Subspace decomposition in regularized least-squares: solution properties, restricted coercivity and beyond (2507.20686v1)

Abstract: We study the solution properties of regularized lease-squares problem. By the subspace decomposition technique, we develop expressions of the solution set in terms of conjugate function, from which various properties, including existence, compactness and uniqueness, can then be easily analyzed. An important difference of our approach from the existing works is that the existence and compactness are discussed separately. Many existing results under the notions of recession cone and sublevel set are unified, and further connected to our results by associating recession function with the recession cone of subdifferential of conjugate function. In particular, the concept of restricted coercivity is developed and discussed in various aspects. The associated linearly constrained counterpart is discussed in a similar manner. Its connections to regularized least-squares are further established via the exactness of infimal postcomposition. Our results are supported by many examples, where the simple geometry of lasso solution deserves further investigations in near future.