• aio@awful.systems
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    3 months ago

    the computational cost of operating over a matrix is always going to be convex relative to its size

    This makes no sense - “convex” doesn’t mean fast-growing. For instance a constant function is convex.

    • dorian@awful.systems
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      3 months ago

      you will be pleased to know that the original text said “superlinear”; i just couldn’t remember if the lower bound of multiplying a sufficiently sparse matrix was actually lower than O(n²) (because you could conceivably skip over big chunks of it) and didn’t feel like going and digging that fact out. i briefly felt “superlinear” was too clunky though and switched it to “convex” and that is when you saw it.

    • bitofhope@awful.systems
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      3 months ago

      Hell, so is 1/x for positive values of x. Or any linear function, including those with negative slope.