An exponential curve looks locally the same at all points in time. For a very long period of time, computers were always vastly better than they were a year ago, and that wasn't because the computer you'd bought the year before was junk.
Consider that what you're reacting to is a symptom of genuine, rapid progress.
> An exponential curve looks locally the same at all points in time
This is true for any curve...
If your curve is continuous, it is locally linear.
There's no use in talking about the curve being locally similar without the context of your window. Without the window you can't differentiate an exponential from a sigmoid from a linear function.
Let's be careful with naive approximations. We don't know which direction things are going and we definitely shouldn't assume "best case scenario"
Nor does local flatness imply direction, the curve could be descending for all that "looks locally flat" matters. It also isn't on the skeptics to disprove that "AI" is a transformative, exponentially growing miracle, it's on the people selling it.
godelski|9 months ago
If your curve is continuous, it is locally linear.
There's no use in talking about the curve being locally similar without the context of your window. Without the window you can't differentiate an exponential from a sigmoid from a linear function.
Let's be careful with naive approximations. We don't know which direction things are going and we definitely shouldn't assume "best case scenario"
sfpotter|9 months ago
unknown|9 months ago
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Retr0id|9 months ago
Nevermark|9 months ago
The crying wolf reference only makes sense as a soft claim that LLM’s better or not, are not getting better in important ways.
Not a view I hold.
unknown|9 months ago
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pera|9 months ago
EA-3167|9 months ago