International Journal of Mathematics and Mathematical Sciences
Volume 2003 (2003), Issue 54, Pages 3469-3477
doi:10.1155/S0161171203208346
Separately continuous functions: approximations, extensions, and restrictions
Zbigniew Piotrowski1
and Robert W. Vallin2
1Department of Mathematics and Statistics, Youngstown State University, Youngstown 44555, OH, USA
2Department of Mathematics, Slippery Rock University of Pennsylvania, Slippery Rock 16057, PA, USA
Abstract
A function f(x,y) is separately continuous if at any point the restricted functions fx(y) and fy(x) are continuous as functions of one variable. In this paper, we use several results which have been obtained for other generalized continuities and apply them to functions which are separately continuous.