Título inglés |
A family of M-surfaces whose automorphism groups act transitively on the mirrors. |
Título español |
Familia de M-superficies cuyos grupos de automorfismos actúan transitivamente en los espejos. |
Autor/es |
Melekoglu, Adnan |
Organización |
Adnan Menderes Üniv. Fen-Edebiyat Fak. Mat. Bölümü, Aydm, Turquía |
Revista |
1139-1138 |
Publicación |
2000, 13 (1): 163-181, 13 Ref. |
Tipo de documento |
articulo |
Idioma |
Inglés |
Resumen inglés |
Let X be a compact Riemmann surface of genus g > 1. A symmetry T of X is an anticonformal involution. The fixed point set of T is a disjoint union of simple closed curves, each of which is called a mirror of T. If T fixes g +1 mirrors then it is called an M-symmetry and X is called an M-surface. If X admits an automorphism of order g + 1 which cyclically permutes the mirrors of T then we shall call X an M-surface with the M-property. In this paper we investigate those M-surfaces with the M-property and their automorphism groups. |
Clasificación UNESCO |
120411 |
Palabras clave español |
Funciones de variable compleja ; Superficies Riemann ; Hipersuperficies compactas ; Automorfismos ; Grupos de simetría |
Código MathReviews |
MR1794908 |
Código Z-Math |
Zbl 1053.30521 |
Acceso al artículo completo |