搜索结果: 1-8 共查到“理学 the Radon transform”相关记录8条 . 查询时间(0.125 秒)
Fast Slant Stack: A notion of Radon Transform for Data in a Cartesian Grid which is Rapidly Computible, Algebraically Exact, Geometrically Faithful and Invertible
Radon Transform Projection-slice theorem Sinc-Interpolation,
2015/8/21
We define a notion of Radon Transform for data in an n by n grid. It is based on summation
along lines of absolute slope less than 1 (as a function either of x or of y), with values at non-Cart...
Residual d-bar-cohomology and the complex Radon transform on subvarieties of CPn
Residual d-bar-cohomology complex Radon transform subvarieties of CPn
2011/2/24
We show that the complex Radon transform realizes an isomorphism between the space of residual
¯ @-cohomologies of a locally complete intersection subvariety in a linearly concave domain of CPn ...
A remark on primitive cycles and the Radon transform
primitive cycles the Radon transform
2010/11/17
We show that the use of Brylinski's Radon transform elucidates some points of the Green-Griffiths approach to the Hodge conjecture.
Radon Transform on spheres and generalized Bessel function associated with dihedral groups
Radon Transform spheres generalized Bessel function associated dihedral groups
2010/12/14
Abstract. Motivated by Dunkl operators theory, we consider a generating series involving a modified Bessel function and a Gegenbauer polynomial, that generalizes a known series already conside...
INVERSE RADON TRANSFORM WITH ONE-DIMENSIONAL WAVELET TRANSFORM
Radon transform wavelet tran
2007/12/10
In this paper, the wavelet inverse formula of Radon transform is obtained with onedimensional wavelet. The convolution back-projection method of Radon transform is derived from this inverse formula. ...
Fractional Radon Transform and Transform of Wigner Operator
fractional Radon transformation Wigner operator IWOP techneque
2007/8/15
2003Vol.39No.2pp.147-150DOI:
Fractional Radon Transform and Transform of Wigner Operator
FAN Hong-Yi1,2 and CHEN Jun-Hua2
1 CCAST (World Laboratory), P.O. Box 8730, Beij...
From Complex Fractional Fourier Transform to Complex Fractional Radon
Transform
complex fractional Fourier transform Radon transform
2007/8/15
2004Vol.42No.1pp.23-26DOI:
From Complex Fractional Fourier Transform to Complex Fractional Radon
Transform
FAN Hong-Yi and JIANG Nian-Quan
Department of Material Scienc...