Continuous Transitive Maps on the Interval Revisited

Abstract

In this note, continuous transitive maps f on the interval I are re-addressed, where I denotes one of the intervals: (-∞, ∞), (-∞, a], [b, ∞), [a, b], where a < b are real numbers. Such maps must have a fixed point, say z, in the interior of I. Some well-known properties of such maps are re-proved in a systematic way according to the following : (1) f moves some point c z away from z, i.e., fo some point c z, we have f(c) c < z or z < c f(c); (2) f moves some point c z towards but not "over" z, i.e., for some point c z, we have c < f( c) < z or z < f( c) < c; and (3) f moves all points x z to the other side of z, i.e., for all points x z, we have x < z f(x) and f(x) x < z. The proofs are arranged in such ways that they yield the same results. For example, Theorem 3 treats maps satisfying Condition (1) or Condition (2) while Theorem 4 treats separately maps satisfying Condition (1) and, Conditions (2) or (3). Characterizations of continuous bitransitive maps on an interval are re-addressed and a new chaotic property of continuous bitransitive maps is also introduced (Theorem 8, p.21). In this revision, we correct Corollary 9 and some errors in the proof of Theorem 8 and move the Appendix to a different paper [15] in which we generalize Theorem 8 for continuous weakly mixing (i.e., bitransitive) maps on intervals to continuous weakly mixing maps and continuous mixing maps on infinite separable locally compact metric spaces.