Fundamental Limits on Correlated Catalytic State Transformations
- URL: http://arxiv.org/abs/2111.13356v2
- Date: Mon, 22 Aug 2022 05:18:13 GMT
- Title: Fundamental Limits on Correlated Catalytic State Transformations
- Authors: Roberto Rubboli and Marco Tomamichel
- Abstract summary: We show that a small residual correlation between catalyst and target state implies that the catalyst needs to be highly resourceful.
In addition, we establish that in imperfect a small error generally implies a highly resourceful catalyst.
- Score: 15.609988622100532
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: Determining whether a given state can be transformed into a target state
using free operations is one of the fundamental questions in the study of
resources theories. Free operations in resource theories can be enhanced by
allowing for a catalyst system that assists the transformation and is returned
unchanged, but potentially correlated, with the target state. While this has
been an active area of recent research, very little is known about the
necessary properties of such catalysts. Here, we prove fundamental limits
applicable to a large class of correlated catalytic transformations by showing
that a small residual correlation between catalyst and target state implies
that the catalyst needs to be highly resourceful. In fact, the resources
required diverge in the limit of vanishing residual correlation. In addition,
we establish that in imperfect catalysis a small error generally implies a
highly resourceful embezzling catalyst. We develop our results in a general
resource theory framework and discuss its implications for the resource theory
of athermality, the resource theory of coherence and entanglement theory.
Related papers
- Finite-size catalysis in quantum resource theories [1.1510009152620668]
Quantum, the ability to enable previously impossible transformations by using auxiliary systems without degrading them, has emerged as a powerful tool in various resource theories.
We show how one can drastically reduce the required dimension of the catalyst thus enabling efficient catalytic transformations with minimal resources.
Notably, we discover a fascinating phenomenon of catalytic resonance: tailoring the catalysts's state, one can drastically reduce the required dimension of the catalyst thus enabling efficient catalytic transformations with minimal resources.
arXiv Detail & Related papers (2024-05-14T19:08:55Z) - Demonstration of energy extraction gain from non-classical correlations [62.615368802619116]
We show that entanglement governs the amount of extractable energy in a controllable setting.
By quantifying both the concurrence of the two-qubit resource state and the energy extraction gain from applying the feedback policy, we corroborate the connection between information and energy.
arXiv Detail & Related papers (2024-04-23T08:44:07Z) - Catalytic transformations for thermal operations [0.0]
This work focuses on transformations between energy-incoherent states under the most general energy-conserving interactions among the system, the catalyst, and a thermal environment.
The sole constraint is that the catalyst must return unperturbed and uncorrelated with the other subsystems.
arXiv Detail & Related papers (2024-03-07T19:00:31Z) - No-go theorem for entanglement distillation using catalysis [49.24817625059456]
We show that catalytic transformations can never allow for the distillation of entanglement from a bound entangled state.
This precludes the possibility that entanglement theoryally reversible based operations under even permissive choices.
arXiv Detail & Related papers (2023-05-05T12:57:59Z) - Catalytic and asymptotic equivalence for quantum entanglement [68.8204255655161]
Many-copy entanglement manipulation procedures allow for highly entangled pure states from noisy states.
We show that using an entangled catalyst cannot enhance the singlet distillation rate of a distillable quantum state.
Our findings provide a comprehensive understanding of the capabilities and limitations of both catalytic and state transformations of entangled states.
arXiv Detail & Related papers (2023-05-05T12:57:59Z) - Learned Force Fields Are Ready For Ground State Catalyst Discovery [60.41853574951094]
We present evidence that learned density functional theory (DFT'') force fields are ready for ground state catalyst discovery.
Key finding is that relaxation using forces from a learned potential yields structures with similar or lower energy to those relaxed using the RPBE functional in over 50% of evaluated systems.
We show that a force field trained on a locally harmonic energy surface with the same minima as a target DFT energy is also able to find lower or similar energy structures in over 50% of cases.
arXiv Detail & Related papers (2022-09-26T07:16:43Z) - One-Shot Yield-Cost Relations in General Quantum Resource Theories [5.37133760455631]
We establish a relation between the one-shot distillable resource yield and dilution cost.
We show that our techniques provide strong converse bounds relating the distillable resource and resource dilution cost in the regime.
arXiv Detail & Related papers (2021-10-05T17:59:30Z) - Correlation in Catalysts Enables Arbitrary Manipulation of Quantum
Coherence [0.0]
We show that allowing correlation among multiple catalysts can offer arbitrary power in the manipulation of quantum coherence.
This presents a new type of embezzlement-like phenomenon, in which the resource embezzlement is attributed to the correlation generated among multiple catalysts.
arXiv Detail & Related papers (2021-06-23T18:00:04Z) - Correlational Resource Theory of Catalytic Quantum Randomness under
Conservation Law [0.0]
We establish a theory of one-shot catalytic randomness in which uncorrelatedness is consumed in randomness.
We show how much degeneracy of quantum state can boost the catalytic entropy beyond its ordinary entropy.
We apply this theory to systems under conservation law that forbids superposition of certain quantum states.
arXiv Detail & Related papers (2021-04-01T07:11:49Z) - Localisation in quasiperiodic chains: a theory based on convergence of
local propagators [68.8204255655161]
We present a theory of localisation in quasiperiodic chains with nearest-neighbour hoppings, based on the convergence of local propagators.
Analysing the convergence of these continued fractions, localisation or its absence can be determined, yielding in turn the critical points and mobility edges.
Results are exemplified by analysing the theory for three quasiperiodic models covering a range of behaviour.
arXiv Detail & Related papers (2021-02-18T16:19:52Z) - RelWalk A Latent Variable Model Approach to Knowledge Graph Embedding [50.010601631982425]
This paper extends the random walk model (Arora et al., 2016a) of word embeddings to Knowledge Graph Embeddings (KGEs)
We derive a scoring function that evaluates the strength of a relation R between two entities h (head) and t (tail)
We propose a learning objective motivated by the theoretical analysis to learn KGEs from a given knowledge graph.
arXiv Detail & Related papers (2021-01-25T13:31:29Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.