Mathematica Bohemica, Vol. 141, No. 1, pp. 83-90, 2016
$C^1$ self-maps on closed manifolds with finitely many periodic points all of them hyperbolic
Jaume Llibre, Víctor F. Sirvent
Abstract: Let $X$ be a connected closed manifold and $f$ a self-map on $X$. We say that $f$ is almost quasi-unipotent if every eigenvalue $\lambda$ of the map $f_{*k}$ (the induced map on the $k$-th homology group of $X$) which is neither a root of unity, nor a zero, satisfies that the sum of the multiplicities of $\lambda$ as eigenvalue of all the maps $f_{*k}$ with $k$ odd is equal to the sum of the multiplicities of $\lambda$ as eigenvalue of all the maps $f_{*k}$ with $k$ even. We prove that if $f$ is $C^1$ having finitely many periodic points all of them hyperbolic, then $f$ is almost quasi-unipotent.
Affiliations: Jaume Llibre, Departament de Matemàtiques, Edifici C, Facultat de Ciències, Universitat Autònoma de Barcelona, Bellaterra, 08193-Barcelona, Catalonia, Spain, e-mail: jllibre@mat.uab.cat; Víctor F. Sirvent, Departamento de Matemáticas, Universidad Simón Bolívar, Apartado Postal 89000, Caracas 1086-A, Venezuela, e-mail: vsirvent@usb.ve
