Artstein, Z., Burns, J.: Integration of compact set-valued function. Pacific J. Math. 58, 297–307 (1975)
Artstein, Z.: On the calculus of closed set-valued functions. Indiana Univ. Math. J. 24(5), 433–441 (1975)
Aubin, J.-P., Frankowska, H.: Set-valued analysis. Birkhaüser Boston Inc., Boston (1990)
Aumann, R.J.: Integrals of set-valued functions. J. of Math. Anal. Appl. 12, 1–12 (1965)
Baier, R., Farkhi, E.: Regularity and integration of set-valued maps represented by generalized Steiner points. Set-Valued Anal. 15(2), 185–207 (2007)
Chistyakov, V.V.: Selections of bounded variation. J. Appl. Anal. 10, 1–82 (2004)
Dyn, N., Farkhi, E.: Set-valued approximations with Minkowski averages – convergence and convexification rates. Numer. Funct. Anal. Optim. 25, 363–377 (2004)
Dyn, N., Farkhi, E., Mokhov, A.: Approximations of set-valued functions by metric linear operators. Constr. Approx. 25, 193–209 (2007)
Dyn, N., Farkhi, E., Mokhov, A.: Approximations of set-valued functions (adaptation of classical approximation operators). Imperial College Press, London (2014)
Kels, S., Dyn, N.: Reconstruction of 3D objects from 2D cross-sections with the 4-point subdivision scheme adapted to sets. Comput. Graph. 35, 741–746 (2011)
Kolmogorov, A., Fomin, S.: Introductory real analysis. Dover Publication, New York (1975)
Mokhov, A.: Approximation and representation of set-valued functions with compact images. Tel-Aviv University, PhD Thesis (2011)
Natanson, I.P.: Theory of Functions of a Real Variable, vol. II. Frederick Ungar, New York (1960)
Rockafellar, R.T., Wets, R.: Variational analysis. Springer, Berlin (1998)
Schneider, R.: Convex Bodies: The Brunn–Minkowski Theory. Cambridge University Press, Cambridge (1993)
Vitale, R.A.: Approximations of convex set-valued functions. J. Approximation Theory 26, 301–316 (1979)