Factorization of Quasi-Periodic Entire Functions

Hayman has shown that if f is a transcendental entire function and n G 2, then f n f Ј assumes all values except possibly zero infinitely often. We extend his result in three directions by considering an entire algebroid function w, its monomial иии w , and by estimating the growth of the number of

Simulating ballistic transport through square quantum dots, we find quasi-periodic conductance fluctuations and power spectra containing few frequencies, indicating few periodic orbits participate, in very good agreement with some recent experiments. We also find corresponding scar-like features in

Special entire functions of completely regular growth with additional properties are utilized to interpolate entire functions with certain bounds, and to give an example of a weighted inductive limit of Banach spaces of entire functions such that its topology cannot be described by the canonical wei

## 1 Ž . x 4 q my1h , and E E denotes the restriction to the real line ‫ޒ‬ of entire j g ‫ޚ‬ 2 functions of exponential type . From this connection, we solve two extremal problems of some fundamental classes of functions defined of ‫.ޒ‬

We investigate expansions of periodic functions with respect to wavelet bases. Direct and inverse theorems for wavelet approximation in C and L p norms are proved. For the functions possessing local regularity we study the rate of pointwise convergence of wavelet Fourier series. We also define and i