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BIALGEBRA

  • Bialgebra
  • Vector space in mathematics

    In mathematics, a bialgebra over a field K is a vector space over K which is both a unital associative algebra and a counital coassociative coalgebra

    Bialgebra

    Bialgebra

  • Tensor algebra
  • Universal construction in multilinear algebra

    concept of a cofree coalgebra, and a more complicated one, which yields a bialgebra, and can be extended by giving an antipode to create a Hopf algebra structure

    Tensor algebra

    Tensor_algebra

  • Hopf algebra
  • Construction in algebra

    coassociative) coalgebra, with these structures' compatibility making it a bialgebra, and that moreover is equipped with an antihomomorphism satisfying a certain

    Hopf algebra

    Hopf_algebra

  • Exterior algebra
  • Algebra associated to any vector space

    ⁠. The exterior algebra (as well as the symmetric algebra) inherits a bialgebra structure, and, indeed, a Hopf algebra structure, from the tensor algebra

    Exterior algebra

    Exterior algebra

    Exterior_algebra

  • Lie bialgebra
  • In mathematics, a Lie bialgebra is the Lie-theoretic case of a bialgebra: it is a set with a Lie algebra and a Lie coalgebra structure which are compatible

    Lie bialgebra

    Lie_bialgebra

  • Quasi-bialgebra
  • Generalization of bialgebra

    quasi-bialgebras are a generalization of bialgebras: they were first defined by the Ukrainian mathematician Vladimir Drinfeld in 1990. A quasi-bialgebra differs

    Quasi-bialgebra

    Quasi-bialgebra

  • Poisson–Lie group
  • Poisson manifold that is also a Lie group

    manifold. The infinitesimal counterpart of a Poisson–Lie group is a Lie bialgebra, in analogy to Lie algebras as the infinitesimal counterparts of Lie groups

    Poisson–Lie group

    Poisson–Lie_group

  • Representation theory of Hopf algebras
  • satisfying these conditions. This is the motivation for the definition of a bialgebra, where Δ is called the comultiplication and ε is called the counit. In

    Representation theory of Hopf algebras

    Representation_theory_of_Hopf_algebras

  • Algebraic structure
  • Set with operations obeying given axioms

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Algebraic structure

    Algebraic_structure

  • Associative algebra
  • Ring that is also a vector space or a module

    comultiplication if it satisfies certain axioms. The resulting structure is called a bialgebra. To be consistent with the definitions of the associative algebra, the

    Associative algebra

    Associative_algebra

  • Convolution
  • Integral expressing the amount of overlap of one function as it is shifted over another

    *f_{m})^{*}(x)=f_{1}^{*}(x)+\cdots +f_{m}^{*}(x).} Let (X, Δ, ∇, ε, η) be a bialgebra with comultiplication Δ, multiplication ∇, unit η, and counit ε. The convolution

    Convolution

    Convolution

    Convolution

  • Outline of algebraic structures
  • Overview of and topical guide to algebraic structures

    × V → F. Bialgebra: an associative algebra with a compatible coalgebra structure. Lie bialgebra: a Lie algebra with a compatible bialgebra structure

    Outline of algebraic structures

    Outline_of_algebraic_structures

  • Monoid
  • Algebraic structure with an associative operation and an identity element

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Monoid

    Monoid

    Monoid

  • Finite field
  • Algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Finite field

    Finite_field

  • Vector space
  • Algebraic structure in linear algebra

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Vector space

    Vector space

    Vector_space

  • Graded ring
  • Type of algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Graded ring

    Graded_ring

  • Algebra over a field
  • Vector space equipped with a bilinear product

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Algebra over a field

    Algebra_over_a_field

  • Ring (mathematics)
  • Algebraic structure with addition and multiplication

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Ring (mathematics)

    Ring_(mathematics)

  • Unique factorization domain
  • Type of integral domain

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Unique factorization domain

    Unique_factorization_domain

  • Module (mathematics)
  • Generalization of vector spaces from fields to rings

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Module (mathematics)

    Module_(mathematics)

  • Noetherian ring
  • Mathematical ring with well-behaved ideals

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Noetherian ring

    Noetherian ring

    Noetherian_ring

  • Euclidean domain
  • Commutative ring with a Euclidean division

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Euclidean domain

    Euclidean_domain

  • Racks and quandles
  • Sets with binary operations analogous to the Reidemeister moves used on knot diagrams

