| Popis: |
Limit space theory is initiated by Rabinovich, Roch, and Silbermann for $\mathbb{Z}^n$, and developed by \v{S}pakula and Willett for a discrete metric space. In this paper, we introduce an ultraproduct approach for the limit space theory by fixing an ultrafilter and changing the base point. We prove that the limit spaces we construct are stratified into distinct layers according to the Rudin-Keisler order of the chosen ultrafilter. When the ultrafilter is fixed, the limit spaces we can construct can extract one layer from all the limit spaces constructed by \v{S}pakula and Willett. We prove that if a finite propagation operator is Fredholm if and only if the limit operators in one layer and one higher layer are invertible, where the condition is weaker than that of \v{S}pakula and Willett. Moreover, we investigated the correspondence of coarse geometric properties of limit spaces and the original space, including Property A, coarse embeddability, asymptotic dimension, etc. |
