| Aarex function | |
|---|---|
| Based on | Xi function |
The Aarex function is a googological function invented by Aarex Tiaokhiao.[1] It is defined as follows:
- \(\text{Arx}(1,m) = 10^6 = 1{,}000{,}000\)
- \(\text{Arx}(n,1) = \Xi(\text{Arx}(n-1,1))\)
- \(\text{Arx}(n,m) = \text{Arx}(\text{Arx}(n-1,m),m-1)\)
where \(\Xi\)(n) is the Xi function, which was used due to Adam Goucher's mistaken claim that it outgrew Rayo's function. The function is a naive extension of the Xi function and is easily beaten by functions such as the Rayo's function.
He later upgraded the function, adding the rules:
- \(\text{Arx}(a,b,c,\cdots,y,1) = \text{Arx}(a,b,c,\cdots,y)\)
- \(\text{Arx}(a,b,c,\cdots,x,y,z)\)
- \(= \text{Arx}(\text{Arx}(a,b,c,\cdots,x,y,z-1),\cdots,\text{Arx}(a,b,c,\cdots,x,y,z-1),1)\)
He further extended his function to multidimensional arrays, and then, instead of the Xi function, started using \(\varphi^\text{CK}(\omega,0)\). The current version combines Bird's array notation with this function.
Sources[]
2. [[1]]Last remaining valid copy of the page.