Matrix Product States and Projected Entangled Pair States: Concepts,
Symmetries, and Theorems
- URL: http://arxiv.org/abs/2011.12127v2
- Date: Mon, 9 Aug 2021 23:17:16 GMT
- Title: Matrix Product States and Projected Entangled Pair States: Concepts,
Symmetries, and Theorems
- Authors: Ignacio Cirac, David Perez-Garcia, Norbert Schuch and Frank Verstraete
- Abstract summary: The theory of entanglement provides a fundamentally new language for describing interactions and correlations in many body systems.
We review how matrix product states and projected entangled pair states describe many-body wavefunctions in terms of local tensors.
We discuss how tensor networks enable the construction of real-space renormalization group flows and fixed points, and examine the entanglement structure of states exhibiting topological quantum order.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: The theory of entanglement provides a fundamentally new language for
describing interactions and correlations in many body systems. Its vocabulary
consists of qubits and entangled pairs, and the syntax is provided by tensor
networks. We review how matrix product states and projected entangled pair
states describe many-body wavefunctions in terms of local tensors. These
tensors express how the entanglement is routed, act as a novel type of
non-local order parameter, and we describe how their symmetries are reflections
of the global entanglement patterns in the full system. We will discuss how
tensor networks enable the construction of real-space renormalization group
flows and fixed points, and examine the entanglement structure of states
exhibiting topological quantum order. Finally, we provide a summary of the
mathematical results of matrix product states and projected entangled pair
states, highlighting the fundamental theorem of matrix product vectors and its
applications.
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