List of finite-dimensional Nichols algebras

In mathematics, a Nichols algebra is a Hopf algebra in a braided category assigned to an object V in this category (e.g. a braided vector space). The Nichols algebra is a quotient of the tensor algebra of V enjoying a certain universal property and is typically infinite-dimensional. Nichols algebras appear naturally in any pointed Hopf algebra and enabled their classification in important cases.[1] The most well known examples for Nichols algebras are the Borel parts of the infinite-dimensional quantum groups when q is no root of unity, and the first examples of finite-dimensional Nichols algebras are the Borel parts of the Frobenius–Lusztig kernel (small quantum group) when q is a root of unity.

The following article lists all known finite-dimensional Nichols algebras where is a Yetter–Drinfel'd module over a finite group , where the group is generated by the support of . For more details on Nichols algebras see Nichols algebra.

Note that a Nichols algebra only depends on the braided vector space and can therefore be realized over many different groups. Sometimes there are two or three Nichols algebras with different and non-isomorphic Nichols algebra, which are closely related (e.g. cocycle twists of each other). These are given by different conjugacy classes in the same column.

State of classification

(as of 2015)

Established classification results

Negative criteria

The case of rank 1 (irreducible Yetter–Drinfel'd module) over a nonabelian group is still largely open, with few examples known.

Much progress has been made by Andruskiewitsch and others by finding subracks (for example diagonal ones) that would lead to infinite-dimensional Nichols algebras. As of 2015, known groups not admitting finite-dimensional Nichols algebras are [7][8]

Usually a large amount of conjugacy classes ae of type D ("not commutative enough"), while the others tend to possess sufficient abelian subracks and can be excluded by their consideration. Several cases have to be done by-hand. Note that the open cases tend to have very small centralizers (usually cyclic) and representations χ (usually the 1-dimensional sign representation). Significant exceptions are the conjugacy classes of order 16, 32 having as centralizers p-groups of order 2048 resp. 128 and currently no restrictions on χ.

Over abelian groups

Finite-dimensional diagonal Nichols algebras over the complex numbers were classified by Heckenberger in [4] in terms of the braiding matrix , more precisely the data . The small quantum groups are a special case , but there are several exceptional examples involving the primes 2,3,4,5,7.

Recently there has been progress understanding the other examples as exceptional Lie algebras and super-Lie algebras in finite characteristic.

Over nonabelian group, rank > 1

Nichols algebras from Coxeter groups

For every finite coxeter system the Nichols algebra over the conjugacy class(es) of reflections was studied in [12] (reflections on roots of different length are not conjugate, see fourth example fellow). They discovered in this way the following first Nichols algebras over nonabelian groups :

Rank, Type of root system of [2]
Dimension of
Dimension of Nichols algebra(s)
Hilbert series
Smallest realizing group Symmetric group Symmetric group Symmetric group Dihedral group
... and conjugacy classes
Source [12] [12][13] [12][14] [12]
Comments Kirilov–Fomin algebras This smallest nonabelian Nichols algebra of rank 2 is the case in the classification.[6][15] It can be constructed as smallest example of an infinite series from , see.[16]

The case is the rank 1 diagonal Nichols algebra of dimension 2.

Other Nichols algebras of rank 1

Rank, Type of root system of [2]
Dimension of
Dimension of Nichols algebra(s)
Hilbert series
Smallest realizing group Special linear group extending the alternating group Affine linear group Affine linear group
... and conjugacy classes
Source [17] [18] [13]
Comments There exists a Nichols algebra of rank 2 containing this Nichols algebra Only example with many cubic (but not many quadratic) relations. Affine racks

Nichols algebras of rank 2, type Gamma-3

These Nichols algebras were discovered during the classification of Heckenberger and Vendramin.[19]

only in characteristic 2
Rank, Type of root system of [2]
Dimension of resp. resp.
Dimension of Nichols algebra(s)
Hilbert series
Smallest realizing group and conjugacy class
... and conjugacy classes
Source [19] [19] [19]
Comments Only example with a 2-dimensional irreducible representation There exists a Nichols algebra of rank 3 extending this Nichols algebra Only in characteristic 2. Has a non-Lie type root system with 6 roots.

The Nichols algebra of rank 2 type Gamma-4

This Nichols algebra was discovered during the classification of Heckenberger and Vendramin.[19]

Root system
Dimension of
Dimension of Nichols algebra
Hilbert series
Smallest realizing group (semidihedral group)
...and conjugacy class
Comments Both rank 1 Nichols algebra contained in this Nichols algebra decompose over their respective support: The left node to a Nichols algebra over the Coxeter group , the right node to a diagonal Nichols algebra of type .

The Nichols algebra of rank 2, type T

This Nichols algebra was discovered during the classification of Heckenberger and Vendramin.[19]

Root system
Dimension of
Dimension of Nichols algebra
Hilbert series
Smallest realizing group
...and conjugacy class
Comments The rank 1 Nichols algebra contained in this Nichols algebra is irreducible over its support and can be found above.

The Nichols algebra of rank 3 involving Gamma-3

This Nichols algebra was the last Nichols algebra discovered during the classification of Heckenberger and Vendramin.[6]

Root system Rank 3 Number 9 with 13 roots [3]
Dimension of resp.
Dimension of Nichols algebra
Hilbert series
Smallest realizing group
...and conjugacy class
Comments The rank 2 Nichols algebra cenerated by the two leftmost node is of type and can be found above. The rank 2 Nichols algebra generated by the two rightmost nodes is either diagonal of type or .

