Straight Time and Overtime in Equilibrium
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- Rogerson, Richard, 1988.
"Indivisible labor, lotteries and equilibrium,"
Journal of Monetary Economics,
Elsevier, vol. 21(1), pages 3-16, January.
- Robert E. Hall, 1986.
"The Relation Between Price and Marginal Cost in U.S. Industry,"
NBER Working Papers
1785, National Bureau of Economic Research, Inc.
- Hall, Robert E, 1988. "The Relation between Price and Marginal Cost in U.S. Industry," Journal of Political Economy, University of Chicago Press, vol. 96(5), pages 921-47, October.
- Sargent, Thomas J, 1978.
"Estimation of Dynamic Labor Demand Schedules under Rational Expectations,"
Journal of Political Economy,
University of Chicago Press, vol. 86(6), pages 1009-44, December.
- Thomas J. Sargent, 1978. "Estimation of dynamic labor demand schedules under rational expectations," Staff Report 27, Federal Reserve Bank of Minneapolis.
- Thomas J. Sargent & Christopher A. Sims, 1977.
"Business cycle modeling without pretending to have too much a priori economic theory,"
55, Federal Reserve Bank of Minneapolis.
- Tom Doan, . "RATS program to estimate observable index model from Sargent-Sims(1977)," Statistical Software Components RTZ00126, Boston College Department of Economics.
- Brock, William A. & Mirman, Leonard J., 1972. "Optimal economic growth and uncertainty: The discounted case," Journal of Economic Theory, Elsevier, vol. 4(3), pages 479-513, June.
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