Answer to Question #164576 in Functional Analysis for Ebenezer

We will search the functions "h,g:[0;2\\pi]\\to\\mathbb{R}" which are "\\mathcal{C}^1". We have "f'=(h-g)'=h'-g'". The functions "h,g" are strictly increasing if "h', g'>0" on "[0;2\\pi]". Thus we need to find two positive continuous functions "h',g'" such that "h'-g'=\\cos x". For "h'" we need to take something that is always strictly bigger than "\\cos x", for example, "h'=2=const". In this case "g'=2-\\cos x". Both are always positive. Now by finding their primitives "h=2x+C, g=2x-\\sin(x)+C", we see that the difference of such two functions is clearly "\\sin(x)" and they both are strictly increasing, as their derivatives are positive.