Piecewise Interpretable Hilbert Spaces
Abstract
We study Hilbert spaces interpreted, in an appropriate sense, in a first-order theory. Under a new finiteness hypothesis that we call {\em scatteredness} we prove that is a direct sum of {\em asymptotically free} components, where short-range interactions are controlled by algebraic closure and long-range interactions vanish. Examples include -spaces relative to Macpherson-Steinhorn definable measures; spaces relative to the Haar measure of the absolute Galois groups; irreducible unitary representations of -adic Lie groups; and unitary representations of the automorphism group of an -categorical theory. In the last case, our main result specialises to a theorem of Tsankov. New methods are required, making essential use of local stability theory in continuous logic.
Cite
@article{arxiv.2110.05142,
title = {Piecewise Interpretable Hilbert Spaces},
author = {Alexis Chevalier and Ehud Hrushovski},
journal= {arXiv preprint arXiv:2110.05142},
year = {2022}
}
Comments
Heavily revised version. Some new content in sections 2,3,4