General pulsed-field gradient signal attenuation expression based on a fractional integral modified-Bloch equation
Guoxing Lin

TL;DR
This paper introduces a new fractional integral modified-Bloch equation for PFG anomalous diffusion, providing a general analytical signal attenuation expression that accounts for finite pulse width effects and aligns with CTRW simulations.
Contribution
It proposes a novel integral type modified-Bloch equation based on fractional derivatives, differing from traditional differential forms, and derives comprehensive solutions including FGPW effects.
Findings
The new equations match CTRW simulation results.
The relaxation effects differ between anomalous and normal diffusion.
The solutions enable better analysis of PFG anomalous diffusion in NMR/MRI.
Abstract
Anomalous diffusion has been investigated in many polymer and biological systems. The analysis of PFG anomalous diffusion relies on the ability to obtain the signal attenuation expression. However, the general analytical PFG signal attenuation expression based on the fractional derivative has not been previously reported. Additionally, the reported modified-Bloch equations for PFG anomalous diffusion in the literature yielded different results due to their different forms. Here, a new integral type modified-Bloch equation based on the fractional derivative for PFG anomalous diffusion is proposed, which is significantly different from the conventional differential type modified-Bloch equation. The merit of the integral type modified-Bloch equation is that the original properties of the contributions from linear or nonlinear processes remain unchanged at the instant of the combination.…
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