Add to ORKGIt is believed that most (perhaps all) gapped phases of matter can be described at long distances by topological quantum field theory (TQFT). On the other hand, it has been rigorously established that in 1+1d ground states of gapped Hamiltonians can be approximated by matrix product states (MPS). We show that the state-sum construction of 2d TQFT naturally leads to MPS in their standard form. In the case of systems with a global symmetry G , this leads to a classification of gapped phases in 1+1d in terms of Morita-equivalence classes of G-equivariant algebras. Nonuniqueness of the MPS representation is traced to the freedom of choosing an algebra in a particular Morita class. In the case of short-range entangled phases, we recover the gro...
We study aspects of gapped phases of matter, focusing on their classification, including the group l...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...
It is believed that most (perhaps all) gapped phases of matter can be described at long distances by...
We study state-sum constructions of G-equivariant spin topological quantum field theory (TQFTs) and...
We study state-sum constructions of G-equivariant spin topological quantum field theory (TQFTs) and...
The classification of topological phases of matter is fundamental to understand and characterize the...
Abstract Matrix Product States (MPSs) provide a powerful framework to study and classify gapped quan...
We give a classification of gapped quantum phases of one-dimensional systems in the framework of mat...
We give a classification of gapped quantum phases of one-dimensional systems in the framework of mat...
The classification of topological phases of matter is fundamental to understand and characterize the...
Models whose ground states can be written as an exact matrix-product state (MPS) provide valuable in...
Models whose ground states can be written as an exact matrix-product state (MPS) provide valuable in...
We extend the formalism ofMatrix Product States (MPS) to describe one-dimensional gapped systems of ...
Models whose ground states can be written as an exact matrix product state (MPS) provide valuable in...
We study aspects of gapped phases of matter, focusing on their classification, including the group l...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...
It is believed that most (perhaps all) gapped phases of matter can be described at long distances by...
We study state-sum constructions of G-equivariant spin topological quantum field theory (TQFTs) and...
We study state-sum constructions of G-equivariant spin topological quantum field theory (TQFTs) and...
The classification of topological phases of matter is fundamental to understand and characterize the...
Abstract Matrix Product States (MPSs) provide a powerful framework to study and classify gapped quan...
We give a classification of gapped quantum phases of one-dimensional systems in the framework of mat...
We give a classification of gapped quantum phases of one-dimensional systems in the framework of mat...
The classification of topological phases of matter is fundamental to understand and characterize the...
Models whose ground states can be written as an exact matrix-product state (MPS) provide valuable in...
Models whose ground states can be written as an exact matrix-product state (MPS) provide valuable in...
We extend the formalism ofMatrix Product States (MPS) to describe one-dimensional gapped systems of ...
Models whose ground states can be written as an exact matrix product state (MPS) provide valuable in...
We study aspects of gapped phases of matter, focusing on their classification, including the group l...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...
We extend the formalism of matrix product states (MPS) to describe one-dimensional gapped systems of...