FrameWaveletswithCompactSupportsforL2（R~n）

<正> The construction of frame wavelets with compact supports is a meaningful problem inwavelet analysis.In particular,it is a hard work to construct the frame wavelets with explicit analyticforms.For a given n×n real expansive matrix A,the frame-sets with respect to A are a family ofsets in R~n.Based on the frame-sets,a class of high-dimensional frame wavelets with analytic formsare constructed,which can be non-bandlimited,or even compactly supported.As an application,the construction is illustrated by several examples,in which some new frame wavelets with compactsupports are constructed.Moreover,since the main result of this paper is about general dilationmatrices,in the examples we present a family of frame wavelets associated with some non-integerdilation matrices that is meaningful in computational geometry.