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{{Short description|Instrument in mass spectrometry}}
Fourier Transform Ion Cylotron Resonance, also known as Fourier Transform Mass Spectrometry, is a type of mass analyzer (or ]) for determining the mass to charge ratio (m/z) of ] based on the cyclotron frequency of the ions in a magnetic field. The ions are trapped in a ] (a magnetic field with electric trapping plates) where they are excited to a larger cyclotron radius by an oscillating electric field perpendicular to the magnetic field. The excitation also results in the ions moving in phase (in a packet). The signal is detected as an image current on a pair of plates which the packet of ions passes close to as they cyclotron. The resulting signal is called a free induction decay (fid), transient or interferogram that consists of a superposition of ]. The useful signal is extracted from this data by performing a ] to give a ]. Specifically a ] (FFT) is usually used to transform the discrete fid data.
{{Infobox chemical analysis
| name = Fourier transform ion cyclotron resonance
| image =
| caption =A FTMS instrument at the ], USA
| acronym = FTICR
| classification =]
| analytes =
| manufacturers =
| related = ]<br />]<br />]<br />]
| hyphenated =
}}
'''Fourier-transform ion cyclotron resonance mass spectrometry''' is a type of mass analyzer (or ]) for determining the ] (''m''/''z'') of ] based on the ] of the ions in a fixed magnetic field.<ref name="primer">{{cite journal | last1 = Marshall | first1 = A. G. | last2 = Hendrickson | first2 = C. L. | last3 = Jackson | first3 = G. S. | year = 1998| title = Fourier transform ion cyclotron resonance mass spectrometry: a primer | journal = Mass Spectrom. Rev. | volume = 17 | issue = 1| pages = 1–35 | doi=10.1002/(sici)1098-2787(1998)17:1<1::aid-mas1>3.0.co;2-k | pmid=9768511| bibcode = 1998MSRv...17....1M }}</ref> The ions are trapped in a ] (a magnetic field with electric trapping plates), where they are excited (at their resonant cyclotron frequencies) to a larger cyclotron radius by an oscillating electric field orthogonal to the magnetic field. After the excitation field is removed, the ions are rotating at their cyclotron frequency in phase (as a "packet" of ions). These ions induce a charge (detected as an image current) on a pair of electrodes as the packets of ions pass close to them. The resulting signal is called a ] (FID), transient or interferogram that consists of a superposition of ]. The useful signal is extracted from this data by performing a ] to give a ].


==History==
Fourier Transform ion cylotron resonance (FTICR) mass spectrometry is a very high resolution technique in that masses can be determined with very high accuracy. Many applications of FTICR-MS use this mass accuracy to help determine the composition of molecules based on accurate mass. This is possible due to the ] of the elements. Another place that FTICR-MS is useful is in dealing with complex mixtures since the resolution (narrow peak width) allows the signals of two ions of similar mass to charge (m/z) to be detected as distinct ions. This high resolution is also useful in studying large macromolecules such as proteins with multiple charges which can be produced by ]. These large molecules contain a distribution of ] that produce a series of isotopic peaks. Because the isotopic peaks are close to each other on the m/z axis, due to the multiple charges, the high resolving power of the FTICR is extremely useful.
FT-ICR was invented by ]<ref>{{cite web|url=https://www.chem.ubc.ca/mel-comisarow |title=UBC Chemistry Personnel: Melvin B. Comisarow |access-date=2009-11-05 |publisher=University of British Columbia }}</ref> and ] at the ]. The first paper appeared in ] in 1974.<ref>{{cite journal|doi=10.1016/0009-2614(74)89137-2 | volume=25 | issue=2 | title=Fourier transform ion cyclotron resonance spectroscopy | year=1974 | journal=Chemical Physics Letters | pages=282–283 | last1 = Comisarow | first1 = Melvin B.| bibcode=1974CPL....25..282C }}</ref> The inspiration was earlier developments in conventional ICR and ] (FT-NMR) spectrometry. Marshall has continued to develop the technique at ] and ].


==Theory==
FTICR-MS differs significantly from other ] techniques in that the ions are not detected by hitting a detector such as an ] but only by passing near detection plates. Additionally the masses are not resolved in space or time as with other techniques but only in frequency. Thus, the different ions are not detected in different places as with ]s or at different times as with ] instruments but all ions are detected simultaneously over some given period of time.
]
The physics of FTICR is similar to that of a ] at least in the first approximation.


