Ushiki's theorem

In mathematics, particularly in the study of functions of several complex variables, Ushiki's theorem, named after S. Ushiki, states that certain well-behaved functions cannot have certain kinds of well-behaved invariant manifolds.

The theorem[edit]

A biholomorphic mapping ${\displaystyle F:\mathbb {C} ^{n}\to \mathbb {C} ^{n}}$ cannot have a 1-dimensional compact smooth invariant manifold. In particular, such a map cannot have a homoclinic connection or heteroclinic connection.

Commentary[edit]

Invariant manifolds typically appear as solutions of certain asymptotic problems in dynamical systems. The most common is the stable manifold or its kin, the unstable manifold.

The publication[edit]

Ushiki's theorem was published in 1980.^[1] The theorem appeared in print again several years later, in a certain Russian journal, by an author apparently unaware of Ushiki's work.

An application[edit]

The standard map cannot have a homoclinic or heteroclinic connection. The practical consequence is that one cannot show the existence of a Smale's horseshoe in this system by a perturbation method, starting from a homoclinic or heteroclinic connection. Nevertheless, one can show that Smale's horseshoe exists in the standard map for many parameter values, based on crude rigorous numerical calculations.

See also[edit]

• Melnikov distance
• Equichordal point problem

References[edit]