Monday, January 23, 2023

4:00-5:00 PM

Virtual

We study the statistical behavior of quantum entanglement in bipartite systems over fermionic Gaussian states as measured by von Neumann entropy. The formulas of average von Neumann entropy with and without particle number constrains have been recently obtained, whereas the main results of this work are the exact yet explicit formulas of variances for both cases. For the latter case of no particle number constrain, the results resolve a recent conjecture on the corresponding variance. Different than the existing methods in computing variances over other generic state models, proving the results of this work relies on a new simplification framework. The framework consists of a set of new tools in simplifying finite summations of what we refer to as dummy summation and re-summation techniques. As a byproduct, the proposed framework leads to various new transformation formulas of hypergeometric functions. This talk is based on the joint work with Lu Wei available at
https://arxiv.org/abs/2211.16709

A recording of the talk can be found here: https://youtu.be/sGdpLRdiorI

A recording of the talk can be found here: https://youtu.be/sGdpLRdiorI

Building: | Off Campus Location |
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Location: | Virtual |

Event Type: | Workshop / Seminar |

Tags: | Mathematics, Virtual |

Source: | Happening @ Michigan from Integrable Systems and Random Matrix Theory Seminar - Department of Mathematics, Department of Mathematics |