A uniqueness of periodic maps on surfaces

抄録

Kulkarni showed that, if g is greater than 3, a periodic map on an oriented surface Σ_g of genus g with order not smaller than 4g is uniquely determined by its order, up to conjugation and power. In this paper, we show that, if g is greater than 30, the same phenomenon happens for periodic maps on the surfaces with orders more than 8g/3, and, for any integer N, there is g > N such that there are periodic maps of Σ_g of order 8g/3 which are not conjugate up to power each other. Moreover, as a byproduct of our argument, we provide a short proof of Wiman's classical theorem: the maximal order of periodic maps of Σ_g is 4g + 2.