Difference between revisions of "Extreme"
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Extreme is about the [[concept|conceptual]] [[boundary]]. According to [[Gautam Dasgupta]], extreme can defined recursively: | Extreme is about the [[concept|conceptual]] [[boundary]]. According to [[Gautam Dasgupta]], extreme can defined recursively: | ||
The extreme over an extreme is still an extreme. | The extreme over an extreme is still an extreme. | ||
The function whose derivative is itself is an exponential function. | The function whose derivative is itself is an exponential function. According to physicist Wheeler, | ||
The boundary of a boundary is zero. | |||
In other words, there is no boundary for a boundary, which relates to the concept of [[kernel]]. | |||
==Related Pages== | ==Related Pages== | ||
* [[logically related:Quantum computing]] | * [[logically related::Quantum computing]] | ||
* [[logically related:Extreme statistics]] | * [[logically related::Extreme statistics]] | ||
* [[logically related:Extreme Learning Process]] | * [[logically related::Extreme Learning Process]] | ||
Latest revision as of 10:20, 10 September 2021
Extreme is about the conceptual boundary. According to Gautam Dasgupta, extreme can defined recursively:
The extreme over an extreme is still an extreme.
The function whose derivative is itself is an exponential function. According to physicist Wheeler,
The boundary of a boundary is zero.
In other words, there is no boundary for a boundary, which relates to the concept of kernel.