The volume of separable states is super-doubly-exponentially small
S. Szarek. (2003)cite arxiv:quant-ph/0310061Comment: 20 p., LATEX; an expanded version of the original submission: more background material from convexity and geometry of Banach spaces, more exhaustive bibliography and improved quality of references to the bibliography.
DOI: 10.1103/PhysRevA.72.032304
Abstract
In this note we give sharp estimates on the volume of the set of separable
states on N qubits. In particular, the magnitude of the "effective radius" of
that set in the sense of volume is determined up to a factor which is a (small)
power of N, and thus precisely on the scale of powers of its dimension.
Additionally, one of the appendices contains sharp estimates (by known methods)
for the expected values of norms of the GUE random matrices. We employ standard
tools of classical convexity, high-dimensional probability and geometry of
Banach spaces.
Description
The volume of separable states is super-doubly-exponentially small
cite arxiv:quant-ph/0310061Comment: 20 p., LATEX; an expanded version of the original submission: more background material from convexity and geometry of Banach spaces, more exhaustive bibliography and improved quality of references to the bibliography
%0 Generic
%1 szarek2003volume
%A Szarek, Stanislaw
%D 2003
%K quantumcomputing
%R 10.1103/PhysRevA.72.032304
%T The volume of separable states is super-doubly-exponentially small
%U http://arxiv.org/abs/quant-ph/0310061
%X In this note we give sharp estimates on the volume of the set of separable
states on N qubits. In particular, the magnitude of the "effective radius" of
that set in the sense of volume is determined up to a factor which is a (small)
power of N, and thus precisely on the scale of powers of its dimension.
Additionally, one of the appendices contains sharp estimates (by known methods)
for the expected values of norms of the GUE random matrices. We employ standard
tools of classical convexity, high-dimensional probability and geometry of
Banach spaces.
@misc{szarek2003volume,
abstract = {In this note we give sharp estimates on the volume of the set of separable
states on N qubits. In particular, the magnitude of the "effective radius" of
that set in the sense of volume is determined up to a factor which is a (small)
power of N, and thus precisely on the scale of powers of its dimension.
Additionally, one of the appendices contains sharp estimates (by known methods)
for the expected values of norms of the GUE random matrices. We employ standard
tools of classical convexity, high-dimensional probability and geometry of
Banach spaces.},
added-at = {2021-01-02T15:25:00.000+0100},
author = {Szarek, Stanislaw},
biburl = {https://www.bibsonomy.org/bibtex/26956432e97e2608be03233524b654be0/cmcneile},
description = {The volume of separable states is super-doubly-exponentially small},
doi = {10.1103/PhysRevA.72.032304},
interhash = {4ab5bcd7a6c3c573b7829c523ccd383f},
intrahash = {6956432e97e2608be03233524b654be0},
keywords = {quantumcomputing},
note = {cite arxiv:quant-ph/0310061Comment: 20 p., LATEX; an expanded version of the original submission: more background material from convexity and geometry of Banach spaces, more exhaustive bibliography and improved quality of references to the bibliography},
timestamp = {2021-01-02T15:25:00.000+0100},
title = {The volume of separable states is super-doubly-exponentially small},
url = {http://arxiv.org/abs/quant-ph/0310061},
year = 2003
}