diskreteina

Diskreteina is a term used in discrete mathematics and computer science to denote a class of discrete-time, structure-preserving transformations defined on lattice structures. The concept combines the idea of discrete change with a naming convention used for mathematical objects that describe operations or symmetries. In its standard form, a diskreteina is a map f from a lattice L to itself such that it respects locality, invertibility, and the underlying lattice geometry.

A typical defining feature is locality: for any point x in L, the value f(x) depends only

Diskreteina maps can often be represented concretely, for example by matrices with integer entries acting modulo

Applications of diskreteina include cryptographic schemes based on lattice symmetries, construction of error-correcting codes, and the