Subalgebra lattice

of a universal algebra

The partially ordered set (ordered by inclusion) of all subalgebras of . For any , their supremum is the subalgebra generated by and , and their infimum is the intersection . An intersection of subalgebras may be empty, and therefore for certain types of algebras (e.g. semi-groups and lattices) one includes among the subalgebras the empty set. For any algebra , the subalgebra lattice is algebraic, and, conversely, for any algebraic lattice there is an algebra such that (the Birkhoff–Frink theorem). Any lattice can be imbedded in the lattice for some group .

The subalgebra lattice is one of the basic derived structures associated with an algebra (together with such structures as the group of automorphisms, the semi-group of endomorphisms, the lattice of congruences, etc.). The problems involved in the study of the connections between algebras and their subalgebra lattices are divided into the following aspects: lattice isomorphisms, lattice characteristics of various classes of algebras, and research on algebras with various restrictions on the subalgebra lattice. Two algebras and are called lattice isomorphic if ; an isomorphism between and is called a lattice isomorphism (or a projectivity) of onto . Isomorphic algebras are lattice isomorphic but the converse is far from being necessarily true. An algebra is said to be lattice definable (in a given class ) if for any algebra (from ) of the same type, implies that . In some cases (e.g. in semi-groups) the concept of lattice definability is extended by adding to the conclusion of the implication the condition "or B is anti-isomorphic to A" , since anti-isomorphic semi-groups are also lattice isomorphic. The classic example of lattice definability is given by the first basic theorem of projective geometry (see [1]), where vector spaces over skew-fields are considered as . The following are also lattice definable: every Abelian group which contains two independent elements of infinite order, every free group (free semi-group) and every group (semi-group) which is non-trivially decomposable into a free product, every nilpotent group without torsion, every commutative semi-group with a cancellation law and without idempotents, every free semi-group of idempotents, and a free semi-lattice with more than two free generators. In this case it often turns out that each projectivity of an algebra is induced by an isomorphism of it (or by an anti-isomorphism). A class of algebras of the same type may contain algebras which are not lattice definable, but still have the property that and imply that ; in this case is said to be lattice definable (or lattice closed); if here the algebras are taken only from a class , then "in the class M" is added to the corresponding term. Lattice-closed classes include the class of all solvable groups.

Many of the restrictions imposed on algebras are formulated in terms of subalgebra lattices. The classic examples are the minimum and maximum conditions for subalgebras. satisfies the maximum condition if and only if all subalgebras in are finitely generated (see also Group with a finiteness condition; Semi-group with a finiteness condition). Other restrictions imposed on subalgebra lattices include such lattice-theoretical properties as distributivity, modularity, various forms of semi-modularity, the Jordan–Dedekind condition, complementedness, relative complementedness, etc. For example, for a group the subalgebra lattice is distributive if and only if is locally cyclic (Ore's theorem); distributivity conditions are also studied in semi-groups, associative rings, modules, Lie algebras, etc.

In addition to isomorphisms of subalgebra lattices, dualities (i.e. anti-isomorphisms) and homomorphisms are also studied. When is a topological algebra it is most natural to consider the lattice of all closed subalgebras of ; active research is carried out on the corresponding problems.

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Comments

The simultaneous representation of a prescribed algebraic lattice of subalgebras, a prescribed algebraic lattice of congruence relations, and a prescribed group of automorphisms is treated in [a1].

References