We survey two series of results concerning the decidability
of fragments of Tarksi’s elementary algebra extended with one-argument
functions which meet significant properties such as continuity, differentiability, or analyticity. One series of results regards the initial levels of
a hierarchy of prenex sentences involving a single function symbol: in
a number of cases, the decision problem for these sentences was solved
in the positive by H. Friedman and A. Seress, who also proved that
beyond two quantifier alternations decidability gets lost. The second
series of results refers to merely existential sentences, but it brings into
play an arbitrary number of functions, which are requested to be, over
specified closed intervals, monotone increasing or decreasing, concave,
or convex; any two such functions can be compared, and in one case,
where each function is supposed to own continuous first derivative, their
derivatives can be compared with real constants
