@article {LoPo2005,
 author="Rainer L\"owen and Burkard Polster",
 title={Linear geometries on the Moebius strip: a theorem of Skornyakov type},
 journal="Bull. Austral. Math. Soc.",
 fjournal={Bulletin of the Australian Mathematical Society},
 volume="72",
 year="2005",
 number="1",
 pages="17--30",
 issn="0004-9727",
 coden="ALNBAB",
 language="English",
 date="17th January, 2005",
 classmath="51H10",
 publisher={AMPAI, Australian Mathematical Society},
 MRnumber="MR2162290",
 ZBLnumber="02212182",
 url="http://www.austms.org.au/Publ/Bulletin/V72P1/721-5019-LoPo/index.shtml",
 acknowledgement={},
 abstract={\noindent We show that the continuity properties of a stable plane are automatically satisfied if we have a linear space with point set a Moebius strip, provided that the lines are closed subsets homeomorphic to the real line or to the circle. In other words, existence of a unique line joining two distinct points implies continuity of join and intersection. For linear spaces with an open disk as point set, the same result was proved by Skornyakov. }
}