Capturing Exponential Variance Using Polynomial Resources: Applying Tensor Networks to Nonequilibrium Stochastic Processes

Physical Review Letters American Physical Society 114:9 (2015) 090602

Authors:

Tomi Johnson, Thomas Elliott, Stephen Clark, Dieter Jaksch

Abstract:

Estimating the expected value of an observable appearing in a nonequilibrium stochastic process usually involves sampling. If the observable’s variance is high, many samples are required. In contrast, we show that performing the same task without sampling, using tensor network compression, efficiently captures high variances in systems of various geometries and dimensions. We provide examples for which matching the accuracy of our efficient method would require a sample size scaling exponentially with system size. In particular, the high-variance observable exp(−βW), motivated by Jarzynski’s equality, with W the work done quenching from equilibrium at inverse temperature β, is exactly and efficiently captured by tensor networks.

Integrable non-equilibrium steady state density operators for boundary driven XXZ spin chains: observables and full counting statistics

(2015)

Authors:

Tomaz Prosen, Berislav Buca

Nondestructive selective probing of phononic excitations in a cold Bose gas using impurities

Physical Review A American Physical Society (APS) 91:1 (2015) 013611

Authors:

D Hangleiter, MT Mitchison, TH Johnson, M Bruderer, MB Plenio, D Jaksch

What is a quantum simulator?

EPJ Quantum Technology Springer Nature 1:1 (2014) 10

Authors:

Tomi H Johnson, Stephen R Clark, Dieter Jaksch

Spectral analysis of finite-time correlation matrices near equilibrium phase transitions

EPL (Europhysics Letters) IOP Publishing 108:2 (2014) 20006

Authors:

Vinayak, T Prosen, B Buča, TH Seligman