DUO Labs
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Member for 4 years, 7 months
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What are some results that assume the Connes' embedding conjecture or any of its reformulations?
@DiegoMartínez I could only find the MF problem, where are the other problems listed?
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What are some results that assume the Connes' embedding conjecture or any of its reformulations?
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Is it possible to create a polynomial $p(x)$ with this relation between $p(0)$ and $p(c)$?
@Acccumulation Noted and changed accordingly.
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Is it possible to create a polynomial $p(x)$ with this relation between $p(0)$ and $p(c)$?
Simplifications thanks to Acccumulation
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Is there a function $f$ that is a finite sum of functions with finite products of the inputs of $f$ as inputs with this property?
Since no one else responded, accepted!
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Is there a function $f$ that is a finite sum of functions with finite products of the inputs of $f$ as inputs with this property?
Thank you. I'll wait a day before accepting. In the meantime, +1 from me.
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Is there a function $f$ that is a finite sum of functions with finite products of the inputs of $f$ as inputs with this property?
@QiaochuYuan I just want to point out that I edited it to be a bit more lax. I don't know if that makes a solution possible or not.
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Is there a function $f$ that is a finite sum of functions with finite products of the inputs of $f$ as inputs with this property?
@QiaochuYuan Is there anything else I should clarify?
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Is there a function $f$ that is a finite sum of functions with finite products of the inputs of $f$ as inputs with this property?
@QiaochuYuan Ok, in that case, then yes, there can be a family of functions. Sorry, I didn't really understand at first.