Isomorphism in wavelets

來源:?黨委研究生工作部、數(shù)理學院發(fā)布時間:2019-05-20

【講座題目】Isomorphism in wavelets

【講座時間】2019年5月22日(星期三)15:00-16:00

【講座地點】北京校部主樓C636

【主 講 人】戴興德 教授

【主講人簡介】

戴興德,美國德克薩斯A&M大學獲得博士學位,現(xiàn)為美國北卡羅來納夏洛特分校終身教授。戴教授是國際著名的泛函分析與小波分析專家,他和導師D. Larson教授于上世紀90年代成功地將泛函分析算子代數(shù)與調和分析框架小波理論相結合,開創(chuàng)了這兩個領域交叉研究的新方向,該理論具有著廣泛的理論和應用價值,是國際研究的熱點領域,被國際上稱為Dai-Larson理論。戴教授的開創(chuàng)性的研究成果(高倍引論文)為 Wandering vectors for unitary systems and orthogonal wavelets (Mem. Amer. Math. Soc.134 (1998), no. 640, viii+68 pp);  Wavelet sets in Rn ( J. Fourier Anal. Appl.3 (1997), no. 4, 451–456);  Wavelet sets in rn II (Amer. Math. Soc., Providence, RI, 1998) 。

【內容簡介】

Two scaling functions and for Parseval frame wavelets are algebraically isomorphic,  , if they have matching solutions to their (reduced) isomorphic systems of equations.

Let A and B be d×d and s×s dyadic expansive integral matrices with d, s≥1  respectively and let   be a scaling function associated with matrix A and generated by a finite solution. Then there always exists a scaling function   associated with matrix B such that    is algebraically isomorphic to  .

An example shows that the assumption on the finiteness of the solutions can not be removed.


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