Multidimensional Periodic Multiwavelets

Smooth orthogonal and biorthogonal multiwavelets on the real line with their scaling function vectors being supported on [-1, 1] are of interest in constructing wavelet bases on the interval [0, 1] due to their simple structure. In this paper, we shall present a symmetric C 2 orthogonal multiwavelet

A procedure is given for constructing univariate compactly supported, biorthogonal multiwavelets from biorthogonal scaling vectors with support in [Ϫ1, 1]. A family of biorthogonal scaling vectors is constructed using fractal interpolation functions, and the associated biorthogonal multiwavelets are

We develop the theory of oblique multiwavelet bases, which encompasses the orthogonal, semiorthogonal, and biorthogonal cases, and we circumvent the noncommutativity problems that arise in the construction of multiwavelets. Oblique multiwavelets preserve the advantages of orthogonal and biorthogonal

## Abstract Modeling and simulation of seminconductor devices requires solution of highly nonlinear equations, such as the Boltzmann transport, hydrodynamic, and drift‐diffusion equations. The conventional finite‐element method (FEM) and finite difference (FD) schemes always result in oscillatory r

[146][147][148][149][150][151][152][153][154][155][156][157][158] defined certain period matrices whose entries are Euler-type integrals representing hypergeometric functions of several variables and derived remarkable closed-form expressions for the determinants of those matrices. In this article,

For compactly supported symmetric-antisymmetric orthonormal multiwavelet systems with multiplicity 2, we first show that any length-2N multiwavelet system can be constructed from a length-(2N + 1) multiwavelet system and vice versa. Then we present two explicit formulations for the construction of m