Fixed points in non-invariant plane continua

Abstract

If f:[a,b] R, with a<b, is continuous and such that a and b are mapped in opposite directions by f, then f has a fixed point in I. Suppose that f:C is map and X is a continuum. We extend the above for certain continuous maps of dendrites X D, X⊂ D and for positively oriented maps f:X C, X⊂ C with the continuum X not necessarily invariant. Then we show that in certain cases a holomorphic map f:C must have a fixed point a in a continuum X so that either a∈ Int(X) or f exhibits rotation at a.