Skip to main content
MathOverflow

Return to Question

Bumped by Community user
Bumped by Community user
Tidying while this is on the front page
Source Link
LSpice
LSpice
  • 12.9k
  • 4
  • 45
  • 69

Berry-Esseen Berry–Esseen bound for operator norm of matrix averages

Is there a Berry-EsseenBerry–Esseen bound for operator norm of an average of independent random matrices?

Suppose $A_1, \ldots, A_n$$A_1, \dotsc, A_n$ are independent matrices with $\mathbb{E}[A_i] = I$ (the identity matrix). Is there a Berry-EsseenBerry–Esseen bound for properly normalized $\|\overline{A} - I\|_{op}$$\lVert\overline{A} - I\rVert_\text{op}$?

Berry-Esseen bound for operator norm of matrix averages

Is there a Berry-Esseen bound for operator norm of an average of independent random matrices?

Suppose $A_1, \ldots, A_n$ are independent matrices with $\mathbb{E}[A_i] = I$ (the identity matrix). Is there a Berry-Esseen bound for properly normalized $\|\overline{A} - I\|_{op}$?

Berry–Esseen bound for operator norm of matrix averages

Is there a Berry–Esseen bound for operator norm of an average of independent random matrices?

Suppose $A_1, \dotsc, A_n$ are independent matrices with $\mathbb{E}[A_i] = I$ (the identity matrix). Is there a Berry–Esseen bound for properly normalized $\lVert\overline{A} - I\rVert_\text{op}$?

Bumped by Community user
Bumped by Community user
Bumped by Community user
Bumped by Community user
Bumped by Community user
Bumped by Community user
Bumped by Community user
added top-level tag
Link
Yemon Choi
Yemon Choi
  • 25.8k
  • 9
  • 69
  • 156
Source Link
Arun
Arun
  • 51
  • 1

Berry-Esseen bound for operator norm of matrix averages

Is there a Berry-Esseen bound for operator norm of an average of independent random matrices?

Suppose $A_1, \ldots, A_n$ are independent matrices with $\mathbb{E}[A_i] = I$ (the identity matrix). Is there a Berry-Esseen bound for properly normalized $\|\overline{A} - I\|_{op}$?