In the simplest idealized form, the relationship between the cyclotron frequency and the mass-to-charge ratio is given by


:<math>f = \frac{qB}{2\pi m},</math>
==Theory==


where ''f'' = cyclotron frequency, ''q'' = ion charge, ''B'' = ] and ''m'' = ion mass.
The physics of FTICR is similar to that of a ] at least in the first approximation.


This is more often represented in ]:
In the simplist form (idealized) the relationship between the cyclotron frequency and the mass to charge ratio is given by:


:<math>f = \frac{zeB}{2\pi m}</math> :<math>\omega_\text{c} = \frac{qB}{m},</math>


where <math>\omega_\text{c}</math> is the ], which is related to frequency by the definition <math>f = \frac{\omega}{2\pi}</math>.


Because of the quadrupolar electrical field used to trap the ions in the axial direction, this relationship is only approximate. The axial electrical trapping results in axial oscillations within the trap with the (angular) frequency
where <math>f </math> =cyclotron frequency, z=number of charges, e=the ] (charge of an ] or ]), B=] & m=mass (all in SI units)


:<math>\omega_\text{t} = \sqrt{\frac{q\alpha}{m}},</math>


where <math>\alpha</math> is a constant similar to the spring constant of a ] and is dependent on applied voltage, trap dimensions and trap geometry.
This is more often represented in ]:

The electric field and the resulting axial harmonic motion reduces the cyclotron frequency and introduces a second radial motion called magnetron motion that occurs at the magnetron frequency. The cyclotron motion is still the frequency being used, but the relationship above is not exact due to this phenomenon. The natural angular frequencies of motion are

:<math>\omega_\pm = \frac{\omega_\text{c}}{2} \pm \sqrt{\left(\frac{\omega_\text{c}}{2}\right)^2 - \frac{\omega_\text{t}^2}{2}},</math>


where <math>\omega_\text{t}</math> is the axial trapping frequency due the axial electrical trapping and <math>\omega_+</math> is the reduced cyclotron (angular) frequency and <math>\omega_-</math> is the magnetron (angular) frequency. Again, <math>\omega_+</math> is what is typically measured in FTICR. The meaning of this equation can be understood qualitatively by considering the case where <math>\omega_\text{t}</math> is small, which is generally true. In that case the value of the radical is just slightly less than <math>\omega_\text{c}/2</math>, and the value of <math>\omega_+</math> is just slightly less than <math>\omega_\text{c}</math> (the cyclotron frequency has been slightly reduced). For <math>\omega_-</math> the value of the radical is the same (slightly less than <math>\omega_\text{c}/2</math>), but it is being subtracted from <math>\omega_\text{c}/2</math>, resulting in a small number equal to <math>\omega_\text{c} - \omega_+</math> (i.e. the amount that the cyclotron frequency was reduced by).
:<math>\omega _c = \frac{qB}{m}</math>


==Instrumentation==
where <math>q=ze</math> or the total charge of the ion and <math>\omega _c</math> is the angular cyclotron frequency which is related to frequency by the definition <math>f = \frac{\omega}{2\pi}</math>.
FTICR-MS differs significantly from other ] techniques in that the ions are not detected by hitting a detector such as an ] but only by passing near detection plates. Additionally the masses are not resolved in space or time as with other techniques but only by the ] (rotational) frequency that each ion produces as it rotates in a magnetic field. Thus, the different ions are not detected in different places as with ]s or at different times as with ] instruments, but all ions are detected simultaneously during the detection interval. This provides an increase in the observed ] owing to the principles of ].<ref name="primer"/> In FTICR-MS, resolution can be improved either by increasing the strength of the magnet (in ]) or by increasing the detection duration.<ref>{{Cite journal | doi = 10.1016/S1387-3806(01)00588-7 | title = Fourier transform ion cyclotron resonance detection: principles and experimental configurations | year = 2002 | last1 = Marshall | first1 = A. | journal = International Journal of Mass Spectrometry | volume = 215 | pages = 59–75 |bibcode = 2002IJMSp.215...59M | issue=1–3}}</ref>


===Cells===
]
A review of different cell geometries with their specific electric configurations is available in the literature.<ref>{{cite journal|doi=10.1016/0168-1176(95)04190-V | volume=146–147 | title=Ion traps for Fourier transform ion cyclotron resonance mass spectrometry: principles and design of geometric and electric configurations | year=1995 | journal=International Journal of Mass Spectrometry and Ion Processes | pages=261–296 | last1 = Guan | first1 = Shenheng | last2 = Marshall | first2 = Alan G.| bibcode=1995IJMSI.146..261G }}</ref> However, ICR cells can belong to one of the following two categories: closed cells or open cells.


