- (2009): Discrete Choice Methods with Simulation. Cambridge University Press, 2nd edn.
Paper not yet in RePEc: Add citation now
- (2010): “Labour Supply, Work Effort and Contract Choice: Theory and Evidence on Physicians,†IZA Discussion Paper No. 5188.
Paper not yet in RePEc: Add citation now
- ANDREASSEN, L., M. DI TOMMASO, AND S. STROM (2013): “Do medical doctors respond to economic incentives ?,†Journal of Health Economics, 32(2), 392–409.
Paper not yet in RePEc: Add citation now
- ARROW, K. J. (1963): “Uncertainty and the Welfare Economics of Medical Care,†American Economic Review, 53(5), 941–973.
Paper not yet in RePEc: Add citation now
- BALTAGI, B. H., E. BRATBERG, AND T. H. HOLMAS (2005): “A panel data study of physicians’ labor supply: the case of Norway,†Health Economics, 14(10), 1035–1045.
Paper not yet in RePEc: Add citation now
BECKER, G. S., AND H. G. LEWIS (1973): “On the Interaction between the Quantity and Quality of Children,†Journal of Political Economy, 81(2), S279–S288.
BLUNDELL, R., A. DUNCAN, AND C. MEGHIR (1998): “Estimating Labor Supply Responses Using Tax Reforms, †Econometrica, 66(4), 827–861.
DEVLIN, R.-A., AND S. SARMA (2008): “Do Physician Remuneration Schemes Matter? The Case of Canadian Family Physicians,†Journal of Health Economics, 25(7), 1168–1181.
DUMONT, E., B. FORTIN, N. JACQUEMET, AND B. SHEARER (2008): “Physicians’ multitasking and incentives: Empirical evidence from a natural experiment,†Journal of Health Economics, 27(6), 1436–1450.
- EVANS, R. (1974): “Modeling the economic objectives of the physician,†in Health economics symposium, Proceedings of the First Canadian Conference 4-6 Sept., ed. by R. Fraser, pp. 33–46. Queen’s University Industrial Relations Centre, Kingston (Ont.). FELDSTEIN, M. S. (1970): “The Rising Price of Physician’s Services,†Review of Economic and Statistics, 52(2), 121–133.
Paper not yet in RePEc: Add citation now
FERRALL, C., A. W. GREGORY, AND W. G. THOLL (1998): “Endogenous Work Hours and Practice Patterns of Canadian Physicians,†The Canadian Journal of Economics, 31(1), 1–27.
FORTIN, B., N. JACQUEMET, AND B. SHEARER (2008): “Policy Analysis in the health-services market: accounting for quality and quantity,†Annals of Economics and Statistics, 91-92, 293–319.
GOURIEROUX, C., AND A. MONFORT (1993): “Simulation-based inference : A survey with special reference to panel data models,†Journal of Econometrics, 59(1-2), 5–33.
HOYNES, H. W. (1996): “Welfare Transfers in Two-Parent Families: Labor Supply and Welfare Participation Under the AFDC-UP Program,†Econometrica, 64(2), 295–332.
KALB, G., D. KUEHNLE, A. SCOTT, T. C. CHENG, AND S.-H. JEON (2018): “What factors affect physicians’ labour supply: Comparing structural discrete choice and reduced-form approaches,†Health Economics, 27(2), e101–e119.
LISE, J., S. SEITZ, AND J. SMITH (2004): “Equilibrium Policy Experiments and the Evaluation of Social Programs, †NBER WP, (10283).
MACURDY, T., D. GREEN, AND H. PAARSCH (1990): “Assessing Empirical Approaches for Analyzing Taxes and Labor Supply,†Journal of Human Resources, 25(3), 415–490.
- MCFADDEN, D. (1974): “Conditional Logit Analysis of Qualitative Choice Behavior,†in Frontiers in Econometrics, ed. by P. Zarembka, pp. 105–142. New York Academic Press, New York (NJ).
Paper not yet in RePEc: Add citation now
MCFADDEN, D., AND K. TRAIN (2000): “Mixed MNL models for discrete response,†Journal of Applied Econometrics, 15(5), 447–470.
- MCGUIRE, T. G. (2000): “Physician Agency,†in Handbook of Health Economics, ed. by A. J. Culyer, and J. P. Newhouse, vol. 1A, pp. 461–536. North-Holland, Amsterdam.
Paper not yet in RePEc: Add citation now
NOETHER, M. (1986): “The Growing Supply of Physicians: Has the Market Become More Competitive?,†Journal of Labor Economics, 4(4), 503–537.
ROTHENBERG, T. J. (1971): “Identification in Parametric Models,†Econometrica, 39(3), 577–591.
- S2000 a,i p2000 a if 2000 ≤ t ≤ 2002. (23) The same price are used for weighting billable and non-billable services. The variable St i in (23) then stands for either non-billable services, St i = SNB i t , or billable ones, St i = SB i t , aggregated using the same price levels. Prices: For the same reasons, the weights used for price indexes are the average level of services provided by FFS physicians. This avoids incorporating into price measures the effect of the variations in services due to switching to MR. Let S t a denote the average level of billable services of type a provided by all the FFS physicians belonging to the specialty considered. The price index of services is then given by:                    pt = ∑ a S a pt a ∑ a
Paper not yet in RePEc: Add citation now
- SAETHER, E. (2005): “Physicians’ Labour Supply: The Wage Impact on Hours and Practice Combinations,†Labour, 19(4), 673–703.
Paper not yet in RePEc: Add citation now
- SHEARER, B., N. H. SOMÉ, AND B. FORTIN (2017): “Physicians’ Response to Incentives: Evidence on Hours of Work and Multitasking,†mimeo.
Paper not yet in RePEc: Add citation now
SHOWALTER, M. H., AND N. K. THURSTON (1997): “Taxes and labor supply of high-income physicians,†Journal of Public Economics, 66(1), 73–97.
SLOAN, F. A. (1975): “Physician Supply Behavior in the Short Run,†Industrial and Labor Relations Review, 28(4), 549–569.
- St a,i p1996 a if 1996 ≤ t < 2000, St i = ∑ a (St a,i p2000 a ) ∑ a S2000 a,i p1996 a ∑ a
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- TRAIN, K. E. (1999): “Halton Sequences for Mixed Logit,†University of Berkeley, Working Paper.
Paper not yet in RePEc: Add citation now
VAN SOEST, A. (1995): “Structural Models of Family Labor Supply: A Discrete Choice Approach,†Journal of Human Resources, 30(1), 63–88.
ZABALZA, A., C. PISSARIDES, AND M. BARTON (1980): “Social security and the choice between full-time work, part-time work and retirement,†Journal of Public Economics, 14(2), 245–276. A Appendices A.1 Indexes Quantities: Let pt a stand for the price of the service a at time t and St a,i for the number of a-type services a physician i provided at time t. The annual level of services St i is then measured as:          St i = ∑ a