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MODELLING REGIONAL MIGRATION

Published online by Cambridge University Press:  11 June 2009

ANGELA PEZIC*
Affiliation:
Murdoch Childrens Research Institute, Flemington Rd, Parkville, Vic. 3052, Australia (email: angela.pezic@mcri.edu.au)
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Abstract

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Type
Research Article
Copyright
Copyright © Australian Mathematical Society 2009

Footnotes

Thesis submitted to La Trobe University, July 2008. Degree approved, November 2008. Supervisors: Dr Graeme Byrne and Professor Terry Mills.

References

[1] Alonso, W., National Interregional Demographic Accounts: A Prototype, Monograph 017 (Institute of Urban and Regional Development, University of California, Berkeley, 1973) [online]. Available: http://iurd.berkeley.edu/PDF/MG17.pdf [Accessed 19 June 2008].Google Scholar
[2] Alonso, W., ‘A theory of movement, in: Human Settlement Systems (ed. N. M. Hansen) (Ballinger, Cambridge, MA, 1978), pp. 197–211.Google Scholar
[3] Austin, P. C. and Tu, J. V., ‘Bootstrap methods for developing predictive models’, Amer. Statist. 58(2) (2004), 131137.Google Scholar
[4] Cameron, A. C. and Trivedi, P. K., Regression Analysis of Count Data (Cambridge University Press, Cambridge, 1998).Google Scholar
[5] Green, R. D. and Doll, J. P., ‘Dummy variables and seasonality – A curio’, Amer. Statist. 28(2) (1974), 6062.Google Scholar
[6] Stillwell, J., ‘Inter-regional migration modelling: a review and assessment’, in: Proceedings of the 45th Congress of the European Regional Science Association (ed. P. Rietveld) (European Regional Science Association, Amsterdam, 2005), p. 770 [online]. Available: http://www.ersa.org/ersaconfs/ersa05/papers/770.pdf [Accessed 25 June 2008].Google Scholar
[7] Vuong, Q. H., ‘Likelihood ratio tests for model selection and non-nested hypotheses’, Econometrica 57(2) (1989), 307333.Google Scholar
[8] Wilson, A. G., ‘A family of spatial interaction models and associated developments’, Environment and Planning A 3 (1971), 132.Google Scholar