Rank-Based Tests for Mutual Independence of High-Dimensional Random Vectors via Lq Norm

Abstract

We consider the problem of testing mutual independence among the components of a high-dimensional random vector. Building on the rank-based max-sum framework, we introduce fixed finite-Lq power-sum statistics under three general classes of rank-based correlations: simple linear rank statistics, non-degenerate rank-based U-statistics and degenerate rank-based U-statistics. The proposed statistics interpolate between the dense-alternative sensitivity of the L2 statistic and the sparse-alternative sensitivity of the L∞ statistic. We establish the asymptotic independence between any fixed finite-Lq block and the corresponding L∞ statistic, and combine L2,L4,L6 and L∞ p-values through a Cauchy rule. Numerical studies show that the resulting L2,4,6,∞ procedure is highly robust to the sparsity of the alternative and has strong empirical power across the considered designs.