On the two mutually independent factors that determine the convergence of least-squares projection method

Abstract

This paper investigates the least-squares projection method for bounded linear operators, which provides a natural regularization scheme by projection for many ill-posed problems. Yet, without additional assumptions, the convergence of this approximation scheme cannot be guaranteed. We reveal that the convergence of least-squares projection method is determined by two independent factors -- the kernel approximability and the offset angle. The kernel approximability is a necessary condition of convergence described with kernel N(T) and its subspaces N(T)Xn, and we give several equivalent characterizations for it (Theorem 1). The offset angle of Xn is defined as the largest canonical angle between space T*T(Xn) and TT(Xn) (which are subspaces of N(T)), and it geometrically reflects the rate of convergence (Theorem 2). The paper also presents new observations for the unconvergence examples of Seidman [10, Example 3.1] and Du [2, Example 2.10] under the notions of kernel approximability and offset angle.