3 resultados para Auditing, Internal - Victoria
em CaltechTHESIS
Resumo:
Electric dipole internal conversion has been experimentally studied for several nuclei in the rare earth region. Anomalies in the conversion process have been interpreted in terms of nuclear structure effects. It was found that all the experimental results could be interpreted in terms of the j ∙ r type of penetration matrix element; the j ∙ ∇ type of penetration matrix element was not important. The ratio λ of the El j ∙ r penetration matrix element to the El gamma-ray matrix element was determined from the experiments to be:
Lu175,396 keV, λ = - 1000 ± 100;
282 keV, λ = 500 ± 100;
144 keV, λ = 500 ± 250;
Hf177, 321 keV λ = - 1400 ± 200;
208 keV λ = - 90 ± 40;
72 keV |λ| ≤ 650;
Gd155, 86 keV λ = - 150 ± 100;
Tm169, 63 keV λ = - 100 ± 100;
W182, 152 keV, λ = - 160 ±80;
67 keV, λ = - 100 ± 100.
Predictions for λ are made using the unified nuclear model.
Resumo:
Experimental studies of nuclear effects in internal conversion in Ta181 and Lu175 have been performed. Nuclear structure effects (“penetration” effects), in internal conversion are described in general. Calculation of theoretical conversion coefficients are outlined. Comparisons with the theoretical conversion coefficient tables of Rose and Sliv and Band are made. Discrepancies between our results and those of Rose and Sliv are noted. The theoretical conversion coefficients of Sliv and Band are in substantially better agreement with our results than are those of Rose. The ratio of the M1 penetration matrix element to the M1 gamma-ray matrix element, called λ, is equal to + 175 ± 25 for the 482 keV transition in Ta181 . The results for the 343 keV transition in Lu175 indicate that λ may be as large as – 8 ± 5. These transitions are discussed in terms of the unified collective model. Precision L subshell measurements in Tm169 (130keV), W182 (100 keV), and Ta181 (133 keV) show definite systematic deviations from the theoretical conversion coefficients. The possibility of explaining these deviations by penetration effects is investigated and is shown to be excluded. Other explanations of these anomalies are discussed.
Resumo:
Part I.
The interaction of a nuclear magnetic moment situated on an internal top with the magnetic fields produced by the internal as well as overall molecular rotation has been derived following the method of Van Vleck for the spin-rotation interaction in rigid molecules. It is shown that the Hamiltonian for this problem may be written
HSR = Ῑ · M · Ĵ + Ῑ · M” · Ĵ”
Where the first term is the ordinary spin-rotation interaction and the second term arises from the spin-internal-rotation coupling.
The F19 nuclear spin-lattice relaxation time (T1) of benzotrifluoride and several chemically substituted benzotrifluorides, have been measured both neat and in solution, at room temperature by pulsed nuclear magnetic resonance. From these experimental results it is concluded that in benzotrifluoride the internal rotation is crucial to the spin relaxation of the fluorines and that the dominant relaxation mechanism is the fluctuating spin-internal-rotation interaction.
Part II.
The radiofrequency spectrum corresponding to the reorientation of the F19 nuclear moment in flurobenzene has been studied by the molecular beam magnetic resonance method. A molecular beam apparatus with an electron bombardment detector was used in the experiments. The F19 resonance is a composite spectrum with contributions from many rotational states and is not resolved. A detailed analysis of the resonance line shape and width by the method of moments led to the following diagonal components of the fluorine spin-rotational tensor in the principal inertial axis system of the molecule:
F/Caa = -1.0 ± 0.5 kHz
F/Cbb = -2.7 ± 0.2 kHz
F/Ccc = -1.9 ± 0.1 kHz
From these interaction constants, the paramagnetic contribution to the F19 nuclear shielding in C6H5F was determined to be -284 ± ppm. It was further concluded that the F19 nucleus in this molecule is more shielded when the applied magnetic field is directed along the C-F bond axis. The anisotropy of the magnetic shielding tensor, σ” - σ⊥, is +160 ± 30 ppm.