= Minimal axioms for Boolean algebra
{wiki=Minimal_axioms_for_Boolean_algebra}
Boolean algebra is a mathematical structure that captures the principles of logic and set operations. To define Boolean algebra, we can use a minimal set of axioms. The typical minimal axioms for Boolean algebra include: 1. **Closure**: The set is closed under two binary operations (usually denoted as \\(\\land\\) for "and" and \\(\\lor\\) for "or") and a unary operation (usually denoted as \\(\\neg\\) for "not").
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