Asymptotic work statistics of periodically driven Ising chains. (26th August 2015)
- Record Type:
- Journal Article
- Title:
- Asymptotic work statistics of periodically driven Ising chains. (26th August 2015)
- Main Title:
- Asymptotic work statistics of periodically driven Ising chains
- Authors:
- Russomanno, Angelo
Sharma, Shraddha
Dutta, Amit
Santoro, Giuseppe E - Abstract:
- Abstract: We study the work statistics of a periodically-driven integrable closed quantum system, addressing in particular the role played by the presence of a quantum critical point. Taking the example of a one-dimensional transverse Ising model in the presence of a spatially homogeneous but periodically time-varying transverse field of frequency, we arrive at the characteristic cumulant generating function G ( u ), which is then used to calculate the work distribution function P ( W ). By applying the Floquet theory we show that, in the infinite time limit, P ( W ) converges, starting from the initial ground state, towards an asymptotic steady state value whose small- W behaviour depends only on the properties of the small-wave-vector modes and on a few important ingredients: the time-averaged value of the transverse field, h 0, the initial transverse field, , and the equilibrium quantum critical point, which we find to generate a sequence of non-equilibrium critical points, with l integer. When, we find a 'universal' edge singularity in P ( W ) at a threshold value of which is entirely determined by . The form of that singularity—Dirac delta derivative or square root—depends on h 0 being or not at a non-equilibrium critical point h * l . On the contrary, when, G ( u ) decays as a power-law for large u, leading to different types of edge singularity at . Generalizing our calculations to the case in which we initialize the system in a finite temperature density matrix, theAbstract: We study the work statistics of a periodically-driven integrable closed quantum system, addressing in particular the role played by the presence of a quantum critical point. Taking the example of a one-dimensional transverse Ising model in the presence of a spatially homogeneous but periodically time-varying transverse field of frequency, we arrive at the characteristic cumulant generating function G ( u ), which is then used to calculate the work distribution function P ( W ). By applying the Floquet theory we show that, in the infinite time limit, P ( W ) converges, starting from the initial ground state, towards an asymptotic steady state value whose small- W behaviour depends only on the properties of the small-wave-vector modes and on a few important ingredients: the time-averaged value of the transverse field, h 0, the initial transverse field, , and the equilibrium quantum critical point, which we find to generate a sequence of non-equilibrium critical points, with l integer. When, we find a 'universal' edge singularity in P ( W ) at a threshold value of which is entirely determined by . The form of that singularity—Dirac delta derivative or square root—depends on h 0 being or not at a non-equilibrium critical point h * l . On the contrary, when, G ( u ) decays as a power-law for large u, leading to different types of edge singularity at . Generalizing our calculations to the case in which we initialize the system in a finite temperature density matrix, the irreversible entropy generated by the periodic driving is also shown to reach a steady state value in the infinite time limit. … (more)
- Is Part Of:
- Journal of statistical mechanics. (2015:Aug.)
- Journal:
- Journal of statistical mechanics
- Issue:
- (2015:Aug.)
- Issue Display:
- Volume 1000008 (2015)
- Year:
- 2015
- Volume:
- 1000008
- Issue Sort Value:
- 2015-1000008-0000-0000
- Page Start:
- Page End:
- Publication Date:
- 2015-08-26
- Subjects:
- 2 -- 4
2/360 -- 4/203 -- 2/294
Statistical mechanics -- Periodicals
Mechanics -- Statistical methods -- Periodicals
530.1305 - Journal URLs:
- http://ioppublishing.org/ ↗
- DOI:
- 10.1088/1742-5468/2015/08/P08030 ↗
- Languages:
- English
- ISSNs:
- 1742-5468
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 8467.xml