Add to ORKGExact many-body quantum problems are known to be computationally hard due to the exponential scaling of the numerical resources required. Since the advent of the Density Matrix Renormalization Group, it became clear that a successful strategy to work around this obstacle was to develop numerical methods based on the well-known theoretical renormalization group. In recent years, it was realized that quantum states engineered via numerical renormalization allow a variational representation in terms of a tensor network picture. The discovery provided a further boost to the effectiveness of these techniques, not only due to the increased flexibility and manipulability, but also because tensor network states embed a direct interface to the entan...
This thesis contributes to developing and applying tensor network methods to simulate correlated man...
Theory of quantum many-body systems plays a key role in understanding the properties of phases of ma...
Abstract Tensor Networks are non-trivial representations of high-dimensional tensors, originally des...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
This volume of lecture notes briefly introduces the basic concepts needed in any computational physi...
Tensor networks (TNs) have become one of the most essential building blocks for various fields of th...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
The physical properties of a quantum many-body system can, in principle, be determined by diagonaliz...
Understanding and classifying phases of matter is a vast and important area of research in modern ph...
The curse of dimensionality associated with the Hilbert space of spin systems provides a significant...
The curse of dimensionality associated with the Hilbert space of spin systems provides a significant...
We present a compendium of numerical simulation techniques, based on tensor network methods, aiming...
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 states are ubiquitous in the investigation of quantum many-body (QMB) physics. Their ...
This thesis contributes to developing and applying tensor network methods to simulate correlated man...
Theory of quantum many-body systems plays a key role in understanding the properties of phases of ma...
Abstract Tensor Networks are non-trivial representations of high-dimensional tensors, originally des...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
This volume of lecture notes briefly introduces the basic concepts needed in any computational physi...
Tensor networks (TNs) have become one of the most essential building blocks for various fields of th...
Tensor network is a fundamental mathematical tool with a huge range of applications in physics, such...
The physical properties of a quantum many-body system can, in principle, be determined by diagonaliz...
Understanding and classifying phases of matter is a vast and important area of research in modern ph...
The curse of dimensionality associated with the Hilbert space of spin systems provides a significant...
The curse of dimensionality associated with the Hilbert space of spin systems provides a significant...
We present a compendium of numerical simulation techniques, based on tensor network methods, aiming...
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 states are ubiquitous in the investigation of quantum many-body (QMB) physics. Their ...
This thesis contributes to developing and applying tensor network methods to simulate correlated man...
Theory of quantum many-body systems plays a key role in understanding the properties of phases of ma...
Abstract Tensor Networks are non-trivial representations of high-dimensional tensors, originally des...