The paper deals with density continuous functions, which means functions which are continuous if both the domain and the range are equipped with the density topology. The authors have proved that this class is not closed with respect to the addition and have studied the relations between density continuous functions and some well known classes such as analytic, convex, \(C^ \infty\), and approximately continuous functions. It turned out that convex and analytic functions are density continuous, but there exists a \(C^ \infty\)-function which is not. Obviously each density continuous function is approximately continuous, but there exists a density continuous function which is not continuous.