A Bott periodicity theorem for $\ell^p$-spaces and the coarse Novikov conjecture at infinity

TL;DR

This paper establishes a Bott periodicity theorem for $ ext{l}^p$-spaces and introduces a new approach to the coarse Novikov conjecture at infinity, proving it for spaces with certain embeddings into $ ext{l}^p$-spaces.

Contribution

It formulates and proves a Bott periodicity theorem for $ ext{l}^p$-spaces and reduces the coarse Novikov conjecture to the injectivity of a new coarse assembly map at infinity.

Findings

Proves Bott periodicity for $ ext{l}^p$-spaces.

Shows the coarse Novikov conjecture holds for spaces admitting fibred coarse embeddings into $ ext{l}^p$-spaces.

Includes all box spaces of residually finite hyperbolic groups and many warped cones.

Abstract

We formulate and prove a Bott periodicity theorem for an $\ell^p$-space ($1\leq p<\infty$). For a proper metric space $X$ with bounded geometry, we introduce a version of $K$-homology at infinity, denoted by $K_*^{\infty}(X)$, and the Roe algebra at infinity, denoted by $C^*_{\infty}(X)$. Then the coarse assembly map descents to a map from $\lim_{d\to\infty}K_*^{\infty}(P_d(X))$ to $K_*(C^*_{\infty}(X))$, called the coarse assembly map at infinity. We show that to prove the coarse Novikov conjecture, it suffices to prove the coarse assembly map at infinity is an injection. As a result, we show that the coarse Novikov conjecture holds for any metric space with bounded geometry which admits a fibred coarse embedding into an $\ell^p$-space. These include all box spaces of a residually finite hyperbolic group and a large class of warped cones of a compact space with an action by a hyperbolic group.