Property AUB is the notion in metric geometry which has applications in higher index problems.In this paper,the permanence property of property AUB of metric spaces under large scale decompositions of finite depth is proved.
在这份报纸,我们学习下列非线性的 BSDE:y (t) +1t f ( s , y , z ) ds+1t [ z +g1 ( s , y ) +g2 ( s , y , z )] dWs =, t [ 0,1 ],吗小 parameter.The 系数 f 在哪儿,是局部地在 y 和 z 的 Lipschitz ,系数 g1 是局部地在 y 的 Lipschitz ,和系数 g2 是一致地在 y 的 Lipschitz 和 z.Let 行是局部地球 B 上的系数的 Lipschitz 常数( O ,吗 N ) Ra 栠浡汩潴楮湡??????????€ ???€ ??瘠?????????栠浡汩潴楮湡?????匠???????牯敤?湉?????????????????栠浡汩潴楮湡??
The author studies the metric spaces with operator norm localization property. It is proved that the operator norm localization property is coarsely invariant and is preserved under certain infinite union. In the case of finitely generated groups, the operator norm localization property is also preserved under the direct limits.
The notions of metric sparsification property and finite decomposition complexity are recently introduced in metric geometry to study the coarse Novikov conjecture and the stable Borel conjecture. In this paper, it is proved that a metric space X has finite decomposition complexity with respect to metric sparsification property if and only if X itself has metric sparsification property. As a consequence, the authors obtain an alternative proof of a very recent result by Guentner, Tessera and Yu that all countable linear groups have the metric sparsification property and hence the operator norm localization property.
