Question

Bezu Theory? Can someone explain to me please

Answer 1

Bézout's theorem is a statement in algebraic geometry concerning the number of common points, or intersection points, of two plane algebraic curves which do not share a common component (that is, which do not have infinitely many common points). The theorem states that the number of common points of two such curves is at most equal to the product of their degrees, and equality holds if one counts points at infinityand points with complex coordinates (or more generally, coordinates from the algebraic closureof the ground field), and if each point is counted with its intersection multiplicity. It is named after Étienne Bézout.

Bézout's theorem refers also to the generalization to higher dimensions: Let there be n homogeneous polynomials in n+1 variables, of degrees {\displaystyle d_{1},\ldots ,d_{n}}, that define n hypersurfaces in the projective space of dimension n. If the number of intersection points of the hypersurfaces is finite over an algebraic closure of the ground  if the points are counted with their multiplicity. As in the case of two variables, in the case of affine hypersurfaces, and when not counting multiplicities nor non-real points, this theorem provides only an upper bound of the number of points, which is often reached. This is often referred to as Bézout's bound.

Answer 2

The special case where one of the curve is a line can be derived from the fundamental theorem of algebra.In this case the theorem states that an algebraic curve of a degree n intersects a given line in n points,counting the multiplicites.