Several closed ICR cells with different geometries were fabricated and their performance has been characterized. Grids were used as end caps to apply an axial electric field for trapping ions axially (parallel to the magnetic field lines). Ions can be either generated inside the cell or can be injected to the cell from an external ]. Nested ICR cells with double pair of grids were also fabricated to trap both positive and negative ions simultaneously.
Because of the quadrupolar electrical field used to trap the ions in the axial direction this relationship is only approximate. The axial electrical trapping results in axial oscillations within the trap with the (angular) frequency:


The most common open cell geometry is a cylinder, which is axially segmented to produce electrodes in the shape of a ring. The central ring electrode is commonly used for applying radial excitation electric field and detection. DC electric voltage is applied on the terminal ring electrodes to trap ions along the magnetic field lines.<ref name="MarshallHendrickson1998">{{cite journal|last1=Marshall|first1=Alan G.|last2=Hendrickson|first2=Christopher L.|last3=Jackson|first3=George S.|title=Fourier transform ion cyclotron resonance mass spectrometry: A primer|journal=Mass Spectrometry Reviews|volume=17|issue=1|year=1998|pages=1–35|issn=0277-7037|doi=10.1002/(SICI)1098-2787(1998)17:1<1::AID-MAS1>3.0.CO;2-K|pmid=9768511|bibcode=1998MSRv...17....1M}}</ref> Open cylindrical cells with ring electrodes of different diameters have also been designed.<ref>{{Cite journal | doi = 10.1063/1.2751100 | title = Characterization of a new open cylindrical ion cyclotron resonance cell with unusual geometry | year = 2007 | last1 = Kanawati | first1 = B. | first2 = K. P. | journal = Review of Scientific Instruments | volume = 78 | pmid = 17672776 | last2 = Wanczek | issue = 7 | pages = 074102–074102–8 |bibcode = 2007RScI...78g4102K }}</ref> They proved not only capable in trapping and detecting both ion polarities simultaneously, but also they succeeded to separate positive from negative ions radially. This presented a large discrimination in kinetic ion acceleration between positive and negative ions trapped simultaneously inside the new cell. Several ion axial acceleration schemes were recently written for ion–ion collision studies.<ref>{{Cite journal | doi = 10.1016/j.ijms.2007.09.007 | title = Characterization of a new open cylindrical ICR cell for ion–ion collision studies☆ | year = 2008 | last1 = Kanawati | first1 = B. | first2 = K. | journal = International Journal of Mass Spectrometry | volume = 269 | pages = 12–23 | last2 = Wanczek|bibcode = 2008IJMSp.269...12K | issue=1–2}}</ref>
:<math>\omega _t = \sqrt{{\frac{q\alpha}{m}}}</math>


===Stored-waveform inverse Fourier transform ===
Where <math>\alpha</math> ia a constant similar to the spring constant of a ] and is dependent on voltage and the trap dimensions and geometry.
Stored-waveform inverse Fourier transform (SWIFT) is a method for the creation of excitation waveforms for FTMS.<ref name=Cody1987>{{Cite journal | last1 = Cody | first1 = R. B. | year = 1987 | title = Stored waveform inverse fourier transform excitation for obtaining increased parent ion selectivity in collisionally activated dissociation: Preliminary results | journal = ] | volume = 1 | pages = 99–102 | doi = 10.1002/rcm.1290010607 | first2 = R. E. | first3 = S. D. | first4 = Alan G. | last2 = Hein | last3 = Goodman | last4 = Marshall | issue = 6| bibcode = 1987RCMS....1...99C }}</ref> The time-domain excitation waveform is formed from the inverse Fourier transform of the appropriate frequency-domain excitation spectrum, which is chosen to excite the resonance frequencies of selected ions. The SWIFT procedure can be used to select ions for ] experiments.


