Image modeling with linear scale-invariant systems

Scaling or dilation is an integral part of the wavelet transform. The wavelet transform possesses certain scale- invariance properties. This paper explores scale invariance further in the construction of linear, 2D, discrete-space, scale-invariant systems. Through a new definition of discrete-space, continuous-parameter dilation operation, deterministic and stochastic self-similarity in images is studied. It is shown that the dilation operation leads to the construction of linear scale-invariant systems for digital images. The paper provides methods for constructing such systems and shows application to the modeling of texture images.

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