The Quantum Geometric Tensor in a Parameter Dependent Curved Space
- URL: http://arxiv.org/abs/2209.07728v1
- Date: Fri, 16 Sep 2022 05:52:32 GMT
- Title: The Quantum Geometric Tensor in a Parameter Dependent Curved Space
- Authors: Joan A. Austrich-Olivares and J. David Vergara
- Abstract summary: We introduce a quantum geometric tensor in a curved space with a parameter-dependent metric.
It contains the quantum metric tensor as the symmetric part and the Berry curvature corresponding to the antisymmetric part.
- Score: 0.0
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: We introduce a quantum geometric tensor in a curved space with a
parameter-dependent metric, which contains the quantum metric tensor as the
symmetric part and the Berry curvature corresponding to the antisymmetric part.
This parameter-dependent metric modifies the usual inner product, which induces
modifications in the quantum metric tensor and Berry curvature by adding terms
proportional to the derivatives with respect to the parameters of the
determinant of the metric. The quantum metric tensor is obtained in two ways:
By using the definition of the infinitesimal distance between two states in the
parameter-dependent curved space and via the fidelity susceptibility approach.
The usual Berry connection acquires an additional term with which the curved
inner product converts the Berry connection into an object that transforms as a
connection and density of weight one. Finally, we provide three examples in one
dimension with a nontrivial metric: an anharmonic oscillator, a Morse-like
potential, and a generalized anharmonic oscillator; and one in two dimensions:
the coupled anharmonic oscillator in a curved space.
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