Title :
On interpolation of differentially structured images
Author :
Kirshner, Hagai ; Porat, Moshe
Author_Institution :
Dept. of Electr. Eng., Technion - Israel Inst. of Technol., Haifa, Israel
Abstract :
A vector space approach to image reconstruction is derived and introduced. The continuous-domain image is assumed to belong to a reproducing kernel Hilbert space and the sampling process is shown to correspond to an appropriate orthogonal projection. The values at the interpolating grid are shown to correspond to a set of inner product calculations, giving rise to a minimax solution for an ℓ2 approximation problem. A tight upper bound on the ensued error is then derived and demonstrated. Examples of image resizing show that the proposed method yields better results than presently available methods, including the cubic B-spline method, in terms of SNR.
Keywords :
Hilbert spaces; approximation theory; image reconstruction; image sampling; interpolation; minimax techniques; splines (mathematics); ℓ2 approximation problem; continuous-domain image; cubic B-spline method; differentially structured images; grid interpolation; image reconstruction; kernel Hilbert space; minimax solution; orthogonal projection; sampling process; vector space approach; Image reconstruction; Interpolation; Kernel; Signal processing; Splines (mathematics); Upper bound;
Conference_Titel :
Signal Processing Conference, 2007 15th European
Conference_Location :
Poznan
Print_ISBN :
978-839-2134-04-6
