Add to ORKGWe present several results relating to the contraction of generic tensor networks and discuss their application to the simulation of quantum many-body systems using variational approaches based upon tensor network states. Given a closed tensor network T, we prove that if the environment of a single tensor from the network can be evaluated with computational cost κ, then the environment of any other tensor from T can be evaluated with identical cost κ. Moreover, we describe how the set of all single tensor environments from T can be simultaneously evaluated with fixed cost 3κ. The usefulness of these results, which are applicable to a variety of tensor network methods, is demonstrated for the optimization of a multiscale entanglement renorma...
Several tensor networks are built of isometric tensors, i.e. tensors satisfying W?W = 1. Prominent e...
Tensors are a natural generalization of matrices, and tensor networks are a natural generalization o...
Tensor networks capture large classes of ground states of phases of quantum matter faithfully and ef...
We present several results relating to the contraction of generic tensor networks and discuss their ...
Tensor network states are powerful variational Ansätze for many-body ground states of quantum lattic...
Tensor network states provide an efficient class of states that faithfully capture strongly correlat...
Monte Carlo sampling techniques have been proposed as a strategy to reduce the computational cost of...
An efficient representation of a quantum circuit is of great importance in achieving a quantum advan...
Màster Oficial de Ciència i Tecnologia Quàntiques / Quantum Science and Technology, Facultat de Físi...
Tensor networks represent the state-of-the-art in computational methods across many disciplines, inc...
This thesis contributes to developing and applying tensor network methods to simulate correlated man...
We revisit the corner transfer matrix renormalization group (CTMRG) method of Nishino and Okunishi f...
In the last years, the classical simulation of quantum systems is growing as a good approach to prov...
Exact many-body quantum problems are known to be computationally hard due to the exponential scaling...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
Several tensor networks are built of isometric tensors, i.e. tensors satisfying W?W = 1. Prominent e...
Tensors are a natural generalization of matrices, and tensor networks are a natural generalization o...
Tensor networks capture large classes of ground states of phases of quantum matter faithfully and ef...
We present several results relating to the contraction of generic tensor networks and discuss their ...
Tensor network states are powerful variational Ansätze for many-body ground states of quantum lattic...
Tensor network states provide an efficient class of states that faithfully capture strongly correlat...
Monte Carlo sampling techniques have been proposed as a strategy to reduce the computational cost of...
An efficient representation of a quantum circuit is of great importance in achieving a quantum advan...
Màster Oficial de Ciència i Tecnologia Quàntiques / Quantum Science and Technology, Facultat de Físi...
Tensor networks represent the state-of-the-art in computational methods across many disciplines, inc...
This thesis contributes to developing and applying tensor network methods to simulate correlated man...
We revisit the corner transfer matrix renormalization group (CTMRG) method of Nishino and Okunishi f...
In the last years, the classical simulation of quantum systems is growing as a good approach to prov...
Exact many-body quantum problems are known to be computationally hard due to the exponential scaling...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
Several tensor networks are built of isometric tensors, i.e. tensors satisfying W?W = 1. Prominent e...
Tensors are a natural generalization of matrices, and tensor networks are a natural generalization o...
Tensor networks capture large classes of ground states of phases of quantum matter faithfully and ef...