A sharp estimate for the Hilbert transform along finite order lacunary sets of directions |
| |
| Authors: | Francesco Di Plinio Ioannis Parissis |
| |
| Institution: | 1.Department of Mathematics,University of Chicago,Chicago,USA;2.Einstein Institute of Mathematics, Edmond J. Safra Campus,The Hebrew University of Jerusalem,Givat Ram, Jerusalem,Israel;3.Department of Mathematics, Hill Center - Busch Campus, Rutgers,The State University of New Jersey,Piscataway,USA |
| |
| Abstract: | We prove, in ZFC, that there is an infinite strictly descending chain of classes of theories in Keisler’s order. Thus Keisler’s order is infinite and not a well order. Moreover, this chain occurs within the simple unstable theories, considered model-theoretically tame. Keisler’s order is a central notion of the model theory of the 60s and 70s which compares first-order theories, and implicitly ultrafilters, according to saturation of ultrapowers. Prior to this paper, it was long thought to have finitely many classes, linearly ordered. The model-theoretic complexity we find is witnessed by a very natural class of theories, the n-free k-hypergraphs studied by Hrushovski. This complexity reflects the difficulty of amalgamation and appears orthogonal to forking. |
| |
| Keywords: | |
| 本文献已被 SpringerLink 等数据库收录! |
|