==Applications==
The electric field and the resulting axial harmonic motion reduces the cyclotron frequency and introduces a second radial motion called magnetron motion that occurs at the magnetron frequency. The cyclotron motion is still the frequency being used but the relationship above is not exact due to this phenomenon. The natural angular frequencies of motion are:
Fourier-transform ion cyclotron resonance (FTICR) mass spectrometry is a high-resolution technique that can be used to determine masses with high accuracy. Many applications of FTICR-MS use this mass accuracy to help determine the composition of molecules based on accurate mass. This is possible due to the ] of the elements. FTICR-MS is able to achieve higher levels of mass accuracy than other forms of ], in part, because a superconducting magnet is much more stable than ] (RF) voltage.<ref>{{Cite journal | doi = 10.1016/S1387-3806(99)00226-2 | title = Comparison and interconversion of the two most common frequency-to-mass calibration functions for Fourier transform ion cyclotron resonance mass spectrometry | first5 = Alan G. | last5 = Marshall | first4 = Christopher L. | last4 = Hendrickson | first3 = Michael A. | last3 = Freitas | first2 = Jared J. | year = 2000 | last2 = Drader | last1 = Shi | first1 = S | journal = International Journal of Mass Spectrometry | volume = 195–196 | pages = 591–598 |bibcode = 2000IJMSp.195..591S }}</ref>


Another place that FTICR-MS is useful is in dealing with complex mixtures, such as biomass or waste liquefaction products,<ref>{{cite journal|last1=Leonardis|first1=Irene|last2=Chiaberge|first2=Stefano|last3=Fiorani|first3=Tiziana|last4=Spera|first4=Silvia|last5=Battistel|first5=Ezio|last6=Bosetti|first6=Aldo|last7=Cesti|first7=Pietro|last8=Reale|first8=Samantha|last9=De Angelis|first9=Francesco|title=Characterization of Bio-oil from Hydrothermal Liquefaction of Organic Waste by NMR Spectroscopy and FTICR Mass Spectrometry|journal=ChemSusChem|date=8 November 2012|volume=6|issue=2|pages=160–167|doi=10.1002/cssc.201200314|pmid=23139164}}</ref><ref>{{cite journal|last1=Sudasinghe|first1=Nilusha|last2=Cort|first2=John|last3=Hallen|first3=Richard|last4=Olarte|first4=Mariefel|last5=Schmidt|first5=Andrew|last6=Schaub|first6=Tanner|title=Hydrothermal liquefaction oil and hydrotreated product from pine feedstock characterized by heteronuclear two-dimensional NMR spectroscopy and FT-ICR mass spectrometry|journal=Fuel|date=1 December 2014|volume=137|pages=60–69|doi=10.1016/j.fuel.2014.07.069|doi-access=free}}</ref> since the resolution (narrow peak width) allows the signals of two ions with similar mass-to-charge ratios (''m''/''z'') to be detected as distinct ions.<ref name="pmid15694769">{{Cite journal |author=Sleno L. |author2=Volmer D. A. |author3=Marshall A. G. |title=Assigning product ions from complex MS/MS spectra: the importance of mass uncertainty and resolving power |journal=] |volume=16 |issue=2 |pages=183–98 |date=February 2005 |pmid=15694769 |doi=10.1016/j.jasms.2004.10.001 |doi-access= }}</ref><ref name="pmid12033259">{{cite journal |author=Bossio R. E. |author2=Marshall A. G. |title=Baseline resolution of isobaric phosphorylated and sulfated peptides and nucleotides by electrospray ionization FTICR ms: another step toward mass spectrometry-based proteomics |journal=] |volume=74 |issue=7 |pages=1674–9 |date=April 2002 |pmid=12033259 |doi= 10.1021/ac0108461}}</ref><ref name="pmid11217775">{{cite journal |author=He F. |author2=Hendrickson C. L. |author3=Marshall A. G. |title=Baseline mass resolution of peptide isobars: a record for molecular mass resolution |journal=] |volume=73 |issue=3 |pages=647–50 |date=February 2001 |pmid=11217775 |doi= 10.1021/ac000973h}}</ref> This high resolution is also useful in studying large macromolecules such as proteins with multiple charges, which can be produced by ]. For example, attomole level of detection of two peptides has been reported.<ref name="pmid8633766">{{cite journal |author=Solouki T. |author2=Marto J. A. |author3=White F. M. |author4=Guan S. |author5=Marshall A. G. |title=Attomole biomolecule mass analysis by matrix-assisted laser desorption/ionization Fourier transform ion cyclotron resonance |journal=] |volume=67 |issue=22 |pages=4139–44 |date=November 1995 |pmid=8633766 |doi= 10.1021/ac00118a017}}</ref> These large molecules contain a distribution of ] that produce a series of isotopic peaks. Because the isotopic peaks are close to each other on the ''m''/''z'' axis, due to the multiple charges, the high resolving power of the FTICR is extremely useful. FTICR-MS is very useful in other studies of proteomics as well. It achieves exceptional resolution in both top-down and bottom-up proteomics. Electron-capture dissociation (ECD), collisional-induced dissociation (CID), and infrared multiphoton dissociation (IRMPD) are all utilized to produce fragment spectra in tandem mass spectrometry experiments.<ref name="ScigelovaHornshaw2011">{{cite journal|last1=Scigelova|first1=M.|last2=Hornshaw|first2=M.|last3=Giannakopulos|first3=A.|last4=Makarov|first4=A.|title=Fourier Transform Mass Spectrometry|journal=Molecular & Cellular Proteomics|volume=10|issue=7|year=2011|pages=M111.009431|issn=1535-9476|doi=10.1074/mcp.M111.009431|doi-access=free |pmid=21742802|pmc=3134075}}</ref> Although CID and IRMPD use vibrational excitation to further dissociate peptides by breaking the backbone amide linkages, which are typically low in energy and weak, CID and IRMPD may also cause dissociation of post-translational modifications. ECD, on the other hand, allows specific modifications to be preserved. This is quite useful in analyzing phosphorylation states, O- or N-linked glycosylation, and sulfating.<ref name=ScigelovaHornshaw2011 />
:<math>\omega _\pm = \frac{\omega _c}{2} \pm \sqrt{({\frac{\omega _c}{2}})^2-({\frac{\omega _t}{2}}^2)}</math>