Nichols algebras from diagram folding

The following families Nichols algebras were constructed by Lentner using diagram folding,[16] the fourth example appearing only in characteristic 3 was discovered during the classification of Heckenberger and Vendramin.[6]

The construction start with a known Nichols algebra (here diagonal ones related to quantum groups) and an additional automorphism of the Dynkin diagram. Hence the two major cases are whether this automorphism exchanges two disconnected copies or is a proper diagram automorphism of a connected Dynkin diagram. The resulting root system is folding / restriction of the original root system.[20] By construction, generators and relations are known from the diagonal case.

only characteristic 3

Rank, Type of root system of [2]
Constructed from this diagonal Nichol algebra with in characteristic 3.
Dimension of
Dimension of Nichols algebra(s)
Hilbert series Same as the respective diagonal Nichols algebra
Smallest realizing group Extra special group (resp. almost extraspecial) with elements, except that requires a similar group with larger center of order .
Source [16] [6]
Comments Supposedly a folding of the diagonal Nichols algebra of type with which exceptionally appears in characteristic 3.

The following two are obtained by proper automorphisms of the connected Dynkin diagrams

Rank, Type of root system of [2]
Constructed from this diagonal Nichol algebra with
Dimension of
Dimension of Nichols algebra(s)
Hilbert series Same as the respective diagonal Nichols algebra Same as the respective diagonal Nichols algebra

Smallest realizing group Group of order with larger center of order resp. (for even resp. odd) Group of order with larger center of order

i.e.

... and conjugacy class
Source [16]

Note that there are several more foldings, such as and also some not of Lie type, but these violate the condition that the support generates the group.

Poster with all Nichols algebras known so far

(Simon Lentner, University Hamburg, please feel free to write comments/corrections/wishes in this matter: simon.lentner at uni-hamburg.de)

References

  1. Andruskiewitsch, Schneider: Pointed Hopf algebras, New directions in Hopf algebras, 1–68, Math. Sci. Res. Inst. Publ., 43, Cambridge Univ. Press, Cambridge, 2002.
  2. 1 2 3 4 5 6 Andruskiewitsch, Heckenberger, Schneider: The Nichols algebra of a semisimple Yetter–Drinfeld module, Amer. J. Math., vol. 132, no. 6, December 2010, pp. 1493–1547.
  3. 1 2 Cuntz, Heckenberger: Finite Weyl groupoids, Preprint (2010) arXiv:1008.5291, to appear in J. Reine Angew. Math. (2013)
  4. 1 2 Heckenberger: Classification of arithmetic root systems, Adv. Math. 220 (2009), 59–124.
  5. Heckenberger, Wang: Rank 2 Nichols Algebras of Diagonal Type over Fields of Positive Characteristic, SIGMA 11 (2015), 011, 24 pages
  6. 1 2 3 4 5 Heckenberger, Vendramin: A classification of Nichols algebras of semi-simple Yetter–Drinfeld modules over non-abelian groups , Preprint (2014) arXiv:1412.0857
  7. Andruskiewitsch, Fantino, Grana, Vendramin: On Nichols algebras associated to simple racks, 2010.
  8. Andruskiewitsch, Fantino, Grana, Vendramin: Pointed Hopf algebras over the sporadic simple groups, 2010.
  9. 1 2 Andruskiewitsch, Fantino, Grana, Vendramin: Finite-dimensional pointed Hopf algebras with alternating groups are trivial, 2010.
  10. Andruskiewitsch, Carnovale, García: Finite-dimensional pointed Hopf algebras over finite simple groups of Lie type I. Non-semisimple classes in PSL(n,q), Preprint (2013), arXiv:1312.6238
  11. Andruskiewitsch, Carnovale, García: Finite-dimensional pointed Hopf algebras over finite simple groups of Lie type II. Unipotent classes in symplectic groups, Preprint (2013), arXiv:1312.6238
  12. 1 2 3 4 5 Schneider, Milinski: Nichols algebras over Coxeter groups, 2000.
  13. 1 2 Andruskiewisch, Grana: From racks to pointed Hopf algebras, Adv. in Math. 178 (2), 177–243 (2003)
  14. Fomin,Kirilov: Quadratic algebras, Dunkl elements and Schubert calculus, 1999.
  15. Heckenberger, Schneider: Nichols algebras over groups with finite root system of rank 2 I, 2010.
  16. 1 2 3 4 Lentner: Dissertation (2012) and New Large-Rank Nichols Algebras Over Nonabelian Groups With Commutator Subgroup Z_2, Journal of Algebra 419 (2014) pp. 1–33.
  17. Grana: On Nichols algebras of low dimension, New Trends in Hopf Algebra Theory; Contemp. Math. 267 (2000), 111–136
  18. Heckenberger, Lochmann, Vendramin: Braided racks, Hurwitz actions and Nichols algebras with many cubic relations, Transform. Groups 17 (2012), no. 1, 157–194
  19. 1 2 3 4 5 6 Heckenberger, Vendramin: The classification of Nichols algebras over groups with finite root system of rank two , Preprint (2013) arXiv:1311.2881
  20. Cuntz, Lentner: A simplicial complex of Nichols algebras, Preprint (2015) arXiv:1503.08117.
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