Results 161 to 170 of about 9,826 (198)
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Berry’s phase for anharmonic oscillators
Physical Review A, 1992We study classical and quantum anholonomy for nonlinear oscillators which support linear or quadratic spectra.
, Datta, , Ghosh
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Integrare prin cercetare și inovare. Științe exacte și ale naturii
The article analyzes the influence of the non-linear terms of the restoring force at large deviations from the equilibrium position of an oscillating body (non-linear oscillator). Particularly, it is demonstrated, in an accessible way,that the oscillations of the anharmonic oscillator drastically differ from thoseof a harmonic one. The main reason lies
Sergiu Carlig +3 more
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The article analyzes the influence of the non-linear terms of the restoring force at large deviations from the equilibrium position of an oscillating body (non-linear oscillator). Particularly, it is demonstrated, in an accessible way,that the oscillations of the anharmonic oscillator drastically differ from thoseof a harmonic one. The main reason lies
Sergiu Carlig +3 more
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Equidistant spectra of anharmonic oscillators
Chaos: An Interdisciplinary Journal of Nonlinear Science, 1994Some representative potentials of the anharmonic-oscillator type are constructed. Some corresponding spectra-shift operators are also constructed. These operators are a natural generalization of Fok creation and annihilation operators. The Schrödinger problem for these potentials leads to an equidistant energy spectrum for all excited states, which are
Dubov, S. Yu. +2 more
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Observation of anharmonic Bloch oscillations
Optics Letters, 2011We report on the experimental observation of Bloch oscillations of an optical wave packet in a lattice with second-order coupling. To this end, we employ zigzag waveguide arrays, in which the second-order coupling can be precisely tuned.
Dreisow, F. +6 more
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Generalized Anharmonic Oscillator
Journal of Mathematical Physics, 1970The generalized anharmonic oscillator is defined by the Hamiltonian HN, which in the coordinate space representation is given by HN = −d2/dx2 + ¼x2 + g(½x2)N. The analytic properties of the energy levels of HN as functions of complex coupling g are derived and described. Zeroth-order WKB techniques are used in the mathematical analysis.
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Isochronous anharmonic oscillations
Canadian Journal of Physics, 1998The problem of a particle oscillating without friction on a curve in a vertical plane (referred to as a vertical curve) is addressed. It is shown that there are infinitely many asymmetric concave vertical curves on which oscillations of a particle remain isochronous.
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General anharmonic oscillators
Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences, 1978The eigenvalue problem of the general anharmonic oscillator (Hamiltonian H 2 μ ( k, λ ) = -d 2 / d x 2 + kx 2 + λx
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Thermodynamics of anharmonic oscillator
Chemical Physics Letters, 1979Abstract We suggest an approximate expression for the energy eigenvalues of an anharmonic oscillator potential of the form 1 2 m ω 2 x 2 + μ x 4 . We use these eigenvalues to calculate the partition function and specific heat.
M.M. Pant, S.K. Mitra
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Symmetrically anharmonic oscillators
Physical Review D, 1981We propose a new nonrelativistic Pauli-type equation where some specific small relativistic terms are retained. With the confining potentials ${V}_{\ensuremath{\infty}}(x)$ approximated by the polynomials ${V}_{m}(x)={g}_{0}{x}^{2}+\ensuremath{\cdots}+{g}_{m}{x}^{2m+2}$, ${g}_{m}g0$, the nonzero kinematical corrections ${T}_{m}\ensuremath{-}{T}_{0 ...
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Comments on "Anharmonic oscillator"
Physical Review D, 1979It is pointed out that the quantization conditions derived by Lu, Wald, and Young in a paper on an anharmonic oscillator are the same as the well-known JWKB quantization condition, particularized to JWKB approximations of the third and fifth orders, which can be derived in a much simpler and more general way.
P. O. Fröman +2 more
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