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Racks and quandles

    Racks_and_quandles

  • Weak Hopf algebra
  • In mathematics, weak bi-algebras are a generalization of bialgebras that are both algebras and coalgebras but for which the compatibility conditions between

    Weak Hopf algebra

    Weak_Hopf_algebra

  • Rng (algebra)
  • Algebraic ring without a multiplicative identity

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Rng (algebra)

    Rng_(algebra)

  • Semigroup
  • Algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Semigroup

    Semigroup

  • Group with operators
  • Concept in mathematics regarding sets operating on groups

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Group with operators

    Group_with_operators

  • Semiring
  • Algebraic ring that need not have additive negative elements

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Semiring

    Semiring

  • Quantum group
  • Algebraic construct of interest in theoretical physics

    continuity, the comultiplication on C is coassociative. In general, C is not a bialgebra, and C0 is a Hopf *-algebra. Informally, C can be regarded as the *-algebra

    Quantum group

    Quantum group

    Quantum_group

  • *-algebra
  • Mathematical structure in abstract algebra

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    *-algebra

    *-algebra

  • Principal ideal domain
  • Algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Principal ideal domain

    Principal_ideal_domain

  • Cofree coalgebra
  • v=v.} With the usual product this coproduct does not make T(V) into a bialgebra, but is instead dual to the algebra structure on T(V∗), where V∗ denotes

    Cofree coalgebra

    Cofree_coalgebra

  • Map of lattices
  • Concept in mathematics

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Map of lattices

    Map of lattices

    Map_of_lattices

  • Field (mathematics)
  • Algebraic structure with addition, multiplication, and division

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Field (mathematics)

    Field (mathematics)

    Field_(mathematics)

  • Bogdanov affair
  • 2002 French academic dispute

    current formulation, false: Grichka Bogdanov's construction yields a bialgebra which is not necessarily a Hopf algebra, the latter being a type of mathematical

    Bogdanov affair

    Bogdanov affair

    Bogdanov_affair

  • Vladimir Drinfeld
  • Mathematician

    algebra Opers Quantum affine algebra Quantized enveloping algebra Quasi-bialgebra Quasi-triangular quasi-Hopf algebra Ruziewicz problem Tate modules Awards

    Vladimir Drinfeld

    Vladimir_Drinfeld

  • Magma (algebra)
  • Algebraic structure with a binary operation

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Magma (algebra)

    Magma_(algebra)

  • Group (mathematics)
  • Set with associative invertible operation

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Group (mathematics)

    Group (mathematics)

    Group_(mathematics)

  • List of things named after Sophus Lie
  • bundle Lie algebra cohomology Lie algebra representation Lie algebroid Lie bialgebra Lie coalgebra Lie conformal algebra Lie superalgebra Abelian Lie algebra

    List of things named after Sophus Lie

    List_of_things_named_after_Sophus_Lie

  • Manin triple
  • Mathematics concept

    categories between finite-dimensional Manin triples and finite-dimensional Lie bialgebras. More precisely, if ( g , p , q ) {\displaystyle ({\mathfrak {g}},{\mathfrak

    Manin triple

    Manin_triple

  • Braided Hopf algebra
  • H is bijective. A Yetter–Drinfeld module R over H is called a braided bialgebra in the Yetter–Drinfeld category H H Y D {\displaystyle {}_{H}^{H}{\mathcal

    Braided Hopf algebra

    Braided_Hopf_algebra

  • Lie algebra
  • Algebraic structure used in analysis

    algebra cohomology Lie algebra extension Lie algebra representation Lie bialgebra Lie coalgebra Lie operad Particle physics and representation theory Orthogonal

    Lie algebra

    Lie algebra

    Lie_algebra

  • Semilattice
  • Partial order with joins

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Semilattice

    Semilattice

  • Hasse–Schmidt derivation
  • shows that a Hasse–Schmidt derivation is equivalent to an action of the bialgebra NSymm = Z ⟨ Z 1 , Z 2 , … ⟩ {\displaystyle \operatorname {NSymm} =\mathbf

