beans and weight them. We can than estimate the number of beans in the bottle. We do have a pack of red beans. What do we need to do to obtain a reasonable estimate?
Ka-fu Wong © 2003 Lab 1-3 Capture/Re-capture GOAL: 1.Illustrate that how to estimate the population size when the cost of counting all individuals is prohibitive. 2.Illustrate how easy and intuitive statistics could be. Statistics need not be completely deep, murky, and mysterious. Our common sense can help us to negotiate our way through the course. In-class Lab
Ka-fu Wong © 2003 Lab 1-4 History and examples of capture / recapture method Capture-recapture methods were originally developed in the wildlife biology to monitor the census of bird, fish, and inset populations (counting all individuals is prohibitive). Recently, these methods have been utilized considerably in the areas of disease and event monitoring.
Ka-fu Wong © 2003 Lab 1-5 The fish example Estimating the number of fish in a lake or pond. C fish is caught, tagged, and returned to the lake. Later on, R fish are caught and checked for tags. Say T of them have tags. The numbers C, R, and T are used to estimate the fish population.
Ka-fu Wong © 2003 Lab 1-6 Green beans in a bottle The objective is to estimate the number of green beans in a bottle. Capture one cup of beans. Count them and call it C. Replace the green beans with red beans. Put them back into the bag. Capture another cup of beans. Count the total number of beans (R) and the number of red beans (T). Based on this information, How to obtain a reasonable estimate of the number of beans in the bag?
Ka-fu Wong © 2003 Lab 1-7 Green beans in a bag We know that C/N ≈ T/R Hence, a simple estimate is CR/T C= the number of beans capture in the first round. R= the total number of beans capture in the second round. T= the number of red beans capture in the second round.
Ka-fu Wong © 2003 Lab 1-8 Simulations to see the properties of this proposed estimator How good is the proposed estimator? To see the properties of this proposed estimator, I have use MATLAB to simulation our Capture- recapture experiment with different numbers of capture (C) and different numbers of recapture (R), relative to the total number of fish in the pond. Throughout, N=500 and 1000 simulations
Ka-fu Wong © 2003 Lab 1-9 Simulation design – via MATLAB Individual simulation experiment: Create 500 fish, labelled 1 to 500. Capture a random sample of C fish, mark them by converting their label to zero. Capture another random sample of R fish. Count the number of marked fish in the sample. Call it T. Compute the estimate as CR/T. Repeat this experiment 1000 times. Hence, we have 1000 estimates. Compute the mean and standard deviation of these 1000 estimates.
Ka-fu Wong © 2003 Lab 1-10 Properties of our estimator Increasing C and R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-11 Properties of our estimator Constant C and increasing R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-12 Properties of our estimator Increasing C and constant R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-13 Conclusion from the simulations The proposed estimator generally overestimate the number of fish in pond, i.e., estimate is larger than the true number of fish in pond. That is, there is a bias. Holding R constant, increasing the number of capture (C) helps: Bias is reduced, i.e., Mean is closer to the true population The estimator is more precise, i.e., standard deviation of the estimator is smaller. Holding C constant, increasing the number of recapture (R) does not help: Bias is more or less unchanged. The precision of the estimator is more or less unchanged.
Ka-fu Wong © 2003 Lab 1-14 Additional issues Our proposed estimator is good enough but it can be better. Alternative estimators have been developed to reduce or eliminate the bias of estimating N. For instance, Seber (1982, p.60) suggests an estimator of N (C+1)(R+1)/(T+1) – 1 (Note that our proposed formula is CR/T.) Seber, G. (1982): The Estimation of Animal Abundance and Related Parameters, second edition, Charles.
Ka-fu Wong © 2003 Lab 1-15 Simulations to see the properties of this modified estimator How good is the modified estimator? To see the properties of this modified estimator, we repeat the above simulation exercise with this new formula. (C+1)(R+1)/(T+1) – 1
Ka-fu Wong © 2003 Lab 1-16 Properties of modified estimator Increasing C and R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-17 Properties of modified estimator Constant C and increasing R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-18 Properties of modified estimator Increasing C and constant R NCRSMeanStd N = Total number of fish in the pond. C = number of captured fish. R = number of re-captured fish. S = number of simulation with non-zero marked fish in recapture.
Ka-fu Wong © 2003 Lab 1-19 Conclusion from the simulations The modified estimator performs better than the original estimator. There is no apparent bias. The estimator is more precise. Holding R constant, increasing the number of capture (C) helps: The estimator is more precise, i.e., standard deviation of the estimator is smaller. Holding C constant, increasing the number of recapture (R) does not help: The precision of the estimator is more or less unchanged.
Ka-fu Wong © 2003 Lab 1-20 What to take away today Statistics could be easy and intuitive. Statistics need not be completely deep, murky, and mysterious. Our common sense can help us to negotiate our way through the course. Syllabus will be distributed and discussed on Wednesday 22 January 2003.
Ka-fu Wong © 2003 Lab END - In-class Lab Capture / recapture