For a dyadic wavelet set W, Ionascu [A new construction of wavelet sets, Real Anal. Exchange28 (2002) 593–610] obtained a measurable self-bijection on the interval [0, 1), called the wavelet induced isomorphism of [0, 1), denoted by [Formula: see text]. Extending the result for a d-dilation wavelet set, we characterize a joint (d, -d)-dilation wavelet set, where |d| is an integer greater than 1, in terms of wavelet induced isomorphisms. Its analogue for a joint (d, -d)-dilation multiwavelet set has also been provided. In addition, denoting by [Formula: see text], the wavelet induced isomorphism associated with a d-dilation wavelet set W, we show that for a joint (d, -d)-dilation wavelet set W, the measures of the fixed point sets of [Formula: see text] and [Formula: see text] are equal almost everywhere.
In this paper, we show that [½, 1) is not a fixed point set of any wavelet induced isomorphism. The same holds for [0, ½). This settles Problem 1 posed in the paper "On wavelet induced isomorphisms" by Singh in Int. J. Wavelets Multiresolut. Inf. Process.8 (2010) 359–371. Further, we obtain that every other subinterval of [0, 1) of measure ½ is a fixed point set of some wavelet induced isomorphism.
An analog of extended real line, [Formula: see text]-sphere and [Formula: see text]-disc in the setting of digital topology has been provided and the fundamental group of the digital circle has been computed which comes out to be the additive group [Formula: see text] of integers.
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