One of the AVX-512 instruction set extensions is AVX-512 + GFNI, " Galois Field New Instructions".
Galois theory is about field extensions. What does that have to do with processing vectorized integer or floating-point values? The instructions supposedly perform "Galois field affine transformation", the inverse of that, and "Galois field multiply bytes".
What fields are those? What do these instructions actually do and what is it good for?
These instructions are closely related to the AES (Rijndael) block cipher. GF2P8AFFINEINVQB performs a Rijndael S-Box substitution with a user-defined affine transformation.
GF2P8AFFINEQB is essentially a (carry-less) multiplication of an 8x8 bit matrix with an 8-bit vector in GF(2), so it should be useful in other bit-oriented algorithms. It can also be used to convert between isomorphic representations of GF(28).
GF2P8MULB multiplies two (vectors of) elements of GF(28), actually 8-bit numbers in polynomial representation with the Rijndael reduction polynomial. This operation is used in Rijndael's MixColumns step.
Note that multiplication in finite fields is only loosely related to integer multiplication.