Quantitative Susceptibility Mapping of Magnetic Quadrupole Moments

Abstract EN

We modeled the magnetic field up to the quadrupole term to investigate not only the average susceptibility (dipole), but also the susceptibility distribution (quadrupole) contribution.

Expanding the magnetic field up to the 2nd order provides the quadrupole (0th: monopole, 1st: dipole).

Numerical simulations were performed to investigate the quadrupole contribution with subvoxel nonuniformity.

Conventional dipole and our dipole + quadrupole models were compared in the simulation, the phantom and human brain.

Furthermore, the quadrupole field was compared with the anisotropic susceptibility field in the dipole tensor model.

In a nonuniformity case, numerical simulations showed a nonnegligible quadrupole field contribution.

Our study showed a difference between the two methods in the susceptibility map at the edges; both the phantom and human studies showed sharper structural edges with the dipole + quadrupole model.

Quadrupole moments showed contrast mainly at the structural boundaries.

The quadrupole moment field contribution was smaller but nonnegligible compared to the anisotropic susceptibility contribution.

Nonuniform and uniform source distributions can be separately considered by quadrupole expansion, which were mixed together in the dipole model.

In the presence of nonuniformity, the susceptibility maps may be different between the two models.

For a comprehensive field model, the quadrupole might need to be considered along with susceptibility anisotropy and microstructure effects.