The resource theory of tensor networks

By Freek Witteveen

Appears in collection : 2024 - PC2 - Random tensors and related topics

Tensor networks provide succinct representations of quantum many-body states and are an important computational tool for strongly correlated quantum systems. Their expressive and computational power is characterized by an underlying entanglement structure, on a lattice or more generally a (hyper)graph, with virtual entangled pairs or multipartite entangled states associated to (hyper)edges. Changing this underlying entanglement structure into another can lead to both theoretical and computational benefits. In this talk I will explain results from arXiv:2307.07394, where we study a resource theory which generalizes the notion of bond dimension to entanglement structures using multipartite entanglement. It is a direct extension of resource theories of tensors studied in the context of multipartite entanglement and algebraic complexity theory, allowing for the application of the sophisticated methods developed in these fields to tensor networks.

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  • DOI 10.57987/IHP.2024.PC2.018
  • Cite this video Witteveen, Freek (18/10/2024). The resource theory of tensor networks. IHP. Audiovisual resource. DOI: 10.57987/IHP.2024.PC2.018
  • URL https://dx.doi.org/10.57987/IHP.2024.PC2.018

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