Abstract
AbstractA compact hyperbolic surface of genus g is called an extremal surface if it admits an extremal disc, a disc of the largest radius determined by g. Our problem is to find how many extremal discs are embedded in non-orientable extremal surfaces. It is known that non-orientable extremal surfaces of genus g > 6 contain exactly one extremal disc and that of genus 3 or 4 contain at most two. In the present paper we shall give all the non-orientable extremal surfaces of genus 5, and find the locations of all extremal discs in those surfaces. As a consequence, non-orientable extremal surfaces of genus 5 contain at most two extremal discs.
Publisher
Cambridge University Press (CUP)
Cited by
4 articles.
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1. Multiple Extremal Disc-Packings in Compact Hyperbolic Surfaces;Experimental Mathematics;2022-06-08
2. Extremal disc packings in compact hyperbolic surfaces;Revista Matemática Complutense;2017-12-04
3. Compact non-orientable surfaces of genus 6 with extremal metric discs;Conformal Geometry and Dynamics of the American Mathematical Society;2016-06-20
4. Compact Klein surfaces of genus 5 with a unique extremal disc;Conformal Geometry and Dynamics of the American Mathematical Society;2013-02-28