I'm not sure about the mathematics if
diff(conjugate(x), x) should be zero. The fact that
diff(x,x.conjugate()) gives zero has nothing to do with mathematics (and might even be considered a SymPy bug). It gives zero simply because
x does not contain
conjugate(x) (symbolically), so it sees it as a constant with respect to it. This is probably wrong, since
x is not a constant with respect to
conjugate(x). The fact that SymPy lets you take derivatives with respect to defined functions is probably a bug, actually. It is supposed to allow things like
diff(f(x)**2, f(x)), where
f = Function('f') is an undefined function, but for defined functions, it is probably mathematically incorrect (or at least not what you expect).
See http://docs.sympy.org/latest/modules/core.html?highlight=derivative#sympy.core.function.Derivative, particularly the section on derivatives wrt non-Symbols. To paraphrase, taking derivatives with respect to a function is just a notational convenience and does not represent a mathematical chain rule. Rather, something like
diff(x, conjugate(x)) should be thought of as something like
diff(x.subs(conjugate(x), dummy), dummy).subs(dummy, conjugate(x)).
conjugate(x).diff(x), this gives an unevaluated derivative because no derivative is defined for conjugate. I'm not sure if any closed-form answer is possible here anyway. Probably this is the most useful thing that SymPy could return. I can't find any good answers anywhere as to what a reasonable answer for this should be (you should ask on math SE to get a better answer about it).