An Interesting Class of Operators with unusual Schatten-von Neumann behavior
Abstract
We consider the class of integral operators Q on L2(+) of the form (Q f)(x)=∫0 (\x,y\)f(y)dy. We discuss necessary and sufficient conditions on φ to insure that Qφ is bounded, compact, or in the Schatten-von Neumann class p, 1<p<∞. We also give necessary and sufficient conditions for Qφ to be a finite rank operator. However, there is a kind of cut-off at p=1, and for membership in p, 0<p≤1, the situation is more complicated. Although we give various necessary conditions and sufficient conditions relating to Qφ∈p in that range, we do not have necessary and sufficient conditions. In the most important case p=1, we have a necessary condition and a sufficient condition, using L1 and L2 modulus of continuity, respectively, with a rather small gap in between. A second cut-off occurs at p=1/2: if is sufficiently smooth and decays reasonably fast, then belongs to the weak Schatten-von Neumann class 1/2, but never to 1/2 unless =0. We also obtain results for related families of operators acting on L2() and 2(). We further study operations acting on bounded linear operators on L2(+) related to the class of operators Q. In particular we study Schur multipliers given by functions of the form φ(\x,y\) and we study properties of the averaging projection (Hilbert-Schmidt projection) onto the operators of the form Q.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.