Hilbert-Hadamard spaces and the equivariant coarse Novikov conjecture
Abstract
The equivariant coarse Novikov conjectures stand among a handful profound K-theoretic conjectures in noncommutative geometry. Motivated by the quest to verify Novikov-type conjectures for groups of diffeomorphisms, we study in this paper the equivariant coarse Novikov conjectures for spaces that equivariantly and coarsely embed into admissible Hilbert-Hadamard spaces, which are a type of infinite-dimensional nonpositively curved spaces. The paper is split into two parts. We prove in the first part that for any metric space X with bounded geometry and with a proper isometric action α by a countable discrete group , if X admits an equivariant coarse embedding into an admissible Hilbert-Hadamard space and is torsion-free, then the equivariant coarse strong Novikov conjecture holds rationally for (X, , α). In the second part, we extend the result in the first part by dropping the torsion-free assumption on . To this end, we introduce, for a proper -space X with equivariant bounded geometry, a new Novikov-type conjecture that we call the rational analytic equivariant coarse Novikov conjecture, which generalizes the rational analytic Novikov conjecture and asserts the rational injectivity of a certain assembly map associated with a coarse analog of the classifying space E. We show that for a proper -space X with equivariant bounded geometry, if X admits an equivariant coarse embedding into an admissible Hilbert-Hadamard space, then the rational analytic equivariant coarse Novikov conjecture holds for (X,,α), i.e., the assembly map is a rational injection.
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.