This is a list of possibly nonassociative algebras. An algebra is a module, wherein you can also multiply two module elements. (The multiplication in the module is compatible with multiplication-by-scalars from the base ring).
This is a listof possibly nonassociative algebras. An algebra is a module, wherein you can also multiply two module elements. (The multiplication in the...
all Boolean algebras are concrete. The Boolean algebras so far have all been concrete, consisting of bit vectors or equivalently of subsets of some set....
of and topical guide to algebra: Algebra is one of the main branches of mathematics, covering the study of structure, relation and quantity. Algebra studies...
Propositional calculus Ampheck Analysis of Boolean functions Balanced boolean function Bent function Boolean algebras canonically defined Boolean function...
This is a listof notable theorems. Lists of theorems and similar statements include: ListofalgebrasListof algorithms Listof axioms Listof conjectures...
Heyting algebras are a special example of boolean algebras. Peano arithmetic Boundary algebra MV-algebra In Computer science: Max-plus algebra Syntactic...
algebrasof pseudo-differential operators acting on spaces of distributions), the term operator algebra is usually used in reference to algebrasof bounded...
most familiar Clifford algebras, the orthogonal Clifford algebras, are also referred to as (pseudo-)Riemannian Clifford algebras, as distinct from symplectic...
This is a listof polynomial topics, by Wikipedia page. See also trigonometric polynomial, listofalgebraic geometry topics. Degree: The maximum exponents...
infinite-dimensional Lie algebra over R {\displaystyle \mathbb {R} } . The Kac–Moody algebras are a large class of infinite-dimensional Lie algebras, say over C {\displaystyle...
This is a listofalgebraic geometry topics, by Wikipedia page. Affine space Projective space Projective line, cross-ratio Projective plane Line at infinity...
rings, fields, modules, vector spaces, and algebras. The phrase abstract algebra was coined at the turn of the 20th century to distinguish this area from...
an algebra; for instance, associative algebras are algebras with an associate vector product (like the algebraof square matrices, or the algebraof polynomials)...
special kind of bilinear form which gives the algebras particularly nice duality theories. Frobenius algebras began to be studied in the 1930s by Richard...
This is a listof Wikipedia articles about curves used in different fields: mathematics (including geometry, statistics, and applied mathematics), physics...
Semisimple Lie algebras have a very elegant classification, in stark contrast to solvable Lie algebras. Semisimple Lie algebras over an algebraically closed field...
problem of classifying the real simple Lie algebras to that of finding all the real forms of each complex simple Lie algebra (i.e., real Lie algebras whose...
This is a listof homological algebra topics, by Wikipedia page. Cokernel Exact sequence Chain complex Differential module Five lemma Short five lemma...
algebras is one of the major achievements of Wilhelm Killing and Élie Cartan. A direct sum of simple Lie algebras is called a semisimple Lie algebra....
is sound. Like Boolean algebras, Heyting algebras form a variety axiomatizable with finitely many equations. Heyting algebras were introduced by Arend...
This is a listof named algebraic surfaces, compact complex surfaces, and families thereof, sorted according to their Kodaira dimension following Enriques–Kodaira...
best-known examples of associative division algebras are the finite-dimensional real ones (that is, algebras over the field R of real numbers, which are...
elements. Algebraic structures include groups, rings, fields, modules, vector spaces, lattices, and algebras over a field. The term abstract algebra was coined...