Source: wikibot/locally-finite-variety

= Locally finite variety
{wiki=Locally_finite_variety}

In the context of universal algebra, a **locally finite variety** refers to a specific kind of variety of algebraic structures. A variety is a class of algebraic structures (like groups, rings, or lattices) defined by a particular set of operations and identities. A variety is called **locally finite** if every finitely generated algebra within that variety is finite.

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