Abstract
In this paper, we build a new test of rational expectations based on the marginal distributions of realizations and subjective beliefs. This test is widely applicable, including in the common situation where realizations and beliefs are observed in two dierent datasets that cannot be matched. We show that whether one can rationalize rational expectations is equivalent to the distribu- tion of realizations being a mean-preserving spread of the distribution of beliefs. The null hypothesis can then be rewritten as a system of many moment inequal- ity and equality constraints, for which tests have been recently developed in the literature. The test is robust to measurement errors under some restrictions and can be extended to account for aggregate shocks. Finally, we apply our methodology to test for rational expectations about future earnings. While individuals tend to be right on average about their future earnings, our test strongly rejects rational expectations.
Keywords
Rational expectations; Test; Subjective expectations; Data; combination.;
Replaced by
Xavier D'Haultfoeuille, Christophe Gaillac, and Arnaud Maurel, “Rationalizing Rational Expectations: Characterizations and Tests”, Quantitative Economics, vol. 12, n. 3, July 2021, pp. 817–842.
Reference
Xavier D'Haultfoeuille, Christophe Gaillac, and Arnaud Maurel, “Rationalizing Rational Expectations: Characterizations and Tests”, TSE Working Paper, n. 21-1211, May 2021.
See also
Published in
TSE Working Paper, n. 21-1211, May 2021