==References==
Where <math>\omega _t</math> is the axial trapping frequency due the axial electrical trapping and <math>\omega _+</math> is the reduced cyclotron (angular) frequency and <math>\omega _-</math> is the magnetron (angular) frequency. Again <math>\omega _+</math> is what is typically measured in FTICR. The meaning of this equation can be understood qualitatively by considering the case where <math>\omega _t</math> is small, which is generally true. In that case value of the radical is just slightly less than <math>\frac{\omega _c}{2}</math> and the value of <math>\omega _+</math> is just slightly less than <math>\omega _c</math> (the cyclotron frequency has been slightly reduced). For <math>\omega _-</math> the value of the radical is the same (slightly less than <math>\frac{\omega _c}{2}</math>) but it is being subtracted from <math>\frac{\omega _c}{2}</math> resulting in a small numer equal to:
{{Reflist|2}}


==External links==
:<math>\omega _- = \omega _c -\omega _+</math>
* National High Magnetic Field Laboratory
*
* FT-ICR Introduction University of Bristol


{{Mass spectrometry}}


{{DEFAULTSORT:Fourier Transform Ion Cyclotron Resonance}}
] ]
] ]

Latest revision as of 18:39, 25 March 2024

Instrument in mass spectrometry
Fourier transform ion cyclotron resonance
AcronymFTICR
ClassificationMass spectrometry
Other techniques
RelatedIon trap
Quadrupole ion trap
Penning trap
Orbitrap

Fourier-transform ion cyclotron resonance mass spectrometry is a type of mass analyzer (or mass spectrometer) for determining the mass-to-charge ratio (m/z) of ions based on the cyclotron frequency of the ions in a fixed magnetic field. The ions are trapped in a Penning trap (a magnetic field with electric trapping plates), where they are excited (at their resonant cyclotron frequencies) to a larger cyclotron radius by an oscillating electric field orthogonal to the magnetic field. After the excitation field is removed, the ions are rotating at their cyclotron frequency in phase (as a "packet" of ions). These ions induce a charge (detected as an image current) on a pair of electrodes as the packets of ions pass close to them. The resulting signal is called a free induction decay (FID), transient or interferogram that consists of a superposition of sine waves. The useful signal is extracted from this data by performing a Fourier transform to give a mass spectrum.

History

FT-ICR was invented by Melvin B. Comisarow and Alan G. Marshall at the University of British Columbia. The first paper appeared in Chemical Physics Letters in 1974. The inspiration was earlier developments in conventional ICR and Fourier-transform nuclear magnetic resonance (FT-NMR) spectrometry. Marshall has continued to develop the technique at The Ohio State University and Florida State University.

