Sparse recovery in convex hulls via entropy penalization

Abstract

Let (X,Y) be a random couple in S× T with unknown distribution P and (X1,Y1),...,(Xn,Yn) be i.i.d. copies of (X,Y). Denote Pn the empirical distribution of (X1,Y1),...,(Xn,Yn). Let h1,...,hN:S [-1,1] be a dictionary that consists of N functions. For λ ∈ RN, denote fλ:=Σj=1Nλjhj. Let :T× R R be a given loss function and suppose it is convex with respect to the second variable. Let ( f)(x,y):=(y;f(x)). Finally, let ⊂ RN be the simplex of all probability distributions on \1,...,N\. Consider the following penalized empirical risk minimization problem eqnarray*λ:= argminλ∈ [Pn( fλ)+ Σj=1Nλj λj]eqnarray* along with its distribution dependent version eqnarray*λ:= argminλ∈ [P( fλ)+ Σj=1Nλj λj],eqnarray* where ≥ 0 is a regularization parameter. It is proved that the ``approximate sparsity'' of λ implies the ``approximate sparsity'' of λ and the impact of ``sparsity'' on bounding the excess risk of the empirical solution is explored. Similar results are also discussed in the case of entropy penalized density estimation.