    Hasse–Schmidt derivation

    Hasse–Schmidt_derivation

  • Complemented lattice
  • Bound lattice in which every element has a complement

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Complemented lattice

    Complemented lattice

    Complemented_lattice

  • Domain (ring theory)
  • Ring without nonzero zero divisors

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Domain (ring theory)

    Domain_(ring_theory)

  • Manin matrix
  • According to Yu. Manin's ideology one can associate to any algebra certain bialgebra of its "non-commutative symmetries (i.e. endomorphisms)". More generally

    Manin matrix

    Manin_matrix

  • Integrally closed domain
  • Algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Integrally closed domain

    Integrally_closed_domain

  • Near-ring
  • Algebraic structure in mathematics

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Near-ring

    Near-ring

  • Abelian group
  • Commutative group (mathematics)

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Abelian group

    Abelian group

    Abelian_group

  • Lattice (order)
  • Set whose pairs have minima and maxima

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Lattice (order)

    Lattice_(order)

  • Coalgebra
  • Structure dual to a unital associative algebra

    Objects like this are called bialgebras, and in fact most of the important coalgebras considered in practice are bialgebras. Examples of coalgebras include

    Coalgebra

    Coalgebra

  • Composition algebra
  • Type of algebras, possibly non associative

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Composition algebra

    Composition_algebra

  • Boolean algebra (structure)
  • Algebraic structure modeling logical operations

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Boolean algebra (structure)

    Boolean algebra (structure)

    Boolean_algebra_(structure)

  • Division ring
  • Algebraic structure also called skew field

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Division ring

    Division_ring

  • Viterbi semiring
  • Semiring defined over probabilities

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Viterbi semiring

    Viterbi_semiring

  • List of abstract algebra topics
  • Branch of mathematics that studies algebraic structures

    (mathematics) Category theory Monoidal category Groupoid Group object Coalgebra Bialgebra Hopf algebra Magma object Torsion (algebra) Symbolic mathematics Finite

    List of abstract algebra topics

    List_of_abstract_algebra_topics

  • GCD domain
  • Mathematical structure with greatest common divisors

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    GCD domain

    GCD_domain

  • Formal group law
  • Concept in mathematics

    Its formal group ring (also called its hyperalgebra or its covariant bialgebra) is a cocommutative Hopf algebra H constructed as follows. As an R-module

    Formal group law

    Formal_group_law

  • Lie bialgebroid
  • Mathematical structure in non-Riemannian differential geometry

    vector bundles. Lie bialgebroids are the vector bundle version of Lie bialgebras. A Lie algebroid consists of a bilinear skew-symmetric operation [ ⋅

    Lie bialgebroid

    Lie_bialgebroid

  • Integral domain
  • Commutative ring with no zero divisors other than zero

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Integral domain

    Integral_domain

  • Dedekind domain
  • Algebra with unique prime factorization

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Dedekind domain

    Dedekind_domain

  • Ring theory
  • Branch of algebra

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Ring theory

    Ring_theory

  • ZX-calculus
  • Graphical language for quantum processes

    computational basis state (in this case | 0 ⟩ {\displaystyle \vert 0\rangle } ). Bialgebra rule A 2-cycle of Z- and X-spiders simplifies. This expresses the property

    ZX-calculus

    ZX-calculus

  • Quasigroup
  • Magma obeying the Latin square property

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Quasigroup

    Quasigroup

    Quasigroup

  • Non-associative algebra
  • Algebra over a field where binary multiplication is not necessarily associative

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Non-associative algebra

    Non-associative_algebra

  • Frobenius algebra
  • Algebraic structure with "nice" duality properties

    Frobenius adjunction, i.e. if it has isomorphic left and right adjoints. Bialgebra Frobenius category Frobenius norm Frobenius inner product Hopf algebra

    Frobenius algebra

    Frobenius_algebra

  • Dimension (vector space)
  • Number of vectors in any basis of the vector space

    gives a notion of dimension for an abstract algebra. In practice, in bialgebras, this map is required to be the identity, which can be obtained by normalizing

    Dimension (vector space)

    Dimension (vector space)

    Dimension_(vector_space)

  • Yang–Baxter equation
  • Quantum consistency equation

    trivially holds at orders ℏ 0 , ℏ {\displaystyle \hbar ^{0},\hbar } ). Lie bialgebra Yangian Reidemeister move Quasitriangular Hopf algebra Yang–Baxter operator

