- Source: Solid-state nuclear magnetic resonance
Solid-state NMR (ssNMR) spectroscopy is a technique for characterizing atomic level structure in solid materials e.g. powders, single crystals and amorphous samples and tissues using nuclear magnetic resonance (NMR) spectroscopy. The anisotropic part of many spin interactions are present in solid-state NMR, unlike in solution-state NMR where rapid tumbling motion averages out many of the spin interactions. As a result, solid-state NMR spectra are characterised by larger linewidths than in solution state NMR, which can be utilized to give quantitative information on the molecular structure, conformation and dynamics of the material. Solid-state NMR is often combined with magic angle spinning to remove anisotropic interactions and improve the resolution as well as the sensitivity of the technique.
Nuclear spin interactions
The resonance frequency of a nuclear spin depends on the strength of the magnetic field at the nucleus, which can be modified by isotropic (e.g. chemical shift, isotropic J-coupling) and anisotropic interactions (e.g. chemical shift anisotropy, dipolar interactions). In a classical liquid-state NMR experiment, molecular tumbling coming from Brownian motion averages anisotropic interactions to zero and they are therefore not reflected in the NMR spectrum. However, in media with no or little mobility (e.g. crystalline powders, glasses, large membrane vesicles, molecular aggregates), anisotropic local fields or interactions have substantial influence on the behaviour of nuclear spins, which results in the line broadening of the NMR spectra.
= Chemical shielding
=Chemical shielding is a local property of each nuclear site in a molecule or compound, and is proportional to the applied external magnetic field. The external magnetic field induces currents of the electrons in molecular orbitals. These induced currents create local magnetic fields that lead to characteristic changes in resonance frequency. These changes can be predicted from molecular structure using empirical rules or quantum-chemical calculations.
In general, the chemical shielding is anisotropic because of the anisotropic distribution of molecular orbitals around the nuclear sites. Under sufficiently fast magic angle spinning, or under the effect of molecular tumbling in solution-state NMR, the anisotropic dependence of the chemical shielding is time-averaged to zero, leaving only the isotropic chemical shift.
= Dipolar coupling
=Nuclear spins exhibit a magnetic dipole moment, which generates a magnetic field that interacts with the dipole moments of other nuclei (dipolar coupling). The magnitude of the interaction is dependent on the gyromagnetic ratio of the spin species, the internuclear distance r, and the orientation, with respect to the external magnetic field B, of the vector connecting the two nuclear spins (see figure). The maximum dipolar coupling is given by the dipolar coupling constant d,
d
=
ℏ
(
μ
0
4
π
)
1
r
3
γ
1
γ
2
{\displaystyle d=\hbar \left({\frac {\mu _{0}}{4\pi }}\right){\frac {1}{r^{3}}}\gamma _{1}\gamma _{2}}
,
where γ1 and γ2 are the gyromagnetic ratios of the nuclei,
ℏ
{\displaystyle \hbar }
is the reduced Planck constant, and
μ
0
{\displaystyle \mu _{0}}
is the vacuum permeability. In a strong magnetic field, the dipolar coupling depends on the angle θ between the internuclear vector and the external magnetic field B (figure) according to
D
∝
3
cos
2
θ
−
1
{\displaystyle D\propto 3\cos ^{2}\theta -1}
.
D becomes zero for
θ
m
=
arccos
1
/
3
=
arctan
2
≃
54.7
∘
{\displaystyle \theta _{m}=\arccos {\sqrt {1/3}}=\arctan {\sqrt {2}}\simeq 54.7^{\circ }}
. Consequently, two nuclei with a dipolar coupling vector at an angle of θm = 54.7° to a strong external magnetic field have zero dipolar coupling. θm is called the magic angle. Magic angle spinning is typically used to remove dipolar couplings weaker than the spinning rate.
