The structure of continuous rigid functions of two variables

Abstract

A function f:n is called vertically rigid if graph(cf) is isometric to graph (f) for all c ≠ 0. We settled Jankovi\'c's conjecture in a separate paper by showing that a continuous function f: is vertically rigid if and only if it is of the form a+bx or a+bekx (a,b,k ∈ ). Now we prove that a continuous function f:2 is vertically rigid if and only if after a suitable rotation around the z-axis f(x,y) is of the form a + bx + dy, a + s(y)ekx or a + bekx + dy (a,b,d,k ∈ , k ≠ 0, s : continuous). The problem remains open in higher dimensions.