Transient chaos in fractional Bloch equations

The Bloch equation provides the fundamental description of nuclear magnetic resonance (NMR) and relaxation (T1 and T2). This equation is the basis for both NMR spectroscopy and magnetic resonance imaging (MRI). The fractional-order Bloch equation is a generalization of the integer-order equation tha...

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Bibliographic Details
Published in:Computers & mathematics with applications (1987) 2012-11, Vol.64 (10), p.3367-3376
Main Authors: Bhalekar, Sachin, Daftardar-Gejji, Varsha, Baleanu, Dumitru, Magin, Richard
Format: Article
Language:English
Subjects:
Bloch equation
Chaos
Chaos theory
Fractional calculus
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Summary:The Bloch equation provides the fundamental description of nuclear magnetic resonance (NMR) and relaxation (T1 and T2). This equation is the basis for both NMR spectroscopy and magnetic resonance imaging (MRI). The fractional-order Bloch equation is a generalization of the integer-order equation that interrelates the precession of the x, y and z components of magnetization with time- and space-dependent relaxation. In this paper we examine transient chaos in a non-linear version of the Bloch equation that includes both fractional derivatives and a model of radiation damping. Recent studies of spin turbulence in the integer-order Bloch equation suggest that perturbations of the magnetization may involve a fading power law form of system memory, which is concisely embedded in the order of the fractional derivative. Numerical analysis of this system shows different patterns in the stability behavior for α near 1.00. In general, when α is near 1.00, the system is chaotic, while for 0.98 ≥α≥ 0.94, the system shows transient chaos. As the value of α decreases further, the duration of the transient chaos diminishes and periodic sinusoidal oscillations emerge. These results are consistent with studies of the stability of both the integer and the fractional-order Bloch equation. They provide a more complete model of the dynamic behavior of the NMR system when non-linear feedback of magnetization via radiation damping is present.
ISSN:0898-1221
1873-7668
DOI:10.1016/j.camwa.2012.01.069