Numerical solutions to the time-dependent Bloch equations revisited
- 31 January 2011
- journal article
- Published by Elsevier BV in Magnetic Resonance Imaging
- Vol. 29 (1), 126-131
- https://doi.org/10.1016/j.mri.2010.07.003
Abstract
No abstract availableKeywords
This publication has 17 references indexed in Scilit:
- Simultaneous determination of labile proton concentration and exchange rate utilizing optimal RF power: Radio frequency power (RFP) dependence of chemical exchange saturation transfer (CEST) MRIJournal of Magnetic Resonance, 2010
- Relaxation‐compensated fast multislice amide proton transfer (APT) imaging of acute ischemic strokeMagnetic Resonance in Medicine, 2008
- Numerical solution of the Bloch equations provides insights into the optimum design of PARACEST agents for MRIMagnetic Resonance in Medicine, 2005
- Amide proton transfer (APT) contrast for imaging of brain tumorsMagnetic Resonance in Medicine, 2003
- Sensitive CEST agents based on nucleic acid imino proton exchange: Detection of poly(rU) and of a dendrimer‐poly(rU) model for nucleic acid delivery and pharmacologyMagnetic Resonance in Medicine, 2003
- Paramagnetic Lanthanide(III) complexes as pH‐sensitive chemical exchange saturation transfer (CEST) contrast agents for MRI applicationsMagnetic Resonance in Medicine, 2002
- Sensitive NMR Detection of Cationic-Polymer-Based Gene Delivery Systems Using Saturation Transfer via Proton ExchangeJournal of the American Chemical Society, 2001
- A New Class of Contrast Agents for MRI Based on Proton Chemical Exchange Dependent Saturation Transfer (CEST)Journal of Magnetic Resonance, 2000
- A General Solution of the Standard Magnetization Transfer ModelJournal of Magnetic Resonance, 1998
- The general solution to the Bloch equation with constant rf and relaxation terms: Application to saturation and slice selectionMedical Physics, 1993