Vishal Katariya scite author profile

Energy-time uncertainty plays an important role in quantum foundations and technologies, and it was even discussed by the founders of quantum mechanics. However, standard approaches (e.g., Robertson's uncertainty relation) do not apply to energy-time uncertainty because, in general, there is no Hermitian operator associated with time. Following previous approaches, we quantify time uncertainty by how well one can read off the time from a quantum clock. We then use entropy to quantify the information-theoretic distinguishability of the various time states of the clock. Our main result is an entropic energy-time uncertainty relation for general time-independent Hamiltonians, stated for both the discrete-time and continuous-time cases. Our uncertainty relation is strong, in the sense that it allows for a quantum memory to help reduce the uncertainty, and this formulation leads us to reinterpret it as a bound on the relative entropy of asymmetry. Due to the operational relevance of entropy, we anticipate that our uncertainty relation will have information-processing applications.arXiv:1805.07772v2 [quant-ph]

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Geometric distinguishability measures limit quantum channel estimation and discrimination

Katariya

Wilde

2021

Quantum Inf Process

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Guesswork With Quantum Side Information

Hanson

Katariya

Datta

et al. 2022

IEEE Trans. Inform. Theory

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Evaluating the advantage of adaptive strategies for quantum channel distinguishability

Katariya

Wilde

2021

Phys. Rev. A

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Quantum state discrimination circuits inspired by Deutschian closed timelike curves

2022

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Vishal Katariya

Entropic Energy-Time Uncertainty Relation

Geometric distinguishability measures limit quantum channel estimation and discrimination

Guesswork With Quantum Side Information

Evaluating the advantage of adaptive strategies for quantum channel distinguishability

Quantum state discrimination circuits inspired by Deutschian closed timelike curves

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