Obstacles to periodic orbits hidden at fixed point of holomorphic maps

Abstract: Let $f:(\mathbb{C}^n,0)\mapsto(\mathbb{C}^n,0)$ be a germ of an $n$-dimensional holomorphic map. Assume that the origin is an isolated fixed point of each iterate of $f$. Then ${\mathcal{N}q(f)}{q=1}^{\infty}$, the sequence of the maximal number of periodic orbits of period $q$ that can be born from the fixed point zero under a small perturbation of $f$, is well defined. According to Shub-Sullivan, Chow-Mallet-Paret-Yorke and G. Y. Zhang, the linear part of the holomorphic germ $f$ determines some natural restrictions on the sequence(cf. Theorem 1.1). Later, I. Gorbovickis proves that when the linear part of $f$ is contained in a certain large class of diagonal matrices, it has no other restrictions on the sequence only when the dimension $n\leq2$ (cf. Theorem 1.3). In this paper for the general case we obtain a sufficient and necessary condition that the linear part of $f$ has no other restrictions on the sequence ${\mathcal{N}q(f)}{q=1}^{\infty}$, except the ones given by Theorem 1.1.