Malozemov, V.N.; Masharsky, S.M. Generalised wavelet bases related with discrete Vilenkin-Chrestenson transform Basing on the discrete Vilenkin-Chrestenson transform, two recurrent sequences of orthogonal bases in a space of discrete $N$-periodic signals with $N=n^s$ are constructed. It is shown how to form generalised wavelet packets using those bases. Haar-Chrestenson wavelet bases related with subsampling in time and subsampling in frequency are examined in detail. The structure of wavelet subspaces is clarified. The formulas of decomposition and reconstruction are obtained. [AMS Subj-class] 42C10 Fourier series in special orthogonal functions [Contact e-mail] malv@gamma.math.spbu.ru (V. N. Malozemov) [Comments] 49 pages, 2 pictures, 1 table, in Russian [Files] 99-21.ps.gz 120Kb - Compressed PostScript