Nonlinear fit to median instead of mean values?
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Hey,
my question might be more theoretical. The datasets I currently analyse are not normally distributed (according to shapiro-wilk and kolgomorov-smirnov @ p = 0.05). Therefore, I prefer plotting them as boxplots. However, I would actually like to fit a nonlinear model (in that case a hill equation) to the (non-existing) mean in order to extract some parameters.
So, is there any way and is it allowed to fit my function to the median instead of the mean values? I haven't found publications where this is done and I assume that this is for a good reason. I just don't know why and what else to do with my data.
Thanks for your help!
Philipp
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Sindar
on 24 Sep 2020
I'm not an expert, but I don't think it's accurate to describe standard fitting as fitting to the mean.
Regardless, can you share an image of your data and discuss what you think a median-fit would look like? There may be some method of optimization that can replicate your goal (standard fitting minimizes summed-squares distance. Maybe you want summed-abs to suppress the importance of outliers?)
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