Poincaré recurrences and multifractal properties of genomic sequences

Bialgebras, defined by means of Yang᎐Baxter operators which verify the Hecke equation, are considered. It is shown that they are Koszul algebras. Their Poincare śeries are calculated via the Poincare series of the corresponding quantum planes. ᮊ 1997 Academic Press \* Supported by DFG at the Graduie

This paper is mainly concerned with the study of recurrences defined by Mo biustransformations, whose solutions are the orbits of points on the Riemann-sphere under a sequence of Mo bius-transformations. We study the asymptotic behaviour of such solutions in relation to the asymptotic behaviour of t

The ribosomal RNA genes of Triturus vulgaris meridionalis are clustered at variable and often multiple chromosomal loci. The rDNA repeats exhibit only a limited and discrete length heterogeneity whicla is accounted for by the non-transcribed spacer (NTS). Interestingly, sequences homologous to the N