# Best-fit algorithm to fit a set of lines onto a polygon

I have two sets of lines, set A and B. The start and end points of all the lines in these two sets are known and I want to find the rotation and translation that best fits set B onto set A. There is no scaling:

• There is not a one-to-one mapping. I believe this rules out the Kabsch algorithm, though I can envisage a brute force algorithm that uses this.
• Set B is likely to contain partial segments of lines in A. It is likely to contain a pretty sparse number of lines.
• The lines in B will be erroneous - there may be lines observed that do not exist in A.
• There may, of course, be more than one possible 'matches'

For some background, this is part of a crude image-based robot positioning system.

• Set A is a 'map' - data is imported from an imported dxf file.
• Set B is a set one observed lines.

I've had a look around, for example here:

How to align shapes together? (Geometrical Best-Fit Algorithm)

Is a clever way of doing this? Flicking through image-processing literature shape-matching seems to be more pattern matching for raster images - overkill perhaps for this problem.

The best way I can perceive at the moment is to use a Hough Transform-like approach taking each line in B along each line in A and having bins for the rotation/transformations these represent. I have not coded this and tried it out yet - kind of wanted to avoid reinventing the wheel.

Any ideas and input much appreciated.

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