DOIAbstract
Using the usual distance function (the Fubini-Study metric) and a new distance function on the projective Hilbert space, the geometric phase is defined for non-cyclic, non-unitary and non-Schrödinger evolutions of quantum systems
Using the usual distance function (the Fubini-Study metric) and a new distance function on the projective Hilbert space, the geometric phase is defined for non-cyclic, non-unitary and non-Schrödinger evolutions of quantum systems
We define a new unitary operator in the Hubert space of a quantum system which parallel transports t...
Geometric phases, arising from cyclic evolutions in a curved parameter space, appear in a wealth of ...
A mapping is established in connecting density matrices, associated with an evolution of a quantum o...
Using the usual distance function (the Fubini-Study metric) and a new distance function on the proje...
We discuss the dynamical phase and the geometric phase in relation to the geometric distance functio...
The geometric phase and the geometric distance function are intimately related via length of the cur...
The geometric phase is defined for any arbitrary quantum evolution using a "reference section" of th...
We cast the nonadiabatic geometric phase in terms of the geometric distance function and the geometr...
We use a gauge-invariant 'reference section' and define the geometric phase for all quantum evolutio...
The usual definition of a geometric phase involves particular conditions on the behaviour of the st...
A new approach to the theory of the geometric phase in quantum mechanics, based entirely on kinemati...
A new approach to the theory of the geometric phase in quantum mechanics, based entirely on kinemati...
By analyzing an instructive example, for testing many concepts and approaches in quantum mechanics, ...
We define a new unitary operator in the Hilbert space of a quantum system which parallel transports ...
The geometric phase in quantum mechanics was originally elucidated in the context of the adiabatic t...
We define a new unitary operator in the Hubert space of a quantum system which parallel transports t...
Geometric phases, arising from cyclic evolutions in a curved parameter space, appear in a wealth of ...
A mapping is established in connecting density matrices, associated with an evolution of a quantum o...
Using the usual distance function (the Fubini-Study metric) and a new distance function on the proje...
We discuss the dynamical phase and the geometric phase in relation to the geometric distance functio...
The geometric phase and the geometric distance function are intimately related via length of the cur...
The geometric phase is defined for any arbitrary quantum evolution using a "reference section" of th...
We cast the nonadiabatic geometric phase in terms of the geometric distance function and the geometr...
We use a gauge-invariant 'reference section' and define the geometric phase for all quantum evolutio...
The usual definition of a geometric phase involves particular conditions on the behaviour of the st...
A new approach to the theory of the geometric phase in quantum mechanics, based entirely on kinemati...
A new approach to the theory of the geometric phase in quantum mechanics, based entirely on kinemati...
By analyzing an instructive example, for testing many concepts and approaches in quantum mechanics, ...
We define a new unitary operator in the Hilbert space of a quantum system which parallel transports ...
The geometric phase in quantum mechanics was originally elucidated in the context of the adiabatic t...
We define a new unitary operator in the Hubert space of a quantum system which parallel transports t...
Geometric phases, arising from cyclic evolutions in a curved parameter space, appear in a wealth of ...
A mapping is established in connecting density matrices, associated with an evolution of a quantum o...
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