Add to ORKGWe study tensor network states defined on an underlying graph which is sparsely connected. Generic sparse graphs are expander graphs with a high probability, and one can represent volume law entangled states efficiently with only polynomial resources. We find that message-passing inference algorithms such as belief propagation can lead to efficient computation of local expectation values for a class of tensor network states defined on sparse graphs. As applications, we study local properties of square root states, graph states, and also employ this method to variationally prepare ground states of gapped Hamiltonians defined on generic graphs. Using the variational method we study the phase diagram of the transverse field quantum Ising model...
Tensor network states provide successful descriptions of strongly correlated quantum systems with ap...
We discuss the successes and limitations of statistical sampling for a sequence of models studied in...
We present a novel mapping for studying 2D many-body quantum systems by solving an effective, one-di...
We propose a simple and generic construction of the variational tensor network operators to study th...
We present a compendium of numerical simulation techniques, based on tensor network methods, aiming...
Determining the properties of quantum many-body systems is a central challenge in modern physics. Be...
Exact many-body quantum problems are known to be computationally hard due to the exponential scaling...
Tensor network states are used to approximate ground states of local Hamiltonians on a lattice in D ...
Tensor Network States are ans\'atze for the efficient description of quantum many-body systems. Thei...
Tensor network theory and quantum simulation are, respectively, the key classical and quantum comput...
Tensor networks (TNs) have become one of the most essential building blocks for various fields of th...
Tensor networks are powerful factorization techniques which reduce resource requirements for numeric...
TeNeS (Tensor Network Solver) is a free/libre open-source software program package for calculating t...
Theory of quantum many-body systems plays a key role in understanding the properties of phases of ma...
Within the reduced basis methods approach, an effective low-dimensional subspace of a quantum many-b...
Tensor network states provide successful descriptions of strongly correlated quantum systems with ap...
We discuss the successes and limitations of statistical sampling for a sequence of models studied in...
We present a novel mapping for studying 2D many-body quantum systems by solving an effective, one-di...
We propose a simple and generic construction of the variational tensor network operators to study th...
We present a compendium of numerical simulation techniques, based on tensor network methods, aiming...
Determining the properties of quantum many-body systems is a central challenge in modern physics. Be...
Exact many-body quantum problems are known to be computationally hard due to the exponential scaling...
Tensor network states are used to approximate ground states of local Hamiltonians on a lattice in D ...
Tensor Network States are ans\'atze for the efficient description of quantum many-body systems. Thei...
Tensor network theory and quantum simulation are, respectively, the key classical and quantum comput...
Tensor networks (TNs) have become one of the most essential building blocks for various fields of th...
Tensor networks are powerful factorization techniques which reduce resource requirements for numeric...
TeNeS (Tensor Network Solver) is a free/libre open-source software program package for calculating t...
Theory of quantum many-body systems plays a key role in understanding the properties of phases of ma...
Within the reduced basis methods approach, an effective low-dimensional subspace of a quantum many-b...
Tensor network states provide successful descriptions of strongly correlated quantum systems with ap...
We discuss the successes and limitations of statistical sampling for a sequence of models studied in...
We present a novel mapping for studying 2D many-body quantum systems by solving an effective, one-di...