2017

Fasciculi Mathematici

Rocznik: 2017 | Numer: nr 59

artykuł naukowy

angielski

EN We study the growth of the transcendental meromorphic solution f(z) of the linear difference equation: ∑_j=oⁿ p_j (z)f (z+j)=q(z), where q(z), p₀(z), . . ., p_n(z) (n ≥ 1) are polynomials such that p₀(z)p_n(z) ≠ 0, and obtain some necessary conditions guaranteeing that the order of ƒ(z) satisfies σ(ƒ) ≥ 1 using a difference analogue of the Wiman-Valiron theory. Moreover, we give the form of ƒ(z) with two Borel exceptional values when two of p₀(z), . . ., p_n(z) have the maximal degrees.

159 - 168

10.1515/fascmath-2017-0024

CC BY-NC-ND (uznanie autorstwa - użycie niekomercyjne - bez utworów zależnych)

Pobierz plik

publiczny

10

10