Power in High-Dimensional Testing Problems
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Abstract:
Fan et al (2015) recently introduced a method for increasing asymptotic power of tests in high-dimensional testing problems. If applicable to a given test, their power enhancement principle leads to an improved test that has the same asymptotic size, uniformly non-inferior asymptotic power, and is consistent against a strictly broader range of alternatives than the initially given test. We study under which conditions this method can be applied and show under weak assumptions that: (i) In asymptotic regimes where the dimensionality of the parameter space is fixed as sample size increases, there exist tests that can not be further improved by the power enhancement principle. (ii) When the dimensionality increases unboundedly with sample size every test with asymptotic size smaller than one can be improved with the power enhancement principle.
Date: 20 October 2017, 14:15 (Friday, 2nd week, Michaelmas 2017)
Venue: Manor Road Building, Manor Road OX1 3UQ
Venue Details: Seminar Room C
Speaker: Anders Kock (University of Oxford)
Organising department: Department of Economics
Part of: Nuffield Econometrics Seminar
Booking required?: Not required
Audience: Members of the University only
Editors: Erin Saunders, Anne Pouliquen