A Constructive Approach for Building Wavelet Bases in \( L2(Rd, Rm) \) with Optimal Properties
Abstract
The main contribution of this paper is a constructive method for building separable multivariate vector-valued wavelet bases in the general framework of \( L2(Rd, Rm) \) for any \( d, m ≥ 1 \). While separable wavelet bases in \( L2(Rd, R) \) are well-established and widely applied, the explicit construction of truly vector-valued wavelet bases remains an open problem, even in the simplest case of \( L2(R, R2) \), let alone in \( L2(R2, R2) \). In practice, the conventional approach applies standard separable wavelet bases of \( L2(R2, R) \) independently to each component of vector-valued signals in \( L2(R2, R2) \). However, this approach fails to capture the intrinsic vectorial structure of the signals. To address this limitation, we propose a constructive approach within the vector-valued wavelet framework, providing a systematic method for constructing such bases in the general case of \( L2(Rd, Rm) \). By linking \( m \)-multiwavelets to vector-valued wavelets, our approach not only enables the systematic construction of separable multivariate bases in \( L2(Rd, Rm) \) that satisfy the vector-valued multiresolution analysis but also ensures that these bases inherit key structural properties, making them well-suited for practical applications.
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