8/17    Helo, does anybody recall/know the definition of a
        Quasiperiodic Function. Ok tnx. [it isnt a class of
        nowhere differntiable func, is it?]
        \_ Google, page 3.  Lazy ass.
           \_ I dont think you know what you are reading.
              \_ A function (over a field F) is considered quasiperiodic with
                 period \omega if there exist a, b \in F such that
                 f(z + \omega) = f(z)*e^{az + b}.
                 Lazy ass.  You couldn't google for the obvious thing and look
                 for the first few pages of the results?
        \_ A function f is quasi periodic if and only if the set of
           its Fourier exponents has an integer and finite basis.