Discrete PT-symmetric square wells are studied. Their wave functions are found proportional to classical Tshebyshev polynomials of complex argument. The compact secular equations for energies are derived giving the real spectra in certain intervals of non-Hermiticity strengths Z. It is amusing to notice that although the known square well re-emerges in the usual continuum limit, a twice as rich, upside-down symmetric spectrum is exhibited by all its present discretized predecessors
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
Two PT-symmetric potentials are compared, which possess asymptotically finite imaginary components: ...
Non-Hermitian, $\mathcal{PT}$ -symmetric Hamiltonians, experimentally realized in optical systems, a...
Exact solvability of the discretized N-point version of the PT-symmetric square-well model is pointe...
In a PT symmetrically complexified square well, bound states are constructed by the matching techniq...
The recently proposed PT-symmetric quantum mechanics works with complex potentials which possess, ro...
In many PT symmetric models with real spectra, apparently, energy levels "merge and disappear" at a ...
Many indefinite-metric (often called pseudo-Hermitian or PT-symmetric) quantum models H prove "physi...
We review the proof of a conjecture concerning the reality of the spectra of certain PT-symmetric qu...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
Two PT-symmetric potentials are compared, which possess asymptotically finite imaginary components: ...
Abstract. Recently, a class of PT-invariant quantum mechanical models described by the non-Hermitian...
We show that and how PT symmetry (interpreted as a "weakened Hermiticity") can be extended to the ex...
The one-dimensional Schrodinger equation for the potential x(6)+alphax(2)+l (l+1)/x(2) has many inte...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
Two PT-symmetric potentials are compared, which possess asymptotically finite imaginary components: ...
Non-Hermitian, $\mathcal{PT}$ -symmetric Hamiltonians, experimentally realized in optical systems, a...
Exact solvability of the discretized N-point version of the PT-symmetric square-well model is pointe...
In a PT symmetrically complexified square well, bound states are constructed by the matching techniq...
The recently proposed PT-symmetric quantum mechanics works with complex potentials which possess, ro...
In many PT symmetric models with real spectra, apparently, energy levels "merge and disappear" at a ...
Many indefinite-metric (often called pseudo-Hermitian or PT-symmetric) quantum models H prove "physi...
We review the proof of a conjecture concerning the reality of the spectra of certain PT-symmetric qu...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
Two PT-symmetric potentials are compared, which possess asymptotically finite imaginary components: ...
Abstract. Recently, a class of PT-invariant quantum mechanical models described by the non-Hermitian...
We show that and how PT symmetry (interpreted as a "weakened Hermiticity") can be extended to the ex...
The one-dimensional Schrodinger equation for the potential x(6)+alphax(2)+l (l+1)/x(2) has many inte...
The overall principles of what is now widely known as PT-symmetric quantum mechanics are listed, exp...
Two PT-symmetric potentials are compared, which possess asymptotically finite imaginary components: ...
Non-Hermitian, $\mathcal{PT}$ -symmetric Hamiltonians, experimentally realized in optical systems, a...
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