Quantum Graphs: Different Perspectives
Abstract
In this thesis, we investigate two different notions of quantum graphs. The first
approach is through quantum adjacency matrices, while, the second approach is
through bimodules over finite-dimensional algebras. We establish the equivalence
between these approaches, following the work by M. Daws [Daw24]. Along the
way, we explore the role of quantum graphs as operator systems within the context
of quantum information theory, serving as an extension of confusability graphs in
classical information theory. Furthermore, we explore the concept of quantum isomorphism
between quantum graphs. We use the standard definition of quantum
isomorphism, defined via the quantum adjacency matrix approach, to introduce an
equivalent notion in the bimodules approach (employing the equivalence between
the approaches). The goal of this work is to present and contribute to the growing
knowledge of quantum graphs and isomorphisms between them.
Degree
Student essay
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Date
2024-07-04Author
Stancevic, Dejan
Keywords
Quantum Graphs, Quantum Information, Quantum Isomorphism, Operator Algebras, Operator Systems, Finite-Dimensional C*-Algebras
Language
eng