Classifying Cardinal Orthogonal Scaling Function with Dilation Factor 3

Lan Feng  Wang; Kai Jun Sun; Jing Ben  Yin

doi:10.4028/www.scientific.net/AMR.282-283.437

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HomeAdvanced Materials ResearchAdvanced Materials Research Vols. 282-283Classifying Cardinal Orthogonal Scaling Function...

Classifying Cardinal Orthogonal Scaling Function with Dilation Factor 3

Abstract:

Sampling theorem plays an important role in many fields such as signal processing and image processing. In this paper, the cardinal orthogonal scaling function with dilation factor 3 is classified by the highpass filter coefficient, thus, the sampling theorem in the wavelet subspace is obtained. Then, the symmetry property of cardinal orthogonal scaling function is discussed.

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Advanced Materials Research (Volumes 282-283)

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437-439

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https://doi.org/10.4028/www.scientific.net/AMR.282-283.437

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Online since:

July 2011

Authors:

Lan Feng Wang, Kai Jun Sun, Jing Ben Yin

Keywords:

Cardinal Orthogonal Scaling Function, Dilation Factor, Highpass Filter Coefficient, Sampling Theorem, Symmetry Property

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