distributivitat

Distributivitat, or distributivity, is a property that describes how two binary operations interact. If an operation, typically multiplication, distributes over addition, it satisfies the distributive laws: a×(b+c) = a×b + a×c for all elements a, b, c; and, when applicable, (a+b)×c = a×c + b×c. If both laws hold, the operation distributes over addition on both sides. If only one side holds, the operation is called left- or right-distributive.

In arithmetic and algebra, multiplication distributes over addition on familiar sets such as the real numbers,

In logic and Boolean algebra, similar distributive laws apply to connectives. Conjunction distributes over disjunction: a

Distributivity is a fundamental axiom in many algebraic structures, such as rings, where multiplication distributes over

Not all algebraic structures are distributive. Some lattices, such as the lattice of subspaces of a vector