Abstract:
Three theorems are presented concerning continuous maps of the Sorgenfrey line $S$ onto the real line $R$. The first theorem proves the existence of an open map, the second theorem establishes the nonexistence of an open countably-multiple map, and the third theorem states the impossibility of a weakly closed map.
Keywords:Sorgenfrey line, real line, open map, weakly closed map, $d$-map, $c$-to-1 map.
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