    Yang–Baxter equation

    Yang–Baxter equation

    Yang–Baxter_equation

  • Associative bialgebroid
  • mathematics, an associative bialgebroid generalizes the concept of a bialgebra over a field to allow a possibly noncommutative base algebra instead of

    Associative bialgebroid

    Associative_bialgebroid

  • Modular tensor category
  • Type of monoidal category

    Lambe, Larry A.; Radford, David E. (1997), "Quasitriangular Algebras, Bialgebras, Hopf Algebras and The Quantum Double", in Lambe, Larry A.; Radford, David

    Modular tensor category

    Modular_tensor_category

  • 6-j symbol
  • Sums in quantum mathematics

    product representations, induced by coassociativity of the corresponding bialgebra. One of the axioms defining a monoidal category is that associators satisfy

    6-j symbol

    6-j symbol

    6-j_symbol

  • Bicrossed product of Hopf algebra
  • Concept in Hopf algebra

    general tool for construction of Drinfeld quantum double. Consider two bialgebras A {\displaystyle A} and X {\displaystyle X} , if there exist linear maps

    Bicrossed product of Hopf algebra

    Bicrossed_product_of_Hopf_algebra

  • Universal enveloping algebra
  • Concept in mathematics

    lifts, given the prescription above. See, however, the discussion of the bialgebra structure in the article on tensor algebras for a review of some of the

    Universal enveloping algebra

    Universal_enveloping_algebra

  • Quasi-Hopf algebra
  • mathematician Vladimir Drinfeld in 1989. A quasi-Hopf algebra is a quasi-bialgebra B A = ( A , Δ , ε , Φ ) {\displaystyle {\mathcal {B_{A}}}=({\mathcal {A}}

    Quasi-Hopf algebra

    Quasi-Hopf_algebra

  • Associator
  • functor in monoidal categories. Commutator Non-associative algebra Quasi-bialgebra – discusses the Drinfeld associator Bremner, M.; Hentzel, I. (March 2002)

    Associator

    Associator

  • Quasi-Frobenius Lie algebra
  • ({\mathfrak {g}},\triangleleft )} is a pre-Lie algebra. Lie coalgebra Lie bialgebra Lie algebra cohomology Frobenius algebra Quasi-Frobenius ring Jacobson

    Quasi-Frobenius Lie algebra

    Quasi-Frobenius_Lie_algebra

  • Yang–Baxter operator
  • Invertible linear endomorphism

    statistical mechanics and topology. Yang–Baxter equation Hopf algebra Lie bialgebra Yangian Braid theory Quantum groups Baxter, R. J. (1982). Exactly solved

    Yang–Baxter operator

    Yang–Baxter_operator

  • Toda lattice
  • Simple model for one-dimensional crystal in solid-state physics

    split into a sum of solitons and a decaying dispersive part. Lax pair Lie bialgebra Poisson–Lie group Krüger, Helge; Teschl, Gerald (2009), "Long-time asymptotics

    Toda lattice

    Toda_lattice

  • Bimodule
  • Abelian group equipped with compatible ring action on both sides

    generalization of bimodules. Note that bimodules are not at all related to bialgebras. Profunctor Street, Ross (20 Mar 2003). "Categorical and combinatorial

    Bimodule

    Bimodule

  • Distributive law between monads
  • ISBN 978-0-521-53931-9. Fox, T.F.; Markl, M. (1997). "Distributive laws, bialgebras, and cohomology". Operads: Proceedings of Renaissance Conferences. Contemporary

    Distributive law between monads

    Distributive law between monads

    Distributive_law_between_monads

  • Commutative ring
  • Algebraic structure

    operators Vector space Linear algebra Algebra-like Algebra Associative Non-associative Composition algebra Lie algebra Graded Bialgebra Hopf algebra v t e

    Commutative ring

    Commutative_ring

  • Schur algebra
  • {\displaystyle k[x_{ij}]} is a bialgebra. One easily checks that A k ( n , r ) {\displaystyle A_{k}(n,r)} is a subcoalgebra of the bialgebra k [ x i j ] {\displaystyle

    Schur algebra

    Schur_algebra

  • Compact quantum group
  • Abstract structure in mathematics

    continuity, the comultiplication on C is coassociative. In general, C is a bialgebra, and C0 is a Hopf *-algebra. Informally, C can be regarded as the *-algebra

