@article {Gámez-Merino:2011::167,
title = "A Characterization of Continuity Revisited",
journal = "",
parent_itemid = "",
publishercode ="",
year = "2011",
volume = "118",
number = "2",
publication date ="2011-02-01T00:00:00",
pages = "167-170",
itemtype = "ARTICLE",
url = "https://www.ingentaconnect.com/content/maa/amm/2011/00000118/00000002/art00009",
doi = "doi:10.4169/amer.math.monthly.118.02.167",
author = "G{\’a}mez-Merino, Jos{\’e} L. and Mu{\~n}oz-Fern{\’a}ndez, Gustavo A. and Seoane-Sep{\’u}lveda, Juan B.",
abstract = "It is well known that a function f : R R is continuous if and only if the image of every compact set under f is compact and the image of every connected set is connected. We show that there exist two 2c-dimensional linear spaces of nowhere continuous functions that (except for the zero function) transform compact sets into compact sets and connected sets into connected sets respectively.",
}