On the localization principle for the automorphisms of pseudoellipsoids

Abstract

We show that Alexander's extendibility theorem for a local automorphism of the unit ball is valid also for a local automorphism f of a pseudoellipsoid n(p1, ..., pk) \= \z ∈ n : Σj= 1n - k|zj|2 + |zn-k+1|2 p1 + ... + |zn|2 pk < 1 \, provided that f is defined on a region ⊂ n(p) such that: i) ∂ ∂ n(p) contains an open set of strongly pseudoconvex points; ii) \zi = 0 \ ≠ for any n-k +1 ≤ i ≤ n. By the counterexamples we exhibit, such hypotheses can be considered as optimal.