NMR relaxation study of methyl groups in solids from low to high temperatures

Latanowicz, L.

doi:10.1002/cmr.a.20040

Cited by 28 publications

(50 citation statements)

References 40 publications

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“…11 in Ref. [17]). Moreover n T (1/ ) v A Ev 1 1 1 can be neglected because the population of molecules at v 1 is small (see Fig.…”

Section: Proton Spin-lattice Relaxation Timementioning

confidence: 92%

“…1 was previously assumed for protons in Refs. [16,17]. This value followed from the assumed value L ¼1.78 Å as the barrier width, which is the distance between protons in methyl group.…”

Section: Model Of Motionmentioning

confidence: 98%

“…The expression for the tunnelling correlation time has been derived in Refs. [16,17] and it follows from the Schrodinger equation:…”

Section: Model Of Motionmentioning

confidence: 99%

“…The approach assumed in papers [16][17][18] is based on the method of calculation of the total correlation function for a complex motion [15]. The C 3 motion of the methyl group is composed of the jumps over the barrier and through the barrier, taking place with different probabilities.…”

Section: Proton Spin-lattice Relaxation Timementioning

confidence: 99%

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Complex dynamics of 1.3.5-trimethylbenzene-2.4.6-D3 studied by proton spin–lattice NMR relaxation and second moment of NMR line

Hołderna-Natkaniec

Latanowicz

Medycki

et al. 2015

Journal of Physics and Chemistry of Solids

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“…11 in Ref. [17]). Moreover n T (1/ ) v A Ev 1 1 1 can be neglected because the population of molecules at v 1 is small (see Fig.…”

Section: Proton Spin-lattice Relaxation Timementioning

confidence: 92%

“…1 was previously assumed for protons in Refs. [16,17]. This value followed from the assumed value L ¼1.78 Å as the barrier width, which is the distance between protons in methyl group.…”

Section: Model Of Motionmentioning

confidence: 98%

“…The expression for the tunnelling correlation time has been derived in Refs. [16,17] and it follows from the Schrodinger equation:…”

Section: Model Of Motionmentioning

confidence: 99%

Section: Proton Spin-lattice Relaxation Timementioning

confidence: 99%

See 2 more Smart Citations

Complex dynamics of 1.3.5-trimethylbenzene-2.4.6-D3 studied by proton spin–lattice NMR relaxation and second moment of NMR line

Hołderna-Natkaniec

Latanowicz

Medycki

et al. 2015

Journal of Physics and Chemistry of Solids

View full text Add to dashboard Cite

“…The method to derive the total correlation function of a complex motion used earlier in [24][25][26][27][28] is applied to the calculations of the complex methyl group motion spectral density. The Arrhenius temperature dependence is assumed for the correlation time of the classical C 3 rotation of the methyl group.…”

Section: Article In Pressmentioning

confidence: 99%

Complex methyl groups dynamics in [(CH3)4P]3Sb2Br9 (PBA) from low to high temperatures by proton spin–lattice relaxation and narrowing of proton NMR spectrum

Latanowicz

Medycki

Jakubas

2009

Solid State Nuclear Magnetic Resonance

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Concept of correlation time, autocorrelation functions, and spectral densities of the tunneling jumps through the potential barrier

Latanowicz

2012

Concepts Magnetic Resonance

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The concept of the tunneling correlation time according to Schrö dinger is presented. This tunneling jumps and the over the barrier jumps (Arrhenius type) correlation times are applied to calculate the autocorrelation functions and spectral densities of a complex motion. Complex motion means that the relaxation vector performs more than one motion. Two examples of temperature dependencies of a complex motion in a wide temperature regime are given. One example concerns the complex motion consisting of the fast hindered rotation of the methyl group which participates additionally in a slower isotropic motion. The other example concerns the complex motion consisting of the jumps of the proton-proton vector between the two sites in a double hydrogen bond as well as the jumps between other two equilibrium sites (librations of the whole molecule). The latter motion is assumed as slower than the concerted motion of two protons in a double hydrogen bond. In both examples the tunneling jumps are considered as a component of a complex motion. However, only the tunneling jumps of the faster motion are taken into account. Why the tunneling jumps of the slower motion are neglected is explained. The tunneling spectral density dominates only at low temperatures and contributes to the spectral density of the complex motion at intermediate temperatures up to T tun temperature. The sense of T tun temperature is explained. A comparison is made with the other theories of tunneling correlation time. 2012 Wiley Periodicals, Inc. Concepts Magn Reson Part A 40A: 66-79, 2012.

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NMR relaxation study of methyl groups in solids from low to high temperatures

Cited by 28 publications

References 40 publications

Complex dynamics of 1.3.5-trimethylbenzene-2.4.6-D3 studied by proton spin–lattice NMR relaxation and second moment of NMR line

Complex dynamics of 1.3.5-trimethylbenzene-2.4.6-D3 studied by proton spin–lattice NMR relaxation and second moment of NMR line

Complex methyl groups dynamics in [(CH3)4P]3Sb2Br9 (PBA) from low to high temperatures by proton spin–lattice relaxation and narrowing of proton NMR spectrum

Concept of correlation time, autocorrelation functions, and spectral densities of the tunneling jumps through the potential barrier

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