Theory

Linear ion trap – Fourier-transform ion cyclotron resonance mass spectrometer (panels around magnet are missing)

The physics of FTICR is similar to that of a cyclotron at least in the first approximation.

In the simplest idealized form, the relationship between the cyclotron frequency and the mass-to-charge ratio is given by

f = q B 2 π m , {\displaystyle f={\frac {qB}{2\pi m}},}

where f = cyclotron frequency, q = ion charge, B = magnetic field strength and m = ion mass.

This is more often represented in angular frequency:

ω c = q B m , {\displaystyle \omega _{\text{c}}={\frac {qB}{m}},}

where ω c {\displaystyle \omega _{\text{c}}} is the angular cyclotron frequency, which is related to frequency by the definition f = ω 2 π {\displaystyle f={\frac {\omega }{2\pi }}} .

Because of the quadrupolar electrical field used to trap the ions in the axial direction, this relationship is only approximate. The axial electrical trapping results in axial oscillations within the trap with the (angular) frequency

ω t = q α m , {\displaystyle \omega _{\text{t}}={\sqrt {\frac {q\alpha }{m}}},}

where α {\displaystyle \alpha } is a constant similar to the spring constant of a harmonic oscillator and is dependent on applied voltage, trap dimensions and trap geometry.

The electric field and the resulting axial harmonic motion reduces the cyclotron frequency and introduces a second radial motion called magnetron motion that occurs at the magnetron frequency. The cyclotron motion is still the frequency being used, but the relationship above is not exact due to this phenomenon. The natural angular frequencies of motion are

ω ± = ω c 2 ± ( ω c 2 ) 2 ω t 2 2 , {\displaystyle \omega _{\pm }={\frac {\omega _{\text{c}}}{2}}\pm {\sqrt {\left({\frac {\omega _{\text{c}}}{2}}\right)^{2}-{\frac {\omega _{\text{t}}^{2}}{2}}}},}

where ω t {\displaystyle \omega _{\text{t}}} is the axial trapping frequency due the axial electrical trapping and ω + {\displaystyle \omega _{+}} is the reduced cyclotron (angular) frequency and ω {\displaystyle \omega _{-}} is the magnetron (angular) frequency. Again, ω + {\displaystyle \omega _{+}} is what is typically measured in FTICR. The meaning of this equation can be understood qualitatively by considering the case where ω t {\displaystyle \omega _{\text{t}}} is small, which is generally true. In that case the value of the radical is just slightly less than ω c / 2 {\displaystyle \omega _{\text{c}}/2} , and the value of ω + {\displaystyle \omega _{+}} is just slightly less than ω c {\displaystyle \omega _{\text{c}}} (the cyclotron frequency has been slightly reduced). For ω {\displaystyle \omega _{-}} the value of the radical is the same (slightly less than ω c / 2 {\displaystyle \omega _{\text{c}}/2} ), but it is being subtracted from ω c / 2 {\displaystyle \omega _{\text{c}}/2} , resulting in a small number equal to ω c ω + {\displaystyle \omega _{\text{c}}-\omega _{+}} (i.e. the amount that the cyclotron frequency was reduced by).

Instrumentation

FTICR-MS differs significantly from other mass spectrometry techniques in that the ions are not detected by hitting a detector such as an electron multiplier but only by passing near detection plates. Additionally the masses are not resolved in space or time as with other techniques but only by the ion cyclotron resonance (rotational) frequency that each ion produces as it rotates in a magnetic field. Thus, the different ions are not detected in different places as with sector instruments or at different times as with time-of-flight instruments, but all ions are detected simultaneously during the detection interval. This provides an increase in the observed signal-to-noise ratio owing to the principles of Fellgett's advantage. In FTICR-MS, resolution can be improved either by increasing the strength of the magnet (in teslas) or by increasing the detection duration.

Cells

A cylindrical ICR cell. The walls of the cell are made of copper, and ions enter the cell from the right, transmitted by the octopole ion guides.

A review of different cell geometries with their specific electric configurations is available in the literature. However, ICR cells can belong to one of the following two categories: closed cells or open cells.

Several closed ICR cells with different geometries were fabricated and their performance has been characterized. Grids were used as end caps to apply an axial electric field for trapping ions axially (parallel to the magnetic field lines). Ions can be either generated inside the cell or can be injected to the cell from an external ionization source. Nested ICR cells with double pair of grids were also fabricated to trap both positive and negative ions simultaneously.

