Talk:LogSumExp

"trick"?
What is the "trick" in the section "log-sum-exp trick for log-domain calculations"? I had to read the sentence "Like multiplication operation in linear-scale becoming simple addition in log-scale; an addition operation in linear-scale becomes the LSE in the log-domain." three times for it to sort of make sense, I'll try and fix it, assuming log-scale and log-domain are the same thing. --WiseWoman (talk) 20:56, 14 March 2020 (UTC)


 * The trick is to replace $$\mathrm{LSE}(x_1, \ldots, x_n)$$ by $$\mathrm{LSE}(x_1 - x_{\mathrm{max}}, \ldots, x_n - x_{\mathrm{max}}) + x_{\mathrm{max}}$$ which is numerically more stable (e.g. when used in a computer program). I think the text is clear (perhaps it has changed since you commented). --80.129.163.20 (talk) 14:39, 20 January 2022 (UTC)
 * I stumbled on that sentence and math too. Apparently, the point is that applying LogSumExp to a vector of variables transformed to, or taken to be in, log space (which I agree is not obviously defined, as log can in principle output any number), is equivalent to taking the log of the sum of the vector of untransformed variables. Equivalence is symmetric, so LSE can also be thought of as a way to notate/represent/compute the logarithm of a sum. Whether and how it (the trick and the whole function) is useful is another question, perhaps not sufficiently answered by this article.
 * NB: The other reply explains another section of the article. Elias (talk) 09:59, 10 March 2023 (UTC)

LSE?
I think the LSE acronym is misleading as it can be read as Least Square Error. I'd be consistent across the text and use LogSumExp. User:misssperovaz — Preceding unsigned comment added by Missperovaz (talk • contribs) 04:57, 14 January 2021 (UTC)