High dimensional alpha test for linear factor pricing model with $L_q$-norm
Abstract
We consider testing zero pricing errors in high-dimensional linear factor pricing models. Existing methods are mainly based on either an statistic, which is effective under dense alternatives, or an statistic, which is powerful under very sparse alternatives. To bridge these two regimes, we develop a class of -based tests for finite , including the practically useful and cases. We show that larger leads to greater sensitivity to sparse alternatives. We further establish the asymptotic independence between the statistic and the statistic for any finite , which motivates a Cauchy combination test that adapts to a broad range of sparsity levels. Simulation studies and a real-data analysis show that the proposed methods are more robust to the unknown sparsity of the alternative and can outperform existing procedures in finite samples.
Cite
@article{arxiv.2603.29764,
title = {High dimensional alpha test for linear factor pricing model with $L_q$-norm},
author = {Ping Zhao and Huifang Ma and Long Feng},
journal= {arXiv preprint arXiv:2603.29764},
year = {2026}
}