Avoidance criteria for normality of quasiregular mappings

Abstract

Peter Lappan in [9] proved that for each n∈ N=\1,2,3,…\, let f1,n, f2,n and f3,n be three continuous functions on D:=\z∈ C : |z| < 1\ such that for each j=1,2,3, the sequence (fj,n) converges locally uniformly to a function fj on D. Suppose that the three functions f1, f2, and f3 avoid each other on D. Let F =(gn) be a sequence of meromorphic functions in D with the property that for each n, the four functions gn, f1,n, f2,n, and f3,n avoid each other, then F is normal. We present here an analogue of this result in the setting of quasiregular mappings. We also obtain analogues of a few other results by Peter Lappan in [9] to quasiregular setting in the Euclidean space Rn for normal families and normal quasiregular mappings.