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Abstract
Envelopes were recently proposed as methods for reducing estimative variation in multivariate linear regression. Estimation of an envelope usually involves optimization over Grassmann manifolds. We propose a fast and widely applicable one-dimensional (1D) algorithm for estimating an envelope in general. We reveal an important structural property of envelopes that facilitates our algorithm, and we prove both Fisher consistency and 
-consistency of the algorithm. Supplementary materials for this article are available online.
ACKNOWLEDGMENT
Research for this article was supported in part by grant DMS-1007547 from the National Science Foundation.
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