Introduction
The purpose of this talk is to present mappings g of the upper half space H = {X ∈ R3: x3 > 0 } into R3 which resemble in some respects the elliptic modular function and raise some questions in the theory of quasiregular mappings. Each of the mappings g has the following properties:
(1) g is continuous, discrete, open, sense-preserving and has a bounded dilatation in H.
(2) g defines a closed map of H onto R3\P for some set P ⊂ R3 of finite cardinality.
(3) there exists a discrete group G of Mobius transformations acting on H with a non-compact fundamental domain of finite hyperbolic volume in H such that g° A = g for all A ∈ G.
(4) g has no limit at any point b ∈ ∂H.
(1) says that g is quasiregular in the sense of Martio, Rickman and Väisäiä[l]. This means that g ∈ ACL3 and |g'(x)|3 < K(x, g) a. e. in H for some K ∈ [1, ∞), where |g'(x)| denotes the sup norm of the formal derivative g'(x), and J(x, g) = det g'(x).
The class of quasiregular mappings in R3 is a reasonable generalization of holomorphic functions in C; and with (2)–(4) we may consider the mappings g as analogues of the elliptic modular function. However, contrary to the elliptic modular function, none of the mappings g that are constructed here is a local homeomorphism. Martio and I show in [4] that no quasiregular mapping in Rn, n > 3, which satisfies (3) is a local homeomorphism.