Each S-compact subset of R is countable. Proof. Let K be an uncountable subset of R. Then K is S-Lindelöf (because every subset of R is S-Lindelöf (see [3], p. 59)) and, because K i
a) K is closed and bounded
b) K is open and unbounded
c) K is closed and unbounded
d) K is open and bounded
