Matrix product operator algebras II: phases of matter for 1D mixed states



Downloads per month over past year

Ruiz de Alarcón, Alberto and Garre Rubio, Jose and Molnár, Andras and Pérez García, David Matrix product operator algebras II: phases of matter for 1D mixed states. (Unpublished)

[thumbnail of perezgarcia_matrixII.pdf]


The classification of topological phases of matter is fundamental to understand and characterize the properties of quantum materials. In this paper we study phases of matter in one-dimensional open quantum systems.
We define two mixed states to be in the same phase if both states can be transformed into the other by a shallow circuit of local quantum channels.
We aim to understand the phase diagram of matrix product density operators that are renormalization fixed points. These states arise, for example, as boundaries of two-dimensional topologically ordered states. We first construct families of such states based on C*-weak Hopf algebras, the algebras whose representations form a fusion category. More concretely, we provide explicit local fine-graining and local coarse-graining quantum channels for the renormalization procedure of these states. Finally, we prove that those arising from C*-Hopf algebras are in the trivial phase.

Item Type:Article
Uncontrolled Keywords:Mathematical Physics; Quantum Physics; Strongly Correlated Electrons
Palabras clave (otros idiomas):Física matemática
Subjects:Sciences > Mathematics
Sciences > Mathematics > Mathematical analysis
ID Code:73502
Deposited On:07 Jul 2022 12:09
Last Modified:07 Jul 2022 12:25

Origin of downloads

Repository Staff Only: item control page