In the theory of holomorphic functions of several variables, Hartogs's theorem that any holomorphic function on a punctured open set of  ![\mathbb C^n](http://latex.mathoverflow.net/png?%5Cmathbb%20C%5En) (  ![n\geqslant 2](http://latex.mathoverflow.net/png?n%5Cgeqslant%202) ) can holomorphically be continued through the deleted point really started the subject and is still the most spectacular divide between ![n \geqslant 2](http://latex.mathoverflow.net/png?n%20%5Cgeqslant%202) and ![$n=1$](http://latex.mathoverflow.net/png?%24n%3D1%24)  [ where it is completely false : on ![\mathbb C^\ast ](http://latex.mathoverflow.net/png?%5Cmathbb%20C%5E%2A) look at 1/z or, worse,  exp(1/z): these functions clearly can't be continued holomorphically through zero]