I am trying to compute the coordinates correspondence of several points between two images.
I have a group of points whose correspondences are known, I use them with OpenCV's `findFundamentalMatrix()`

in order to find the fundamental matrix.
I verified that `x^T * F * x' = (0)`

for each point, and the result is always right or very close.

The thing is, now I'd like to use the coordinates of a point on the first image (`y`

) and the fundamental matrix (`F`

) in order to find the coordinates of the point on the second image (`y'`

). I first thought about simply using the equation above, but given only the `z`

of the `y'`

point, there can be an infinity of solutions.

How else can I use the fundamental matrix to compute the translations ?

To be more clear: knowing the fundamental matrix "linking" two projections, how can I use it to translate the coordinates of any known point `(a, b, 1)`

from the first projection to the second projection?

Considering that we know `a`

, `b`

and `F`

in this equation: (a', b", 1)^{T} * F * (a, b, 1) = (0)

I had made a simple drawing as an example: https://i.stack.imgur.com/l5yg4.jpg . The idea is to find the coordinates of the red dot `(xq, yq)`

in projection 2, considering that we know its coordinates in projection 1 and the ones of all other points in both projections (and some other ones as the algorithm to find the fundamental matrix actually requires at least 8 points)

Another precision: in my example, known points are coplanar, but the researched point will not necessarily be.

I hope that made my problem more clear :)