Title :
The Error-Amended Sharp Edge (EASE) Scheme for Image Zooming
Author :
Cha, Youngjoon ; Kim, Seongjai
Author_Institution :
Dept. of Appl. Math., Sejong Univ., Seoul
fDate :
6/1/2007 12:00:00 AM
Abstract :
This paper proposes a new interpolation method, called the error-amended sharp edge (EASE) scheme, which is a modified bilinear method. In order to remove/reduce interpolation artifacts such as image blur and the checkerboard effect (ringing), EASE tries to amend the interpolation error by employing the classical interpolation error theorem in an edge-adaptive fashion. EASE is applied for image zooming by both integer and noninteger magnification factors. The new interpolation scheme has proved to result in high-resolution images having clearer and sharper edges than linear interpolation methods, for all synthetic and natural images we have tested. EASE can be implemented with ease; it turns out to be similarly efficient as cubic interpolation schemes
Keywords :
image resolution; image sampling; interpolation; EASE scheme; bilinear method; checkerboard effect; cubic interpolation schemes; error-amended sharp edge scheme; high-resolution images; image blur; image sampling; image zooming; integer magnification factors; interpolation artifact reduction; interpolation artifact removal; interpolation error theorem; linear interpolation method; noninteger magnification factors; ringing; Computational efficiency; Discrete transforms; Image resolution; Image sampling; Interpolation; Kernel; Mathematics; Pixel; Statistics; Testing; Checkerboard effect; directional Sobel derivative; error-amended sharp edge (EASE) scheme; image zooming; interpolation; interpolation error theorem; Algorithms; Artifacts; Computer Graphics; Image Enhancement; Image Interpretation, Computer-Assisted; Information Storage and Retrieval; Numerical Analysis, Computer-Assisted; Signal Processing, Computer-Assisted;
Journal_Title :
Image Processing, IEEE Transactions on
DOI :
10.1109/TIP.2007.896645
