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Infrared Study of Electron-bombarded Phenanthrene (C<sub>14</sub>H<sub>10</sub>)/<i>Para</i>-H<sub>2</sub> Matrices: Isomers of Protonated Phenanthrene (1-, 3-, 4-, and 9-H<sup>+</sup>C<sub>14</sub>H<sub>10</sub>). [PDF]
J Phys Chem AFeng JY, Lee YP.
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Infrared Multiple Photon Dissociation Spectroscopy of the H-H Stretching Mode and Low-Lying Electronic Transitions in Fe<sup>+</sup>(H<sub>2</sub>)<sub>1,2</sub> and Fe<sup>+</sup>(D<sub>2</sub>)<sub>1,2</sub>. [PDF]
J Phys Chem AJin S +4 more
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Second harmonic generation at a time-varying interface. [PDF]
Nat CommunTirole R +8 more
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Infrared Photodissociation Spectroscopy of Fluoride-Anion Hexafluoroisopropanol Complexes: Solvation-Suppressed Proton Transfer. [PDF]
J Phys Chem LettBarp M +4 more
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Anharmonic Grassmann oscillator. II
Physical Review D, 1990An analysis of the anharmonic fermion oscillator, possessing an $\mathrm{Sp}(2)\ifmmode\times\else\texttimes\fi{}\mathrm{O}(N)$ symmetry, is presented. The complete solution is given for $N=2 \mathrm{and} 3$, and the general features for arbitrary $N$ are spelled out.
, Delbourgo, , Jones, , White
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Anharmonic oscillators revisited
International Journal of Non-Linear Mechanics, 1985A large class of anharmonic oscillators represented by the Hamiltonian \(H(p,q)=(1/2)p^ 2+(1/2)q^ 2+\lambda q^{\alpha}\) (\(\alpha\) integer \(>2)\) is considered. Owing to an integration technique using the Lagrange-Bürmann theorem the solution of the motion equation is given in terms of series of Gauss hypergeometric functions.
Codaccioni, J. P., Caboz, R.
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Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences, 1978
Accurate eigenvalues and eigenfunctions of the anharm onic oscillator ( H = p 2 + x 2 + λx 4 , λ > 0) and the quartic oscillator ( H = p 2 + x
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Accurate eigenvalues and eigenfunctions of the anharm onic oscillator ( H = p 2 + x 2 + λx 4 , λ > 0) and the quartic oscillator ( H = p 2 + x
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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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