Related papers: Geometry and purity properties of qudit Hamiltonian systems

Geometry and purity properties of qudit Hamiltonian systems

URL: http://arxiv.org/abs/2405.01759v2
Date: Tue, 22 Oct 2024 23:26:35 GMT
Title: Geometry and purity properties of qudit Hamiltonian systems
Authors: J. A. López-Saldívar, O. Castaños, S. Cordero, E. Nahmad-Achar, R. López-Peña,
Abstract summary: The principle of maximum entropy is used to study the geometric properties of an ensemble of finite dimensional Hamiltonian systems. For the Lipkin-Meshkov-Glick Hamiltonian the quantum phase diagram is explicitly shown for different temperature values in parameter space.
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Abstract: The principle of maximum entropy is used to study the geometric properties of an ensemble of finite dimensional Hamiltonian systems with known average energy. These geometric characterization is given in terms of the generalized diagonal Bloch vectors and the invariants of the special unitary group in $n$ dimensions. As examples, Hamiltonians written in terms of linear and quadratic generators of the angular momentum algebra are considered with $J= 1$ and $J=3/2$. For these cases, paths as functions of the temperature are established in the corresponding simplex representations, as well as the adiabatic evolution of the interaction strengths of the Hamiltonian models. For the Lipkin-Meshkov-Glick Hamiltonian the quantum phase diagram is explicitly shown for different temperature values in parameter space.

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