= Quadrupolar interaction
=Nuclei with a spin quantum number >1/2 have a non-spherical charge distribution and an associated electric quadrupole moment tensor. The nuclear electric quadrupole moment couples with surrounding electric field gradients. The nuclear quadrupole coupling is one of the largest interactions in NMR spectroscopy, often comparable in size to the Zeeman coupling. When the nuclear quadrupole coupling is not negligible relative to the Zeeman coupling, higher order corrections are needed to describe the NMR spectrum correctly. In such cases, the first-order correction to the NMR transition frequency leads to a strong anisotropic line broadening of the NMR spectrum. However, all symmetric transitions, between
m
I
{\displaystyle m_{I}}
and
−
m
I
{\displaystyle -m_{I}}
levels are unaffected by the first-order frequency contribution. The second-order frequency contribution depends on the P4 Legendre polynomial, which has zero points at 30.6° and 70.1°. These anisotropic broadenings can be removed using DOR (DOuble angle Rotation) where you spin at two angles at the same time, or DAS (Double Angle Spinning) where you switch quickly between the two angles. Both techniques were developed in the late 1980s, and require specialized hardware (probe). Multiple quantum magic angle spinning (MQMAS) NMR was developed in 1995 and has become a routine method for obtaining high resolution solid-state NMR spectra of quadrupolar nuclei. A similar method to MQMAS is satellite transition magic angle spinning (STMAS) NMR developed in 2000.
= J-coupling
=The J-coupling or indirect nuclear spin-spin coupling (sometimes also called "scalar" coupling despite the fact that J is a tensor quantity) describes the interaction of nuclear spins through chemical bonds. J-couplings are not always resolved in solids owing to the typically large linewdiths observed in solid state NMR.
= Other interactions
=Paramagnetic substances are subject to the Knight shift.
Solid-state NMR line shapes
= Powder pattern
=A powder pattern arises in powdered samples where crystallites are randomly oriented relative to the magnetic field so that all molecular orientations are present. In presence of a chemical shift anisotropy interaction, each orientation with respect to the magnetic field gives a different resonance frequency. If enough crystallites are present, all the different contributions overlap continuously and lead to a smooth spectrum.
Fitting of the pattern in a static ssNMR experiment gives information about the shielding tensor, which are often described by the isotropic chemical shift
δ
i
s
o
{\displaystyle \delta _{iso}}
, the chemical shift anisotropy parameter
Δ
C
S
{\displaystyle \Delta _{CS}}
, and the asymmetry parameter
η
{\displaystyle \eta }
.
= Dipolar pattern
=The dipolar powder pattern (also Pake pattern) has a very characteristic shape that arises when two nuclear spins are coupled together within a crystallite. The splitting between the maxima (the "horns") of the pattern is equal to the dipolar coupling constant
d
{\displaystyle d}
.:
d
=
ℏ
(
μ
0
4
π
)
1
r
3
γ
1
γ
2
{\displaystyle d=\hbar \left({\frac {\mu _{0}}{4\pi }}\right){\frac {1}{r^{3}}}\gamma _{1}\gamma _{2}}
where γ1 and γ2 are the gyromagnetic ratios of the dipolar-coupled nuclei,
r
{\displaystyle r}
is the internuclear distance,
ℏ
{\displaystyle \hbar }
is the reduced Planck constant, and
μ
0
{\displaystyle \mu _{0}}
is the vacuum permeability.
Essential solid-state techniques
= Magic angle spinning
=Magic angle spinning (MAS) is a technique routinely used in solid-state NMR to produce narrower NMR and more intense NMR lines. This is achieved by rotating the sample at the magic angle θm (ca. 54.74°, where cos2θm = 1/3) with respect to the direction of the magnetic field, which has the effect to cancel, at least partially, anisotropic nuclear interactions such as dipolar, chemical shift anisotropy, and quadrupolar interactions. To achieve the complete averaging of these interactions, the sample needs to be spun at a rate that is at least higher than the largest anisotropy.
Spinning a powder sample at a slower rate than the largest component of the chemical shift anisotropy results in an incomplete averaging of the interaction, and produces a set of spinning sidebands in addition to the isotropic line, centred at the isotropic chemical shift. Spinning sidebands are sharp lines separated from the isotropic frequency by a multiple of the spinning rate. Although spinning sidebands can be used to measure anisotropic interactions, they are often undesirable and removed by spinning the sample faster or by recording the data points synchronously with the rotor period.
