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On Operator Norm Localization Property. School of Mathematics Fudan University Xiaoman Chen & Xianjin Wan. Background. Background. Background. Background. What is the operator norm localization property ?
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On Operator Norm Localization Property School of Mathematics Fudan University Xiaoman Chen & Xianjin Wan
Background What is the operator norm localization property ? That is a local estimation property for us to estimate the norm of any operator in Roe algebra.
Background The Box space : Let Γ be a finite generated residually finite group
Background In Gong-Wang-Yu’s paper “Geometrization of the Strong Novikov Conjecture of Residually finite groups”, they proved that Question: Is this mapping can be extended to the reduced Roe Algebras?
Background Application to K-theory
Definitions and Basic properties It is not difficult to prove that if Γ has finite asymptotic dimension, then the above lifting can be extended to the reduced Roe algebra. Generalize the finite asymptotic case, Guoliang Yu introduced the following definition
Problems • What kinds of finite generated groups are being of operator norm localization property? • Do the operations of groups preserve operator norm localization property?
Main Results Idea of proof:
Main Results Choose x=e
Main Results Using the above Proposition and the infinite union theorem, we have
Further Problems • Let Γ be a finite generated residually finite group with operator norm localization property .Are the reduced Roe algebra and maximal Roe algebra of its box space same? • Can we prove the Coarse Baum-Connes Conjecture in the case of operator norm localization property ?