Conic bundle

In algebraic geometry, a conic bundle is an algebraic variety that appears as a solution of a Cartesian equation of the form:

X^{2}+aXY+bY^{2}=P(T).\,

Conic bundles can be considered a Severi–Brauer surface, or, more precisely, a Châtelet surface. This can be a double covering of a ruled surface. Through an isomorphism, it can be associated with a symbol $(a,P)$ in the second Galois cohomology of the field $k$ . In practice, it is more commonly observed as a surface with a well-understood divisor class group, and the simplest cases share with Del Pezzo surfaces the property of being a rational surface. But many problems of contemporary mathematics remain open, notably (for those examples which are not rational) the question of unirationality.

A naive point of view

In order to properly express a conic bundle, the initial step involves simplifying the quadratic form on the left side. This can be achieved through an alteration, as such:

X^{2}-aY^{2}=P(T).\,

In a second step, it should be placed in a projective space in order to complete the surface at infinity.

To achieve this, we write the equation in homogeneous coordinates and expresses the first visible part of the fiber:

X^{2}-aY^{2}=P(T)Z^{2}.\,

That is not enough to complete the fiber as non-singular (smooth and proper), and then glue it to infinity by a change of classical maps.

Seen from infinity, (i.e. through the change $T\mapsto T'=1/T$ ), the same fiber (excepted the fibers $T=0$ and $T'=0$ ), written as the set of solutions $X'^{2}-aY'^{2}=P^{*}(T')Z'^{2}$ where $P^{*}(T')$ appears naturally as the reciprocal polynomial of $P$ . Details are below about the map-change $[x':y':z']$ .

The fiber c

Going a little further, while simplifying the issue, limit to cases where the field $k$ is of characteristic zero and denote by $m$ any integer except zero. Denote by P(T) a polynomial with coefficients in the field $k$ , of degree 2m or 2m − 1, without multiple root. Consider the scalar a.