The most common open cell geometry is a cylinder, which is axially segmented to produce electrodes in the shape of a ring. The central ring electrode is commonly used for applying radial excitation electric field and detection. DC electric voltage is applied on the terminal ring electrodes to trap ions along the magnetic field lines. Open cylindrical cells with ring electrodes of different diameters have also been designed. They proved not only capable in trapping and detecting both ion polarities simultaneously, but also they succeeded to separate positive from negative ions radially. This presented a large discrimination in kinetic ion acceleration between positive and negative ions trapped simultaneously inside the new cell. Several ion axial acceleration schemes were recently written for ion–ion collision studies.

Stored-waveform inverse Fourier transform

Stored-waveform inverse Fourier transform (SWIFT) is a method for the creation of excitation waveforms for FTMS. The time-domain excitation waveform is formed from the inverse Fourier transform of the appropriate frequency-domain excitation spectrum, which is chosen to excite the resonance frequencies of selected ions. The SWIFT procedure can be used to select ions for tandem mass spectrometry experiments.

Applications

Fourier-transform ion cyclotron resonance (FTICR) mass spectrometry is a high-resolution technique that can be used to determine masses with high accuracy. Many applications of FTICR-MS use this mass accuracy to help determine the composition of molecules based on accurate mass. This is possible due to the mass defect of the elements. FTICR-MS is able to achieve higher levels of mass accuracy than other forms of mass spectrometer, in part, because a superconducting magnet is much more stable than radio-frequency (RF) voltage.

Another place that FTICR-MS is useful is in dealing with complex mixtures, such as biomass or waste liquefaction products, since the resolution (narrow peak width) allows the signals of two ions with similar mass-to-charge ratios (m/z) to be detected as distinct ions. This high resolution is also useful in studying large macromolecules such as proteins with multiple charges, which can be produced by electrospray ionization. For example, attomole level of detection of two peptides has been reported. These large molecules contain a distribution of isotopes that produce a series of isotopic peaks. Because the isotopic peaks are close to each other on the m/z axis, due to the multiple charges, the high resolving power of the FTICR is extremely useful. FTICR-MS is very useful in other studies of proteomics as well. It achieves exceptional resolution in both top-down and bottom-up proteomics. Electron-capture dissociation (ECD), collisional-induced dissociation (CID), and infrared multiphoton dissociation (IRMPD) are all utilized to produce fragment spectra in tandem mass spectrometry experiments. Although CID and IRMPD use vibrational excitation to further dissociate peptides by breaking the backbone amide linkages, which are typically low in energy and weak, CID and IRMPD may also cause dissociation of post-translational modifications. ECD, on the other hand, allows specific modifications to be preserved. This is quite useful in analyzing phosphorylation states, O- or N-linked glycosylation, and sulfating.

