Mathematics – Complex Variables
Scientific paper
2004-04-24
Journal of Inverse and Ill-Posed Problems, 2004, Vol. 12, No.3, pp. 245-278.
Mathematics
Complex Variables
LaTeX, 37 pages with 5 figures
Scientific paper
In this article we study the fan-beam Radon transform ${\cal D}_m $ of symmetrical solenoidal 2D tensor fields of arbitrary rank $m$ in a unit disc $\mathbb D$ as the operator, acting from the object space ${\mathbf L}_{2}(\mathbb D; {\bf S}_m)$ to the data space $L_2([0,2\pi)\times[0,2\pi)).$ The orthogonal polynomial basis ${\bf s}^{(\pm m)}_{n,k}$ of solenoidal tensor fields on the disc $\mathbb D$ was built with the help of Zernike polynomials and then a singular value decomposition (SVD) for the operator ${\cal D}_m $ was obtained. The inversion formula for the fan-beam tensor transform ${\cal D}_m $ follows from this decomposition. Thus obtained inversion formula can be used as a tomographic filter for splitting a known tensor field into potential and solenoidal parts. Numerical results are presented.
Bukhgeim Alexandre A.
Kazantsev Sergey G.
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