ANTIMONOTONICITY - CONCURRENT CREATION AND ANNIHILATION OF PERIODIC-ORBITS

One-parameter families fλof diffeomorphisms of the Euclidean plane are known to have a complicated bifurcation pattern as λ varies near certain values, namely where homoclinic tangencies are created. We argue that the bifurcation pattern is much more irregular than previously reported. Our results contrast with the monotonicity result for the well-understood one-dimensional family gλ(x) = λx(1 − x), where it is known that periodic orbits are created and never annihilated as λ increases. We show that this monotonicity in the creation of periodic orbits never occurs for any one-parameter family of C3area contracting diffeomorphisms of the Euclidean plane, excluding certain technical degenerate cases where our analysis breaks down. It has been shown that in each neighborhood of a parameter value at which a homoclinic tan-gency occurs, there are either infinitely many parameter values at which periodic orbits are created or infinitely many at which periodic orbits are annihilated. We show that there are both infinitely many values at which periodic orbits are created and infinitely many at which periodic orbits are annihilated. We call this phenomenon antimonotonicity. © 1990 American Mathematical Society.