On linear equivalence of the P-adic and P-symbolic topologies

Given two words u and v, the binomial coefficient (t) is the number of ways v appears as a subword (or subsequence) of u. The Thue-Morse sequence is the infinite word t = abbabaab . . . obtained by iteration of the morphism r(a) = ab and z(b) = ba. We show that, for every prime p, and every positive

## Absttrct. Wx t-cfet to the p-adic genwl~rtitn sf ttrw~ transformations propcwd by Everett and Uam [ 2) , dnd remark that the case at onedimcnsional posirson space rs not included there. We g+c a study of cuch a case, tInding out some peculiar features in this paper WC shall point out particular

We found the asymptotics, p Ä , for the number of cycles for iteration of monomial functions in the fields of p-adic numbers. This asymptotics is closely connected with classical results on the distribution of prime numbers.