    Compact quantum group

    Compact_quantum_group

  • Poisson manifold
  • Mathematical structure in differential geometry

    algebra structure, making g {\displaystyle {\mathfrak {g}}} into a Lie bialgebra. Moreover, Drinfeld proved that there is an equivalence of categories

    Poisson manifold

    Poisson_manifold

  • Monoidal monad
  • Bruguières and Virelizier they are called "bimonads", by analogy to "bialgebra", reserving the term "Hopf monad" for opmonoidal monads with an antipode

    Monoidal monad

    Monoidal_monad

  • R. L. Hudson
  • British mathematician

    application to the quantum Yang–Baxter equation, the quantisation of Lie bialgebras and quantum Lévy area. Hudson, R. L.; Ion, P. D. F.; K. R. Parthasarathy

    R. L. Hudson

    R. L. Hudson

    R._L._Hudson

  • Niklas Beisert
  • German physicist (born 1977)

    Supersymmetric Yang–Mills". YouTube. 30 November 2021. "Classical Lie Bialgebras for AdS/CFT Integrability by Contraction and Reduction by Niklas Beisert"

    Niklas Beisert

    Niklas_Beisert

  • Basil Hiley
  • British quantum physicist (1935–2025)

    a connection to the thermo field dynamics of Hiroomi Umezawa, using a bialgebra constructed from a two-time quantum theory. Hiley has stated that his

    Basil Hiley

    Basil_Hiley

  • Yuriy Drozd
  • Ukrainian mathematician (born 1944)

    techniques involving bocses (bimodules over a category endowed with a bialgebra structure) that enabled major progress in classifying modules across algebra

    Yuriy Drozd

    Yuriy Drozd

    Yuriy_Drozd

  • R-algebroid
  • associated to a Lie groupoid. Algebraic category Algebroid (disambiguation) Bialgebra Bicategory Convolution product Crossed module Double groupoid Higher-dimensional

    R-algebroid

    R-algebroid

  • Internal bialgebroid
  • Mathematical structure

    associative bialgebroids in the situations involving completed tensor products. Bialgebra Gabriella Böhm, Internal bialgebroids, entwining structures and corings

    Internal bialgebroid

    Internal_bialgebroid

  • Bialgebroid
  • Topics referred to by the same term

    a number of additional structure morphisms, generalizing associative bialgebras internal bialgebroid, a generalization of an associative bialgebroid where

    Bialgebroid

    Bialgebroid

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BIALGEBRA

Online names & meanings

  • Hobby
  • Surname or Lastname

    English

    Hobby

    English : nickname from Middle English hobi ‘hobby’, a small falcon, or from the same word denoting a small horse.English : habitational name from Hoby in Leicestershire, named with Old English hōh ‘spur of a hill’ + Old Norse býr ‘farmstead’, ‘settlement’.

  • Kshamya | க்ஷம்யா
  • Girl/Female

    Tamil

    Kshamya | க்ஷம்யா

    Earth

  • Haggith
  • Biblical

    Haggith

    rejoicing

  • Johnna
  • Girl/Female

    American, British, Chinese, Christian, Danish, English, Hebrew

    Johnna

    God is Gracious; Merciful; Consecrated to God

  • Kite
  • Surname or Lastname

    English (chiefly West Midlands)

    Kite

    English (chiefly West Midlands) : from Middle English kete, kyte ‘kite’ (the bird of prey; Old English c̄ta), a nickname for a fierce or rapacious person.

  • Chaunta | சௌநதா
  • Girl/Female

    Tamil

    Chaunta | சௌநதா

    One who outshines the stars

  • Myeshia
  • Girl/Female

    Arabic

    Myeshia

    Woman; Life; Variant of Aisha

  • Apollos
  • Boy/Male

    Greek Biblical

    Apollos

    Manly beauty. In Greek mythology, Apollo was the god of medicine and healing who drove his fiery...

  • Uninaj | உநீநாஜ
  • Boy/Male

    Tamil

    Uninaj | உநீநாஜ

    Ascending, Progressing

  • Abdus Salaam |
  • Boy/Male

    Muslim

    Abdus Salaam |

    Servant of the all-peaceable

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BIALGEBRA

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