Consider a surface somewhat like bottom of a boat. Imagine cutting a paraboloid (see picture) in half, pulling the halves at a distance and joining the two halves with a matching parabolic cylinder (see picture).
In other words consider $f(z)$ for $z=x+iy$ as follows:
$f(z) = x + 0i$, when $-10 \le x \le 10$ and $y = 0$
$f(z)=x + iy^2$, when $-10 \le x \le 10$ and $y \ne 0$
$f(z)=(x+10)^2 + iy^2$, when $x < -10$
$f(z)=(x-10)^2 + iy^2$, when $x > 10$
Is this surface holomorphic at all points on the segment connecting $z1=10+0i$ and $z2=-10+0i$, (including the end points).
Thanks
In this case the fibre of $0$ under $f$ (a.k.a. $f^{-1}[\{0\}]$) has a limit point. By the Identity Theorem, $f$ must be zero everywhere if it is holomorphic, but it is not.