universal algebra
general algebra

Universal algebra is the more formal study of these structures and systems.

Nevertheless model theory can be seen as an extension of universal algebra.

Some related results of universal algebra are the following.

All the above cases may be unified and generalized in universal algebra.

Furthermore, closure operators are important in the study of universal algebra.

This is among the oldest unsolved problems in universal algebra.

The study of varieties is an important part of universal algebra.

The term universal algebra is used for structures with no relation symbols.

Being a special instance of lattices, they are studied both in order theory and universal algebra.

Nelson made contributions to the area of universal algebra with applications to theoretical computer science.

He worked mostly in lattice theory and universal algebra.

Universal algebra, in which properties common to all algebraic structures are studied.

Model theory has close ties to algebra and universal algebra.

Another branch of mathematics known as universal algebra studies algebraic structures in general.

Fearnley-Sander suggested that this combination had "come to pass" with the rise of universal algebra.

The general theory of algebraic structures has been formalized in universal algebra.

It is well known from universal algebra that is unique up to isomorphisms.

For example ordered groups are not studied in mainstream universal algebra because they involve an ordering relation.

Universal algebra - a field studying the formalization of algebraic structures itself.

Ricci (2007) proves that every such a universal algebra defines a suitable field.

In Structural theory of automata, semigroups, and universal algebra, pages 47-76.

This modern understanding uses algebra, in particular, universal algebra.

It was introduced in , and has seen many uses in the field of universal algebra since then.

In particular, universal algebra can be applied to the study of monoids, rings, and lattices.

The algebraic interpretation of lattices plays an essential role in universal algebra.