Overview
Using mapPos on submatrices does not generate the expected indices. I'm fairly sure this occurs because the function doesn't factor in the column offset when calling decode.
Versions
- matrix v0.3.6.1
- GHC v8.4.4
Example
The following gives unexpected results:
import qualified Data.Matrix as M
m = M.identity 3
sm = M.submatrix 2 3 1 2 m
unexpected = M.mapPos const sm
This assigns the following to unexpected:
┌ ┐
│ (2,2) (3,1) │
│ (4,1) (4,2) │
└ ┘
This could have one of two possible expected results. The first is to have the upper-left element be (1,1):
┌ ┐
│ (1,1) (1,2) │
│ (2,1) (2,2) │
└ ┘
The second is to have the upper-left element be (2,1), consistent with the submatrix offset:
┌ ┐
│ (2,1) (2,2) │
│ (3,1) (3,2) │
└ ┘
In my opinion, the first option provides more consistent results. It would prevent divergent behavior when, for example, calling mapPos on a 2x2 submatrix vs. a 2x2 matrix with no internal offsets.
Overview
Using
mapPoson submatrices does not generate the expected indices. I'm fairly sure this occurs because the function doesn't factor in the column offset when callingdecode.Versions
Example
The following gives unexpected results:
This assigns the following to
unexpected:This could have one of two possible expected results. The first is to have the upper-left element be (1,1):
The second is to have the upper-left element be (2,1), consistent with the submatrix offset:
In my opinion, the first option provides more consistent results. It would prevent divergent behavior when, for example, calling
mapPoson a 2x2 submatrix vs. a 2x2 matrix with no internal offsets.