Claudia Yao scite author profile

Claudia Yao

3Publications

0Citation Statements Received

83Citation Statements Given

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University of Chicago

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Systematic generation of Hamiltonian families with dualities

Fruchart¹,

Yao²,

Vitelli³

2021

Preprint

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Dualities are hidden symmetries that map seemingly unrelated physical systems onto each other. The goal of this work is to systematically construct families of Hamiltonians endowed with a given duality and to provide a universal description of Hamiltonians families near self-dual points. We focus on tight-binding models (also known as coupled-mode theories), which provide an effective description of systems composed of coupled harmonic oscillators across physical domains. We start by considering the general case in which group-theoretical arguments suffice to construct families of Hamiltonians with dualities by combining irreducible representations of the duality operation in parameter space and in operator space. When additional constraints due to system specific features are present, a purely group theoretic approach is no longer sufficient. To overcome this complication, we reformulate the existence of a duality as a minimization problem which is amenable to standard optimization and numerical continuation algorithms. Combined with existing procedures to physically implement coupled-resonator Hamiltonians, our approach enables on demand design of photonic, mechanical, thermal, or electronic metamaterials with dualities.

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Systematic generation of Hamiltonian families with dualities

Fruchart

Yao

Vitelli

2023

Phys. Rev. Research

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Automorphisms of the fine curve graph

Long¹,

Margalit²,

Pham³

et al. 2021

Preprint

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Claudia Yao

Systematic generation of Hamiltonian families with dualities

Systematic generation of Hamiltonian families with dualities

Automorphisms of the fine curve graph

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