= Cross-polarisation
=Cross-polarization (CP) if a fundamental RF pulse sequence and a building-block in many solid-state NMR. It is typically used to enhance the signal of a dilute nuclei with a low gyromagnetic ratio (e.g. 13C, 15N) by magnetization transfer from an abundant nuclei with a high gyromagnetic ratio (e.g. 1H), or as a spectral editing method to get through space information (e.g. directed 15N→13C CP in protein spectroscopy).
To establish magnetization transfer, RF pulses ("contact pulses") are simultaneously applied on both frequency channels to produce
B
1
{\displaystyle B_{1}}
fields whose strength fulfil the Hartmann–Hahn condition:
γ
H
B
1
(
1
H
)
=
γ
X
B
1
(
X
)
±
n
ω
R
{\displaystyle \gamma _{H}B_{1}(^{1}{\text{H}})=\gamma _{X}B_{1}({\text{X}})\pm n\omega _{R}}
where
γ
{\displaystyle \gamma }
are the gyromagnetic ratios,
ω
R
{\displaystyle \omega _{R}}
is the spinning rate, and
n
{\displaystyle n}
is an integer. In practice, the pulse power, as well as the length of the contact pulse are experimentally optimised. The power of one contact pulse is typically ramped to achieve a more broadband and efficient magnetisation transfer.
= Decoupling
=Spin interactions can be removed (decoupled) to increase the resolution of NMR spectra during the detection, or to extend the lifetime of the nuclear magnetization.
Heteronuclear decoupling is achieved by radio-frequency irradiation on at the frequency of the nucleus to be decoupled, which is often 1H. The irradiation can be continuous (continuous wave decoupling), or a series of pulses that extend the performance and the bandwidth of the decoupling (TPPM, SPINAL-64, SWf-TPPM)
Homonuclear decoupling is achieved with multiple-pulse sequences (WAHUHA, MREV-8, BR-24, BLEW-12, FSLG), or continuous wave modulation (DUMBO, eDUMBO). Dipolar interactions can also be removed with magic angle spinning. Ultra fast MAS (from 60 kHz up to above 111 kHz) is an efficient way to average all dipolar interactions, including 1H–1H homonuclear dipolar interactions, which extends the resolution of 1H spectra and enables the usage of pulse sequences used in solution state NMR.
Advanced solid-state NMR spectroscopy
= Rotational Echo DOuble Resonance (REDOR)
=Rotational Echo DOuble Resonance (REDOR) experiment, are a type of heteronuclear dipolar recoupling experiment which enable one to re-introduce heteronuclear dipolar couplings averaged by MAS. The reintroduction of such dipolar coupling reduce the intensity of the NMR signal intensity compared to a reference spectrum where no dephasing pulse is used. REDOR can be used to measure heteronuclear distances, and are the basis of NMR crystallographic studies.
= Ultra fast MAS for 1H NMR
=The strong 1H-1H homonuclear dipolar interactions associated with broad NMR lines and short T2 relaxation time effectively relegate proton for bimolecular NMR. Fast MAS, and reduction of dipolar interactions by deuteration have made proton ssNMR as versatile as in solution. This includes spectral dispersion in multi-dimensional experiments as well as structurally valuable restraints and parameters important for studying material dynamics.
Ultra-fast NMR and the associated sharpening of the NMR lines enables NMR pulse sequences to capitalize on proton-detection to improve the sensitivity of the experiments compared to the direct detection of a spin-1/2 system (X). Such enhancement factor
ξ
{\displaystyle \xi }
is given by:
ξ
∝
(
γ
H
γ
X
)
3
/
2
(
W
X
W
H
)
1
/
2
(
Q
H
Q
X
)
1
/
2
{\displaystyle \xi \propto \left({\frac {\gamma _{H}}{\gamma _{X}}}\right)^{3/2}\left({\frac {W_{X}}{W_{H}}}\right)^{1/2}\left({\frac {Q_{H}}{Q_{X}}}\right)^{1/2}}
where
γ
{\displaystyle \gamma }
are the gyromagnetic ratios,
W
{\displaystyle W}
represent the NMR line widths, and
Q
{\displaystyle Q}
represent the quality factor of the probe resonances.
