Growth-type invariants for ℤdsubshifts of finite type and arithmetical classes of real numbers

In this paper we develop two ways of computing special values of zeta function attached to a real quadratic field. Comparing these values we obtain various class number 1 criteria for real quadratic fields of Richaud Degert type.

In this paper we will apply Biró's method in [A. Biró, Yokoi's conjecture, Acta Arith. 106 (2003) 85-104; A. Biró, Chowla's conjecture, Acta Arith. 107 (2003) 179-194] to class number 2 problem of real quadratic fields of Richaud-Degert type and will show that there are exactly 4 real quadratic fiel

The aim of this paper is to solve a division problem for the algebra of functions, which are holomorphic in a domain D ⊂ C n , n > 1, and grow near the boundary not faster than some power oflog dist(z, bD). The domain D is assumed to be smoothly bounded and convex of finite d'Angelo type.