Two properties of the partial theta function

Abstract: For the partial theta function $\theta (q,z):=\sum_{j=0}^{\infty}q^{j(j+1)/2}z^j$, $q$, $z\in \mathbb{C}$, $|q|<1$, we prove that its zero set is connected. This set is smooth at every point $(q^{\flat},z^{\flat})$ such that $z^{\flat}$ is a simple or double zero of $\theta (q^{\flat},.)$. For $q\in (0,1)$, $q\rightarrow 1^-$ and $a\geq e^{\pi}$, there are $o(1/(1-q))$ and $(\ln (a/e^{\pi}))/(1-q)+o(1/(1-q))$ real zeros of $\theta (q,.)$ in the intervals $[-e^{\pi},0)$ and $[-a,-e^{-\pi}]$ respectively (and none in $[0,\infty)$). For $q\in (-1,0)$, $q\rightarrow -1^+$ and $a\geq e^{\pi /2}$, there are $o(1/(1+q))$ real zeros of $\theta (q,.)$ in the interval $[-e^{\pi /2},e^{\pi /2}]$ and $(\ln (a/e^{\pi /2})/2)/(1+q)+o(1/(1+q))$ in each of the intervals $[-a,-e^{\pi /2}]$ and $[e^{\pi /2},a]$.