We establish an efficient approximation algorithm for the partition functions of a class of quantum spin systems at low temperature, which can be viewed as stable quantum perturbations of classical spin systems. Our algorithm is based on combining the contour representation of quantum spin systems of this type due to Borgs, Koteck\'y, and Ueltschi with the algorithmic framework developed by Helmuth, Perkins, and Regts, and Borgs et al.Comment: 12 pages, 0 figure
We use the newly developed finite temperature Lanczos algorithm to calculate the finite temperature ...
We have recently shown that the partition function of any classical spin model, including all discre...
We present a quantum algorithm for the microcanonical thermal pure quantum (TPQ) method, which has a...
We establish a polynomial-time approximation algorithm for partition functions of quantum spin model...
Computing finite temperature properties of a quantum many-body system is key to describing a broad r...
Thesis (Ph.D.)--University of Washington, 2015In this dissertation we study classical and quantum sp...
We present two algorithms, one quantum and one classical, for estimating partition functions of quan...
A simple Monte Carlo high-temperature expansion method to evaluate the partition function of quantum...
We provide a quantum algorithm for the exact evaluation of the Potts partition function for a certai...
We establish a polynomial-time approximation algorithm for partition functions of quantum spin model...
A scheme for measuring complex temperature partition functions of Ising models is introduced. Two ap...
We present two algorithms, one quantum and one classical, for estimating partition functions of quan...
. We consider a quantum spin system with Hamiltonian H = H (0) + V; where H (0) is diagonal in...
We introduce a quantum decomposition algorithm (QDA) that decomposes the problem $\frac{\partial \rh...
This thesis contains two results for the low temperature behavior of quantum spin systems. ...
We use the newly developed finite temperature Lanczos algorithm to calculate the finite temperature ...
We have recently shown that the partition function of any classical spin model, including all discre...
We present a quantum algorithm for the microcanonical thermal pure quantum (TPQ) method, which has a...
We establish a polynomial-time approximation algorithm for partition functions of quantum spin model...
Computing finite temperature properties of a quantum many-body system is key to describing a broad r...
Thesis (Ph.D.)--University of Washington, 2015In this dissertation we study classical and quantum sp...
We present two algorithms, one quantum and one classical, for estimating partition functions of quan...
A simple Monte Carlo high-temperature expansion method to evaluate the partition function of quantum...
We provide a quantum algorithm for the exact evaluation of the Potts partition function for a certai...
We establish a polynomial-time approximation algorithm for partition functions of quantum spin model...
A scheme for measuring complex temperature partition functions of Ising models is introduced. Two ap...
We present two algorithms, one quantum and one classical, for estimating partition functions of quan...
. We consider a quantum spin system with Hamiltonian H = H (0) + V; where H (0) is diagonal in...
We introduce a quantum decomposition algorithm (QDA) that decomposes the problem $\frac{\partial \rh...
This thesis contains two results for the low temperature behavior of quantum spin systems. ...
We use the newly developed finite temperature Lanczos algorithm to calculate the finite temperature ...
We have recently shown that the partition function of any classical spin model, including all discre...
We present a quantum algorithm for the microcanonical thermal pure quantum (TPQ) method, which has a...