Can anyone help with paramaterization of conics? Im struggling

Abbie Edwards

Abbie Edwards

Answered question

2022-03-17

Can anyone help with paramaterization of conics?
Im struggling to wrap my head around an example. It considers the conic x2+y2z2=0 then proceeds:
Take A=[1,0,1] and the line P(U) defined by x=0. Note that this conic and the point and line are defined over any field since the coefficients are 0 or 1. A point XP(U) is of the form X=[0,1,t] or [0, 0, 1] and the map α is

α ( [ 0 , 1 , t ] ) = [ B ( ( 0 , 1 , t ) , ( 0 , 1 , t ) ) ( 1 , 0 , 1 ) 2 B ( ( 1 , 0 , 1 ) , ( 0 , 1 , t ) ) ( 0 , 1 , t ) ] = [ 1 t 2 , 2 t , 1 + t 2 ]  or  α ( [ 0 , 0 , 1 ] ) = [ 1 , 0 , 1 ] .


How do I evaluate B(v,v) or B(v,v)(a,b,c) like they have to go from the first line to the second?

Answer & Explanation

Jakayla Hayes

Jakayla Hayes

Beginner2022-03-18Added 7 answers

For the first question, it is exactly evaluation of a bilinear form, given by the matrix B, on the given vectors: so B(v,w)=vtBw. This gives you a scalar which is understood multipling the following vector.
For the second one, when you have a projective line l and two dinstinct points P,Q on it then every other point can be written as λP+μQ, for [λ,μ]P1. So you can define t=μλ, if λ0, and consider l as the points in the form P+tQ union the remaining point corresponding to λ=0.

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