In section 2.2 of David Tong's String Theory lecture notes, he claims that conformal transformations on the flat worldsheet are such that $$\sigma^\pm \to \tilde{\sigma}^\pm(\sigma^\pm).\tag{2.10}$$ I'm trying to develop this step-by-step so we consider a line element in the worldsheet with the conformal gauge $h_{ab}=\eta_{ab}$, where $h_{ab}$ is the worldsheet metric in Polyakov action. We have that
\begin{equation} \begin{aligned} ds^2&= \eta_{ab}d\sigma^a d\sigma^b\\ &= -d\tau^2 + d \sigma^2\\ &= -d\sigma^+ d\sigma ^-, \qquad \sigma^\pm = \tau \pm \sigma. \end{aligned} \end{equation} By performing a conformal transformation on the coordinate system $(\sigma^+,\sigma^-)$ we have new coordinates $(\tilde{\sigma}^+,\tilde{\sigma}^-)$ such that
$$ds^2 = - e^{\omega(\tilde{\sigma}^+,\tilde{\sigma}^-)} d\tilde{\sigma}^+d\tilde{\sigma}^- = -d\sigma^+ d\sigma ^-.$$ But we have that
\begin{equation} \begin{aligned} d\tilde{\sigma}^+d\tilde{\sigma}^-&=\left(\partial_+ \tilde{\sigma}^+ d \sigma^+ + \partial_- \tilde{\sigma}^+ d\sigma^- \right)\\ &\times \left(\partial_+ \tilde{\sigma}^- d \sigma^+ + \partial_- \tilde{\sigma}^- d\sigma^- \right)\\ &\propto d \sigma^+ d\sigma^-. \end{aligned} \end{equation}
One of the possible choices and the one chosen by Tong is to consider
$$\partial_+ \tilde{\sigma}^- = \partial_- \tilde{\sigma}^+=0. \tag1$$
However, I could choose instead
$$\partial_+ \tilde{\sigma}^+ = \partial_- \tilde{\sigma}^-=0. \tag2 $$
What kind of argument do I use to eliminate the possibility of $(2)$ and obtain the same result as Tong?
