Add to ORKGCanonical quantum mechanics postulates Hermitian Hamiltonians to ensure real eigenvalues. Counterintuitively, a non-Hermitian Hamiltonian, satisfying combined parity-time (PT) symmetry, could display entirely real spectra above some phase-transition threshold. This stems from the existence of a parameter in the Hamiltonian governing characteristics features of eigenvalues and eigenfunctions. Varying this parameter causes real eigenvalues to coalesce and become complex conjugate pairs, signaling the occurrence of a nontrivial phase transition and the breakdown of PT symmetry. Such an appealing discovery has aroused extensive theoretical interest in extending canonical quantum theory by including non-Hermitian but PT-symmetric operators in th...
Analysis of fundamentally open systems which exhibit both spatial reflection (parity) and time-rever...
Parity-time (PT) symmetry and broken in micro/nano photonic structures have been investigated extens...
Parity-Time (PT) symmetry has recently received much attention as a promising alternative to the con...
In the past decade, the concept of parity-time $(\mathcal{PT})$ symmetry, originally introduced in ...
For the investigation of non-Hermitian effects and physics under parity-time (PT) symmetry, photonic...
One of the fundamental axioms of quantum mechanics is associated with the Hermiticity of physical ob...
From the viewpoint of quantum mechanics, a system must always be Hermitian since all its correspondi...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
One of the fundamental axioms of quantum mechanics is associated with the Hermiticity of physical ob...
Nearly one century after the birth of quantum mechanics, parity-time symmetry is revolutionizing and...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
Nearly one century after the birth of quantum mechanics, parity–time symmetry is revolutionizing and...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
Over the past decade, parity-time (PT)-symmetric Hamiltonians have been experimentally realized in c...
Abstract In quantum theory, any Hamiltonian describing a physical system is mathemat-ically represen...
Analysis of fundamentally open systems which exhibit both spatial reflection (parity) and time-rever...
Parity-time (PT) symmetry and broken in micro/nano photonic structures have been investigated extens...
Parity-Time (PT) symmetry has recently received much attention as a promising alternative to the con...
In the past decade, the concept of parity-time $(\mathcal{PT})$ symmetry, originally introduced in ...
For the investigation of non-Hermitian effects and physics under parity-time (PT) symmetry, photonic...
One of the fundamental axioms of quantum mechanics is associated with the Hermiticity of physical ob...
From the viewpoint of quantum mechanics, a system must always be Hermitian since all its correspondi...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
One of the fundamental axioms of quantum mechanics is associated with the Hermiticity of physical ob...
Nearly one century after the birth of quantum mechanics, parity-time symmetry is revolutionizing and...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
Nearly one century after the birth of quantum mechanics, parity–time symmetry is revolutionizing and...
In quantum theory, any Hamiltonian describing a physical system is mathematically represented by a s...
Over the past decade, parity-time (PT)-symmetric Hamiltonians have been experimentally realized in c...
Abstract In quantum theory, any Hamiltonian describing a physical system is mathemat-ically represen...
Analysis of fundamentally open systems which exhibit both spatial reflection (parity) and time-rever...
Parity-time (PT) symmetry and broken in micro/nano photonic structures have been investigated extens...
Parity-Time (PT) symmetry has recently received much attention as a promising alternative to the con...