In this paper, we investigate properties of generalized convexities based on algebraic operations introduced by Ben Tal [A. Ben Tal, On generalized means and generalized convex functions, J. Optim. Theory Appl. 21 (1977) 1–13] and relations between these generalized convexities and generalized monotonicities. We also discuss the
(h,φ)-generalized directional derivative and gradient, and explore the relation between this gradient and the Clarke generalized gradient. Definitions of some generalized averages of the values of a generalized convex function at
n equally spaced points based on the algebraic operations are also presented and corresponding results are obtained. Finally, the
(φ,γ)-convexity is defined and some properties of
(φ,γ)-convex functions are derived.