= MAS-Dynamic Nuclear Polarisation (MAS-DNP)
=Magic angle spinning dynamic nuclear polarization (MAS-DNP) is a technique that increases the sensitivity of NMR experiments by several orders of magnitude. It involves the transfer of the very high electron polarisation from unpaired electrons to nearby nuclei. This is achieved at cryogenic temperatures by the means of a continuous microwave irradiation coming from a klystron or a gyrotron, with a frequency close to the corresponding electron paramagnetic resonance (EPR) frequency.
The development in the MAS-DNP instrumentation, as well as the improvement of polarising agents (TOTAPOL, AMUPOL, TEKPOL, etc.) to achieve a more efficient transfer of polarisation has dramatically reduced experiments times which enabled the observation of surfaces, insensitive isotopes, and multidimensional experiments on low natural abundance nuclei, and diluted species.
Applications
Solid-state NMR spectroscopy serves as an effective analytical tool in biological, organic, and inorganic chemistry due to its close resemblance to liquid-state spectra while providing additional insights into anisotropic interactions.
It is used to characterize chemical composition, structure, local motions, kinetics, and thermodynamics, with the special ability to assign the observed behavior to specific sites in a molecule. It is also crucial in the area of surface and interfacial chemistry.
= Biology and Medicine
=Proteins and bioaggregates
Solid-state NMR is used to study insoluble proteins and proteins such as membrane proteins and amyloid fibrils. The latter topic relates to protein aggregation diseases such as Alzheimer's disease and Parkinson's disease. Solid-state NMR spectroscopy complements solution-state NMR spectroscopy and beam diffraction methods (e.g. X-ray crystallography, electron microscopy). Despite often requiring isotopic enrichment, ssNMR has the advantage that little sample preparation is required and can be used on not just dry or frozen samples, but also fully hydrated samples or native non-crystalline tissues. Solid-state NMR structure elucidation of proteins has traditionally been based on secondary chemical shifts and spatial contacts mostly between carbon nuclei. Upon fast magic-angle spinning, just like in solution NMR spectroscopy, proton-proton contacts represent the main information on the protein tertiary structure. Solid-state NMR, just like solution NMR, also enables the assessment of protein dynamics, which for membrane proteins in lipid bilayers or even micro-crystalline proteins (anchored by contacts to the surrounding molecules but properly hydrated) are largely retained.
Biomaterials
Solid-state NMR has also been used to study biomaterials such as bone, teeth, hair, silk, wood, as well as viruses, plants, cells, biopsies, and even live animals.
Drugs and drug delivery systems
ssNMR spectroscopy finds applications in pharmaceutical research. It allows the characterization of drug polymorphs and solid dispersions, properties related to bioavailability and stability.
= Materials science
=Solid-state NMR spectroscopy has been widely used in material science.
In solution NMR spectroscopy, a solvent is used to dissolve the sample, enabling it to exist in a highly dynamic state where molecules experience rapid tumbling and translational diffusion. So, the molecules can move around freely and rapidly. This random motion averages out magnetic interactions between nuclei, simplifying the NMR spectra. In ssNMR, specifically designed to analyze solid samples, particularly in the form of powders; molecules are fixed in place, which restricts their motion. This leads to more complex magnetic interactions, such as dipole-dipole coupling, chemical shift anisotropy, and quadrupolar interactions. These complex interactions provide more detailed information about the material's structure. This distinction between solution NMR and ssNMR is crucial because many materials—such as ceramics, glass, polymers, and crystals—exist in a solid phase, where their molecular motion is restricted. Therefore, using other techniques to solve their atomic-level structures and dynamics is hard.
