On the unirationality of quadric bundles

A smooth conic bundle $\mathcal{Q}^{1}\rightarrow\mathbb{P}^{1}$ with $(-K_{\mathcal{Q}^{1}})^2 > 0$, over a field of characteristic different from two, is unirational if and only if it has a point \cite{KM17}. We generalize this result to higher dimensional quadric bundles with discriminant of odd degree. More precisely we prove that a general $n$-fold quadric bundle $\mathcal{Q}^{n-1}\rightarrow\mathbb{P}^{1}$, over a number field, with $(-K_{\mathcal{Q}^{n-1}})^n > 0$ and discriminant of odd degree $\delta_{\mathcal{Q}^{n-1}}$ is unirational, and that the same holds for quadric bundles over an arbitrary infinite field provided that $\mathcal{Q}^{n-1}$ has a point, is otherwise general and $n\leq 5$. This supports \cite[Conjecture 1.3]{HT00} on the potential density of rational points for varieties with positive anti-canonical divisor. As a consequence we get the unirationality of a general $n$-fold quadric bundle $\mathcal{Q}^{h}\rightarrow\mathbb{P}^{n-h}$ with discriminant of odd degree $\delta_{\mathcal{Q}^{h}}\leq 3h+4$, and of any smooth $4$-fold quadric bundle $\mathcal{Q}^{2}\rightarrow\mathbb{P}^{2}$, over an algebraically closed field, with $\delta_{\mathcal{Q}^{2}}\leq 12$.Comment: 16 page