\begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry quantum systems. We refer to such systems as non-Hermitian quantum systems. To discuss in depth \begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry quantum systems, some properties of conjugate linear operators are discussed first in this paper due to the conjugate linearity of the operator \begin{document}$ {\mathcal{P}}{\mathcal{T}}, $\end{document} including their matrix represenations, spectral structures, etc. Second, the conjugate linear symmetry and unbroken conjugate linear symmetry are introduced for linear operators, and some equivalent characterizations of unbroken conjugate linear symmetry are obtained in terms of the matrix representations of the operators. As applications, \begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry and unbroken \begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry of Hamiltonians are discussed, showing that unbroken \begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry is not closed under taking tensor-product operation by some specific examples. Moreover, it is also illustrated that the unbroken \begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}-symmetry is neither a sufficient condition nor a necessary condition for Hamiltonian to be Hermitian under a new positive definite inner product."> Conjugate linear symmetry and its application to <inline-formula><tex-math id="M2">\begin{document}$ {\mathcal{P}}{\mathcal{T}} $\end{document}</tex-math><alternatives><graphic xmlns:xlink="http://www.w3.org/1999/xlink" xlink:href="3-20191173_M2.jpg"/><graphic xmlns:xlink="http://www.w3.org/1999/xlink" xlink:href="3-20191173_M2.png"/></alternatives></inline-formula>-symmetry quantum theory - 必威体育下载

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    Conjugate linear symmetry and its application to $ {\mathcal{P}}{\mathcal{T}} $ -symmetry quantum theory

    Huang Yong-Feng, Cao Huai-Xin, Wang Wen-Hua
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    • Abstract views:8332
    • PDF Downloads:84
    • Cited By:0
    Publishing process
    • Received Date:31 July 2019
    • Accepted Date:18 November 2019
    • Published Online:05 February 2020

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