References

  1. ^ Marshall, A. G.; Hendrickson, C. L.; Jackson, G. S. (1998). "Fourier transform ion cyclotron resonance mass spectrometry: a primer". Mass Spectrom. Rev. 17 (1): 1–35. Bibcode:1998MSRv...17....1M. doi:10.1002/(sici)1098-2787(1998)17:1<1::aid-mas1>3.0.co;2-k. PMID 9768511.
  2. "UBC Chemistry Personnel: Melvin B. Comisarow". University of British Columbia. Retrieved 2009-11-05.
  3. Comisarow, Melvin B. (1974). "Fourier transform ion cyclotron resonance spectroscopy". Chemical Physics Letters. 25 (2): 282–283. Bibcode:1974CPL....25..282C. doi:10.1016/0009-2614(74)89137-2.
  4. Marshall, A. (2002). "Fourier transform ion cyclotron resonance detection: principles and experimental configurations". International Journal of Mass Spectrometry. 215 (1–3): 59–75. Bibcode:2002IJMSp.215...59M. doi:10.1016/S1387-3806(01)00588-7.
  5. Guan, Shenheng; Marshall, Alan G. (1995). "Ion traps for Fourier transform ion cyclotron resonance mass spectrometry: principles and design of geometric and electric configurations". International Journal of Mass Spectrometry and Ion Processes. 146–147: 261–296. Bibcode:1995IJMSI.146..261G. doi:10.1016/0168-1176(95)04190-V.
  6. Marshall, Alan G.; Hendrickson, Christopher L.; Jackson, George S. (1998). "Fourier transform ion cyclotron resonance mass spectrometry: A primer". Mass Spectrometry Reviews. 17 (1): 1–35. Bibcode:1998MSRv...17....1M. doi:10.1002/(SICI)1098-2787(1998)17:1<1::AID-MAS1>3.0.CO;2-K. ISSN 0277-7037. PMID 9768511.
  7. Kanawati, B.; Wanczek, K. P. (2007). "Characterization of a new open cylindrical ion cyclotron resonance cell with unusual geometry". Review of Scientific Instruments. 78 (7): 074102–074102–8. Bibcode:2007RScI...78g4102K. doi:10.1063/1.2751100. PMID 17672776.
  8. Kanawati, B.; Wanczek, K. (2008). "Characterization of a new open cylindrical ICR cell for ion–ion collision studies☆". International Journal of Mass Spectrometry. 269 (1–2): 12–23. Bibcode:2008IJMSp.269...12K. doi:10.1016/j.ijms.2007.09.007.
  9. Cody, R. B.; Hein, R. E.; Goodman, S. D.; Marshall, Alan G. (1987). "Stored waveform inverse fourier transform excitation for obtaining increased parent ion selectivity in collisionally activated dissociation: Preliminary results". Rapid Communications in Mass Spectrometry. 1 (6): 99–102. Bibcode:1987RCMS....1...99C. doi:10.1002/rcm.1290010607.
  10. Shi, S; Drader, Jared J.; Freitas, Michael A.; Hendrickson, Christopher L.; Marshall, Alan G. (2000). "Comparison and interconversion of the two most common frequency-to-mass calibration functions for Fourier transform ion cyclotron resonance mass spectrometry". International Journal of Mass Spectrometry. 195–196: 591–598. Bibcode:2000IJMSp.195..591S. doi:10.1016/S1387-3806(99)00226-2.
  11. Leonardis, Irene; Chiaberge, Stefano; Fiorani, Tiziana; Spera, Silvia; Battistel, Ezio; Bosetti, Aldo; Cesti, Pietro; Reale, Samantha; De Angelis, Francesco (8 November 2012). "Characterization of Bio-oil from Hydrothermal Liquefaction of Organic Waste by NMR Spectroscopy and FTICR Mass Spectrometry". ChemSusChem. 6 (2): 160–167. doi:10.1002/cssc.201200314. PMID 23139164.
  12. Sudasinghe, Nilusha; Cort, John; Hallen, Richard; Olarte, Mariefel; Schmidt, Andrew; Schaub, Tanner (1 December 2014). "Hydrothermal liquefaction oil and hydrotreated product from pine feedstock characterized by heteronuclear two-dimensional NMR spectroscopy and FT-ICR mass spectrometry". Fuel. 137: 60–69. doi:10.1016/j.fuel.2014.07.069.
  13. Sleno L.; Volmer D. A.; Marshall A. G. (February 2005). "Assigning product ions from complex MS/MS spectra: the importance of mass uncertainty and resolving power". J. Am. Soc. Mass Spectrom. 16 (2): 183–98. doi:10.1016/j.jasms.2004.10.001. PMID 15694769.
  14. Bossio R. E.; Marshall A. G. (April 2002). "Baseline resolution of isobaric phosphorylated and sulfated peptides and nucleotides by electrospray ionization FTICR ms: another step toward mass spectrometry-based proteomics". Anal. Chem. 74 (7): 1674–9. doi:10.1021/ac0108461. PMID 12033259.
  15. He F.; Hendrickson C. L.; Marshall A. G. (February 2001). "Baseline mass resolution of peptide isobars: a record for molecular mass resolution". Anal. Chem. 73 (3): 647–50. doi:10.1021/ac000973h. PMID 11217775.
  16. Solouki T.; Marto J. A.; White F. M.; Guan S.; Marshall A. G. (November 1995). "Attomole biomolecule mass analysis by matrix-assisted laser desorption/ionization Fourier transform ion cyclotron resonance". Anal. Chem. 67 (22): 4139–44. doi:10.1021/ac00118a017. PMID 8633766.
  17. ^ Scigelova, M.; Hornshaw, M.; Giannakopulos, A.; Makarov, A. (2011). "Fourier Transform Mass Spectrometry". Molecular & Cellular Proteomics. 10 (7): M111.009431. doi:10.1074/mcp.M111.009431. ISSN 1535-9476. PMC 3134075. PMID 21742802.

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