Pseudo-Anosov mappings and toral automorphisms

Abstract

For every irreducible automorphism φ∈SL3( Z) of the 3-torus, for which the product of the expanding eigenvalues is positive, we construct a pseudo-Anosov mapping f of an associated surface, semi-conjugate and almost-isomorphic to φ, whose stretch factor is the product of the expanding eigenvalues of φ. This shows that any norm-1 cubic Pisot number occurs as the stretch factor of a pseudo-Anosov mapping, proving a conjecture of Fried in degree 3. A similar construction works for the 4-torus on condition that φ has exactly two eigenvalues outside the unit circle (and whose product is positive). Furthermore for any irreducible hyperbolic automorphism φ∈SLn( Z) of the n-torus, n 4, we construct a pseudo-Anosov mapping semiconjugate and almost-isomorphic to any sufficiently large power of φ.