Adrian Fan, Jack Montemurro, P. Motakis, Naina Praveen, A. Rusonik, P. Skoufranis, N. Tobin
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引用次数: 0
摘要
受Bourgain和Tzafriri的一个有影响的结果的启发,我们考虑了连续矩阵函数$A:\mathbb{R}\到M_{n \ times n}$以及与它们对某些子空间的限制相关的下$\ell_2$范数界。我们证明了对于任何这样的具有单位长度列的$A$,存在子空间$t\mapsto U(t)\subet \mathbb{R}^n$的连续选择,使得对于U(t)$中的$v\,$\|A(t)v\|\geq c\|v\|$,其中$c$是某个通用常数。此外,选择$U(t)$使得它们的维数满足对$n$和$\sup_{t\in\mathbb{R}}\|a(t)\|.$具有最优渐近依赖性的下界我们提供了两种方法。第一个依赖于正交性论证,而第二个本质上是概率性和组合性的。后者不产生$\dim(U(t))$的最优界,但以这种方式获得的$U(t。
Restricted invertibility of continuous matrix functions
Motivated by an influential result of Bourgain and Tzafriri, we consider continuous matrix functions $A:\mathbb{R}\to M_{n\times n}$ and lower $\ell_2$-norm bounds associated with their restriction to certain subspaces. We prove that for any such $A$ with unit-length columns, there exists a continuous choice of subspaces $t\mapsto U(t)\subset \mathbb{R}^n$ such that for $v\in U(t)$, $\|A(t)v\|\geq c\|v\|$ where $c$ is some universal constant. Furthermore, the $U(t)$ are chosen so that their dimension satisfies a lower bound with optimal asymptotic dependence on $n$ and $\sup_{t\in \mathbb{R}}\|A(t)\|.$ We provide two methods. The first relies on an orthogonality argument, while the second is probabilistic and combinatorial in nature. The latter does not yield the optimal bound for $\dim(U(t))$ but the $U(t)$ obtained in this way are guaranteed to have a canonical representation as joined-together spaces spanned by subsets of the unit vector basis.
期刊介绍:
''Operators and Matrices'' (''OaM'') aims towards developing a high standard international journal which will publish top quality research and expository papers in matrix and operator theory and their applications. The journal will publish mainly pure mathematics, but occasionally papers of a more applied nature could be accepted. ''OaM'' will also publish relevant book reviews.
''OaM'' is published quarterly, in March, June, September and December.
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