ssNMR helps elucidate local structure and dynamics of solids, particularly when other methods, like X-ray diffraction or solution NMR spectroscopy, are insufficient in solving the problem. X-ray diffraction is great for studying crystalline materials, but many materials are either amorphous or have significant disorders and are not well represented or identified using X-ray diffraction. ssNMR probes both crystalline and non-crystalline regions, offering insights into the local environments of atoms even in disordered systems. It can also help study electrode and electrolyte materials in solid-state batteries by identifying how ions, like lithium, are transported through solid materials. It also gives information about these materials' structural stability and performance under operating conditions.
Solid-state NMR has been successfully used to study metal organic frameworks (MOFS), batteries, surfaces of nanoporous materials, polymers.
= Art conservation
=NMR can also be applied to art conservation. Different salts and moisture levels can be detected through the use of solid state NMR. However, sampling sizes retrieved from works of art in order to run through these large conducting magnets typically exceed levels deemed acceptable. Unilateral NMR techniques use portable magnets that are applied to the object of interest, bypassing the need for sampling.
References
= Suggested readings for beginners
=General NMR
Keeler, James (2002). "Understanding NMR Spectroscopy". Apollo-University Of Cambridge Repository, Apollo-University Of Cambridge Repository. doi:10.17863/CAM.968.
Hore, P. J. (2015). NMR : the toolkit : how pulse sequences work. J. A. Jones, Stephen Wimperis (2nd ed.). Oxford. ISBN 978-0-19-870342-6. OCLC 910929523.{{cite book}}: CS1 maint: location missing publisher (link)
Hore, P. J. (2015). Nuclear magnetic resonance (2nd ed.). Oxford. ISBN 978-0-19-870341-9. OCLC 910929524.{{cite book}}: CS1 maint: location missing publisher (link)
Encyclopedia of NMR. Robin K. Harris, Roderick E. Wasylishen. Chichester, West Sussex: John Wiley & Sons. 2012. ISBN 978-0-470-05821-3. OCLC 796758664.{{cite book}}: CS1 maint: others (link)
Solid-state NMR
Laws David D., Hans- , Bitter Marcus L., Jerschow Alexej (2002). "Solid-State NMR Spectroscopic Methods in Chemistry". Angewandte Chemie International Edition. 41 (17): 3096–3129. doi:10.1002/1521-3773(20020902)41:17<3096::AID-ANIE3096>3.0.CO;2-X. PMID 12207374.{{cite journal}}: CS1 maint: multiple names: authors list (link)
Reif, Bernd; Ashbrook, Sharon E.; Emsley, Lyndon; Hong, Mei (2021). "Solid-state NMR spectroscopy". Nature Reviews Methods Primers. 1. doi:10.1038/s43586-020-00002-1. PMC 8341432. PMID 34368784.
Levitt, Malcolm H., Spin Dynamics: Basics of Nuclear Magnetic Resonance, Wiley, Chichester, United Kingdom, 2001. ISBN 978-0470511176 (NMR basics, including solids)
Duer, Melinda J., Introduction to Solid-State NMR Spectroscopy, Blackwell, Oxford, 2004. (Some detailed examples of ssNMR spectroscopy)
Schmidt-Rohr, K. and Spiess, H.-W., Multidimensional Solid-State NMR and Polymers, Academic Press, San Diego, 1994.
External links
mrsimulator Python package for simulating solid-state NMR spectra.
SSNMRBLOG Solid-State NMR Literature Blog by Prof. Rob Schurko's Solid-State NMR group at the University of Windsor
"Solid-State MAS NMR | Protein NMR". Retrieved 2021-09-13.
"University of Ottawa NMR Facility Blog". u-of-o-nmr-facility.blogspot.com. Retrieved 2021-09-13.
Kata Kunci Pencarian:
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- Solid-state nuclear magnetic resonance
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- NMR (disambiguation)
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- Nuclear magnetic resonance quantum computer
- Dynamic nuclear polarization
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- Lyndon Emsley
