How can I express the second Hirzebruch surface, $F_{2}$ in terms of $SO(3)$?
Is it true that $F_{2}$ is the total space of a bundle with fibre $SO(3)$ over $\mathbb{R}_{+}$?
How can I express the second Hirzebruch surface, $F_{2}$ in terms of $SO(3)$?
Is it true that $F_{2}$ is the total space of a bundle with fibre $SO(3)$ over $\mathbb{R}_{+}$?