Tensor algebra

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In mathematics, the tensor algebra of a vector space V, denoted T(V) or T(V), is the algebra of tensors on V (of any rank) with multiplication being the tensor product. It is the free algebra on V, in the sense of being left adjoint to the forgetful functor from algebras to vector spaces: it is the "most general" algebra containing V, in the sense of the corresponding universal property (see below).

The tensor algebra is important because many other algebras arise as quotient algebras of T(V). These include the exterior algebra, the symmetric algebra, Clifford algebras, the Weyl algebra and universal enveloping algebras.

The tensor algebra also has two coalgebra structures; one simple one, which does not make it a bialgebra, but does lead to the 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.

Note: In this article, all algebras are assumed to be unital and associative. The unit is explicitly required to define the coproduct.

Construction

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Let V be a vector space over a field K. For any nonnegative integer k, we define the kth tensor power of V to be the tensor product of V with itself k times:

 

That is, TkV consists of all tensors on V of order k. By convention T0V is the ground field K (as a one-dimensional vector space over itself).

We then construct T(V) as the direct sum of TkV for k = 0,1,2,…

 

The multiplication in T(V) is determined by the canonical isomorphism

 

given by the tensor product, which is then extended by linearity to all of T(V). This multiplication rule implies that the tensor algebra T(V) is naturally a graded algebra with TkV serving as the grade-k subspace. This grading can be extended to a Z-grading by appending subspaces   for negative integers k.

The construction generalizes in a straightforward manner to the tensor algebra of any module M over a commutative ring. If R is a non-commutative ring, one can still perform the construction for any R-R bimodule M. (It does not work for ordinary R-modules because the iterated tensor products cannot be formed.)

Adjunction and universal property

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The tensor algebra T(V) is also called the free algebra on the vector space V, and is functorial; this means that the map   extends to linear maps for forming a functor from the category of K-vector spaces to the category of associative algebras. Similarly with other free constructions, the functor T is left adjoint to the forgetful functor that sends each associative K-algebra to its underlying vector space.

Explicitly, the tensor algebra satisfies the following universal property, which formally expresses the statement that it is the most general algebra containing V:

Any linear map   from V to an associative algebra A over K can be uniquely extended to an algebra homomorphism from T(V) to A as indicated by the following commutative diagram:
 
Universal property of the tensor algebra

Here i is the canonical inclusion of V into T(V). As for other universal properties, the tensor algebra T(V) can be defined as the unique algebra satisfying this property (specifically, it is unique up to a unique isomorphism), but this definition requires to prove that an object satisfying this property exists.

The above universal property implies that T is a functor from the category of vector spaces over K, to the category of K-algebras. This means that any linear map between K-vector spaces U and W extends uniquely to a K-algebra homomorphism from T(U) to T(W).

Non-commutative polynomials

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If V has finite dimension n, another way of looking at the tensor algebra is as the "algebra of polynomials over K in n non-commuting variables". If we take basis vectors for V, those become non-commuting variables (or indeterminates) in T(V), subject to no constraints beyond associativity, the distributive law and K-linearity.

Note that the algebra of polynomials on V is not  , but rather  : a (homogeneous) linear function on V is an element of   for example coordinates   on a vector space are covectors, as they take in a vector and give out a scalar (the given coordinate of the vector).

Quotients

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Because of the generality of the tensor algebra, many other algebras of interest can be constructed by starting with the tensor algebra and then imposing certain relations on the generators, i.e. by constructing certain quotient algebras of T(V). Examples of this are the exterior algebra, the symmetric algebra, Clifford algebras, the Weyl algebra and universal enveloping algebras.

Coalgebra

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The tensor algebra has two different coalgebra structures. One is compatible with the tensor product, and thus can be extended to a bialgebra, and can be further be extended with an antipode to a Hopf algebra structure. The other structure, although simpler, cannot be extended to a bialgebra. The first structure is developed immediately below; the second structure is given in the section on the cofree coalgebra, further down.

The development provided below can be equally well applied to the exterior algebra, using the wedge symbol   in place of the tensor symbol  ; a sign must also be kept track of, when permuting elements of the exterior algebra. This correspondence also lasts through the definition of the bialgebra, and on to the definition of a Hopf algebra. That is, the exterior algebra can also be given a Hopf algebra structure.

Similarly, the symmetric algebra can also be given the structure of a Hopf algebra, in exactly the same fashion, by replacing everywhere the tensor product   by the symmetrized tensor product  , i.e. that product where  

In each case, this is possible because the alternating product   and the symmetric product   obey the required consistency conditions for the definition of a bialgebra and Hopf algebra; this can be explicitly checked in the manner below. Whenever one has a product obeying these consistency conditions, the construction goes through; insofar as such a product gave rise to a quotient space, the quotient space inherits the Hopf algebra structure.

In the language of category theory, one says that there is a functor T from the category of K-vector spaces to the category of K-associative algebras. But there is also a functor Λ taking vector spaces to the category of exterior algebras, and a functor Sym taking vector spaces to symmetric algebras. There is a natural map from T to each of these. Verifying that quotienting preserves the Hopf algebra structure is the same as verifying that the maps are indeed natural.

Coproduct

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The coalgebra is obtained by defining a coproduct or diagonal operator

 

Here,   is used as a short-hand for   to avoid an explosion of parentheses. The   symbol is used to denote the "external" tensor product, needed for the definition of a coalgebra. It is being used to distinguish it from the "internal" tensor product  , which is already being used to denote multiplication in the tensor algebra (see the section Multiplication, below, for further clarification on this issue). In order to avoid confusion between these two symbols, most texts will replace   by a plain dot, or even drop it altogether, with the understanding that it is implied from context. This then allows the   symbol to be used in place of the   symbol. This is not done below, and the two symbols are used independently and explicitly, so as to show the proper location of each. The result is a bit more verbose, but should be easier to comprehend.

