Related papers: Quantum Speed Limit From Tighter Uncertainty Relation

Quantum Speed Limit From Tighter Uncertainty Relation

URL: http://arxiv.org/abs/2211.14561v1
Date: Sat, 26 Nov 2022 13:14:58 GMT
Title: Quantum Speed Limit From Tighter Uncertainty Relation
Authors: Shrobona Bagchi, Abhay Srivastav, Arun Kumar Pati
Abstract summary: We prove a new quantum speed limit using the tighter uncertainty relations for pure quantum systems undergoing arbitrary unitary evolution. We show that the MT bound is a special case of the tighter quantum speed limit derived here. We illustrate the tighter speed limit for pure states with examples using random Hamiltonians and show that the new quantum speed limit outperforms the MT bound.
Score: 0.0
License: http://creativecommons.org/publicdomain/zero/1.0/
Abstract: The quantum speed limit provides a fundamental bound on how fast a quantum system can evolve between the initial and the final states under any physical operation. The celebrated Mandelstam-Tamm (MT) bound has been widely studied for various quantum systems undergoing unitary time evolution. Here, we prove a new quantum speed limit using the tighter uncertainty relations for pure quantum systems undergoing arbitrary unitary evolution. We also derive a tighter uncertainty relation for mixed quantum states and then derive a new quantum speed limit for mixed quantum states from it such that it reduces to that of the pure quantum states derived from tighter uncertainty relations. We show that the MT bound is a special case of the tighter quantum speed limit derived here. We also show that this bound can be improved when optimized over many different sets of basis vectors. We illustrate the tighter speed limit for pure states with examples using random Hamiltonians and show that the new quantum speed limit outperforms the MT bound.

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