Common boundary regular fixed points for holomorphic semigroups in strongly convex domains
Abstract
Let D be a bounded strongly convex domain with smooth boundary in CN. Let (φt) be a continuous semigroup of holomorphic self-maps of D. We prove that if p∈ ∂ D is an isolated boundary regular fixed point for φt0 for some t0>0, then p is a boundary regular fixed point for φt for all t≥ 0. Along the way we also study backward iteration sequences for elliptic holomorphic self-maps of D.
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