The definition of the operator   is most easily built up in stages, first by defining it for elements   and then by homomorphically extending it to the whole algebra. A suitable choice for the coproduct is then

 

and

 

where   is the unit of the field  . By linearity, one obviously has

 

for all   It is straightforward to verify that this definition satisfies the axioms of a coalgebra: that is, that

 

where   is the identity map on  . Indeed, one gets

 

and likewise for the other side. At this point, one could invoke a lemma, and say that   extends trivially, by linearity, to all of  , because   is a free object and   is a generator of the free algebra, and   is a homomorphism. However, it is insightful to provide explicit expressions. So, for  , one has (by definition) the homomorphism

 

Expanding, one has

 

In the above expansion, there is no need to ever write   as this is just plain-old scalar multiplication in the algebra; that is, one trivially has that  

The extension above preserves the algebra grading. That is,

 

Continuing in this fashion, one can obtain an explicit expression for the coproduct acting on a homogenous element of order m:

 

where the   symbol, which should appear as ш, the sha, denotes the shuffle product. This is expressed in the second summation, which is taken over all (p, mp)-shuffles. The shuffle is

 

By convention, one takes that Sh(m,0) and Sh(0,m) equals {id: {1, ..., m} → {1, ..., m}}. It is also convenient to take the pure tensor products   and   to equal 1 for p = 0 and p = m, respectively (the empty product in  ). The shuffle follows directly from the first axiom of a co-algebra: the relative order of the elements   is preserved in the riffle shuffle: the riffle shuffle merely splits the ordered sequence into two ordered sequences, one on the left, and one on the right.

Equivalently,

 

where the products are in  , and where the sum is over all subsets of  .

As before, the algebra grading is preserved:

 

Counit

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The counit   is given by the projection of the field component out from the algebra. This can be written as   for   and   for  . By homomorphism under the tensor product  , this extends to

 

for all   It is a straightforward matter to verify that this counit satisfies the needed axiom for the coalgebra:

 

Working this explicitly, one has

 

where, for the last step, one has made use of the isomorphism  , as is appropriate for the defining axiom of the counit.

Bialgebra

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A bialgebra defines both multiplication, and comultiplication, and requires them to be compatible.

Multiplication

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Multiplication is given by an operator

 

which, in this case, was already given as the "internal" tensor product. That is,

 

That is,   The above should make it clear why the   symbol needs to be used: the   was actually one and the same thing as  ; and notational sloppiness here would lead to utter chaos. To strengthen this: the tensor product   of the tensor algebra corresponds to the multiplication   used in the definition of an algebra, whereas the tensor product   is the one required in the definition of comultiplication in a coalgebra. These two tensor products are not the same thing!

Unit

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The unit for the algebra

 

is just the embedding, so that

 

That the unit is compatible with the tensor product   is "trivial": it is just part of the standard definition of the tensor product of vector spaces. That is,   for field element k and any   More verbosely, the axioms for an associative algebra require the two homomorphisms (or commuting diagrams):

 

on  , and that symmetrically, on  , that

 

where the right-hand side of these equations should be understood as the scalar product.

Compatibility

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The unit and counit, and multiplication and comultiplication, all have to satisfy compatibility conditions. It is straightforward to see that

 

Similarly, the unit is compatible with comultiplication:

 

The above requires the use of the isomorphism   in order to work; without this, one loses linearity. Component-wise,

 

with the right-hand side making use of the isomorphism.

Multiplication and the counit are compatible:

 

whenever x or y are not elements of  , and otherwise, one has scalar multiplication on the field:   The most difficult to verify is the compatibility of multiplication and comultiplication:

 

where   exchanges elements. The compatibility condition only needs to be verified on  ; the full compatibility follows as a homomorphic extension to all of   The verification is verbose but straightforward; it is not given here, except for the final result:

 

For   an explicit expression for this was given in the coalgebra section, above.

Hopf algebra

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The Hopf algebra adds an antipode to the bialgebra axioms. The antipode   on   is given by

 

This is sometimes called the "anti-identity". The antipode on   is given by

 

and on   by

 

This extends homomorphically to

 

Compatibility

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Compatibility of the antipode with multiplication and comultiplication requires that

 

This is straightforward to verify componentwise on  :

 

Similarly, on  :

 

Recall that

 

and that

 

for any   that is not in  

One may proceed in a similar manner, by homomorphism, verifying that the antipode inserts the appropriate cancellative signs in the shuffle, starting with the compatibility condition on   and proceeding by induction.

Cofree cocomplete coalgebra

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One may define a different coproduct on the tensor algebra, simpler than the one given above. It is given by

 

Here, as before, one uses the notational trick   (recalling that   trivially).

This coproduct gives rise to a coalgebra. It describes a coalgebra that is dual to the algebra structure on T(V), where V denotes the dual vector space of linear maps VF. In the same way that the tensor algebra is a free algebra, the corresponding coalgebra is termed cocomplete co-free. With the usual product this is not a bialgebra. It can be turned into a bialgebra with the product   where (i,j) denotes the binomial coefficient for  . This bialgebra is known as the divided power Hopf algebra.

The difference between this, and the other coalgebra is most easily seen in the   term. Here, one has that

 

for  , which is clearly missing a shuffled term, as compared to before.

See also

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References

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  • Bourbaki, Nicolas (1989). Algebra I. Chapters 1-3. Elements of Mathematics. Springer-Verlag. ISBN 3-540-64243-9. (See Chapter 3 §5)