An error bound for Lasso and Group Lasso in high dimensions

Abstract

We leverage recent advances in high-dimensional statistics to derive new L2 estimation upper bounds for Lasso and Group Lasso in high-dimensions. For Lasso, our bounds scale as (k*/n) (p/k*)---n× p is the size of the design matrix and k* the dimension of the ground truth β*---and match the optimal minimax rate. For Group Lasso, our bounds scale as (s*/n) ( G / s* ) + m* / n---G is the total number of groups and m* the number of coefficients in the s* groups which contain β*---and improve over existing results. We additionally show that when the signal is strongly group-sparse, Group Lasso is superior to Lasso.