Answering a question asked by K. C.
Ciesielski and T. Glatzer in 2013, we construct a C1-smooth function f on [0,1] and a closed set M subset of graphf nowhere dense in graphf such that there does not exist any linearly continuous function on R2 (i.e., function continuous on all lines) which is discontinuous at each point of M.
We substantially use a recent full characterization of sets of discontinuity points of linearly continuous functions on Rn proved by T. Banakh and O.
Maslyuchenko in 2020. As an easy consequence of our result, we prove that the necessary condition for such sets of discontinuities proved by S.
G. Slo-bodnik in 1976 is not sufficient.
We also prove an analogue of this Slobodnik's result in separable Banach spaces.