Is there any prime number larger than 998244353 which is such that we can apply NTT on arrays of size up to 2^19 and the prime number is greater than 1e11
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Is there any prime number larger than 998244353 which is such that we can apply NTT on arrays of size up to 2^19 and the prime number is greater than 1e11
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Any prime that is greater than $$$10^{11}$$$ and is in the form of $$$k \times 2^{19}+1$$$, where $$$k$$$ is an integer, should fit your requirements.
Note that $$$998244353 = 119 \times 2^{23}+1$$$.
Why did gray guy need FFT? Go learn bubble sort
$$$100000595969$$$ is the smallest prime $$$p$$$ above $$$10^{11}$$$ with $$$p \equiv 1 \pmod{2^{19}}$$$ (found with a simple python3 session). The smallest primitive root is $$$3$$$.