Reprojection error: Difference between revisions

Template:Inline The reprojection error is a geometric error corresponding to the image distance between a projected point and a measured one. It is used to quantify how closely an estimate of a 3D point ${\displaystyle \widehat{𝐗}}$ recreates the point's true projection ${\displaystyle 𝐱}$. More precisely, let ${\displaystyle 𝐏}$ be the projection matrix of a camera and ${\displaystyle \widehat{𝐱}}$ be the image projection of ${\displaystyle \widehat{𝐗}}$, i.e. ${\displaystyle \widehat{𝐱}=𝐏\widehat{𝐗}}$. The reprojection error of ${\displaystyle \widehat{𝐗}}$ is given by ${\displaystyle d(𝐱,\widehat{𝐱})}$, where ${\displaystyle d(𝐱,\widehat{𝐱})}$ denotes the Euclidean distance between the image points represented by vectors ${\displaystyle 𝐱}$ and ${\displaystyle \widehat{𝐱}}$.

Minimizing the reprojection error can be used for estimating the error from point correspondences between two images. Suppose we are given 2D to 2D point imperfect correspondences ${\displaystyle \{{𝐱}_{𝐢}\leftrightarrow {{𝐱}_{𝐢}}^{\prime }\}}$. We wish to find a homography ${\displaystyle \widehat{𝐇}}$ and pairs of perfectly matched points ${\displaystyle \widehat{{𝐱}_{𝐢}}}$ and ${\displaystyle {{\widehat{𝐱}}_i}^{\prime }}$, i.e. points that satisfy ${\displaystyle {\widehat{{𝐱}_{𝐢}}}^{\prime }=\hat{H}{\widehat{𝐱}}_{𝐢}}$ that minimize the reprojection error function given by

${\displaystyle \sum _{i}d({𝐱}_{𝐢},\widehat{{𝐱}_{𝐢}}{)}^2+d({{𝐱}_{𝐢}}^{\prime },{\widehat{{𝐱}_{𝐢}}}^{\prime }{)}^2}$

So the correspondences can be interpreted as imperfect images of a world point and the reprojection error quantifies their deviation from the true image projections ${\displaystyle \widehat{{𝐱}_{𝐢}},{\widehat{{𝐱}_{𝐢}}}^{\prime }}$

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