Sklyanin algebra

In mathematics, specifically the field of algebra, Sklyanin algebras are a class of noncommutative algebra named after Evgeny Sklyanin. This class of algebras was first studied in the classification of Artin-Schelter regular^[1] algebras of global dimension 3 in the 1980s.^[2] Sklyanin algebras can be grouped into two different types, the non-degenerate Sklyanin algebras and the degenerate Sklyanin algebras, which have very different properties. A need to understand the non-degenerate Sklyanin algebras better has led to the development of the study of point modules in noncommutative geometry.^[2]

Formal definition

Let [math]\displaystyle{ k }[/math] be a field with a primitive cube root of unity. Let [math]\displaystyle{ \mathfrak{D} }[/math] be the following subset of the projective plane [math]\displaystyle{ \textbf{P}_k^2 }[/math]:

[math]\displaystyle{ \mathfrak{D} = \{ [1:0:0], [0:1:0], [0:0:1] \} \sqcup \{ [a:b:c ] \big| a^3=b^3=c^3\}. }[/math]

Each point [math]\displaystyle{ [a:b:c] \in \textbf{P}_k^2 }[/math] gives rise to a (quadratic 3-dimensional) Sklyanin algebra,

[math]\displaystyle{ S_{a,b,c} = k \langle x,y,z \rangle / (f_1, f_2, f_3), }[/math]

where,

[math]\displaystyle{ f_1 = ayz + bzy + cx^2, \quad f_2 = azx + bxz + cy^2, \quad f_3 = axy + b yx + cz^2. }[/math]

Whenever [math]\displaystyle{ [a:b:c ] \in \mathfrak{D} }[/math] we call [math]\displaystyle{ S_{a,b,c} }[/math] a degenerate Sklyanin algebra and whenever [math]\displaystyle{ [a:b:c] \in \textbf{P}^2 \setminus \mathfrak{D} }[/math] we say the algebra is non-degenerate.^[3]

Properties

The non-degenerate case shares many properties with the commutative polynomial ring [math]\displaystyle{ k[x,y,z] }[/math], whereas the degenerate case enjoys almost none of these properties. Generally the non-degenerate Sklyanin algebras are more challenging to understand than their degenerate counterparts.

Properties of degenerate Sklyanin algebras

Let [math]\displaystyle{ S_{\text{deg}} }[/math] be a degenerate Sklyanin algebra.

• [math]\displaystyle{ S_{\text{deg}} }[/math] contains non-zero zero divisors.^[4]
• The Hilbert series of [math]\displaystyle{ S_{\text{deg}} }[/math] is [math]\displaystyle{ H_{S_{\text{deg}}} = \frac{1+t}{1-2t} }[/math].^[4]
• Degenerate Sklyanin algebras have infinite Gelfand–Kirillov dimension.^[4]
• [math]\displaystyle{ S_{\text{deg}} }[/math] is neither left nor right Noetherian.^[4]
• [math]\displaystyle{ S_{\text{deg}} }[/math] is a Koszul algebra.^[4]
• Degenerate Sklyanin algebras have infinite global dimension.^[4]

Properties of non-degenerate Sklyanin algebras

Let [math]\displaystyle{ S }[/math] be a non-degenerate Sklyanin algebra.

• [math]\displaystyle{ S }[/math] contains no non-zero zero divisors.^[5]
• The hilbert series of [math]\displaystyle{ S }[/math] is [math]\displaystyle{ H_{S} = \frac{1}{(1-t)^3} }[/math].^[5]
• Non-degenerate Sklyanin algebras are Noetherian.^[5]
• [math]\displaystyle{ S }[/math] is Koszul.^[5]
• Non-degenerate Sklyanin algebras are Artin-Schelter ^[1] regular.^[5] Therefore, they have global dimension 3 and Gelfand–Kirillov dimension 3.^[1]
• There exists a normal central element in every non-degenerate Sklyanin algebra.^[6]

Examples

Degenerate Sklyanin algebras

The subset [math]\displaystyle{ \mathfrak{D} }[/math] consists of 12 points on the projective plane, which give rise to 12 expressions of degenerate Sklyanin algebras. However, some of these are isomorphic and there exists a classification of degenerate Sklyanin algebras into two different cases. Let [math]\displaystyle{ S_{\text{deg}} = S_{a,b,c} }[/math] be a degenerate Sklyanin algebra.

• If [math]\displaystyle{ a=b }[/math] then [math]\displaystyle{ S_{\text{deg}} }[/math] is isomorphic to [math]\displaystyle{ k \langle x,y,z \rangle /(x^2,y^2,z^2) }[/math], which is the Sklyanin algebra corresponding to the point [math]\displaystyle{ [0:0:1] \in \mathfrak{D} }[/math].
• If [math]\displaystyle{ a \neq b }[/math] then [math]\displaystyle{ S_{\text{deg}} }[/math] is isomorphic to [math]\displaystyle{ k \langle x,y,z \rangle /(xy,yx,zx) }[/math], which is the Sklyanin algebra corresponding to the point [math]\displaystyle{ [1:0:0] \in \mathfrak{D} }[/math].^[3]

These two cases are Zhang twists of each other^[3] and therefore have many properties in common.^[7]

Non-degenerate Sklyanin algebras

The commutative polynomial ring [math]\displaystyle{ k[x,y,z] }[/math] is isomorphic to the non-degenerate Sklyanin algebra [math]\displaystyle{ S_{1,-1,0} = k \langle x,y,z \rangle /( xy-yx, yz-zy, zx- xz) }[/math] and is therefore an example of a non-degenerate Sklyanin algebra.

Point modules

The study of point modules is a useful tool which can be used much more widely than just for Sklyanin algebras. Point modules are a way of finding projective geometry in the underlying structure of noncommutative graded rings. Originally, the study of point modules was applied to show some of the properties of non-degenerate Sklyanin algebras. For example to find their Hilbert series and determine that non-degenerate Sklyanin algebras do not contain zero divisors.^[2]

Non-degenerate Sklyanin algebras

Whenever [math]\displaystyle{ abc \neq 0 }[/math] and [math]\displaystyle{ \left( \frac{a^3+b^3+c^3}{3abc} \right) ^3 \neq 1 }[/math] in the definition of a non-degenerate Sklyanin algebra [math]\displaystyle{ S=S_{a,b,c} }[/math], the point modules of [math]\displaystyle{ S }[/math] are parametrised by an elliptic curve.^[2] If the parameters [math]\displaystyle{ a,b,c }[/math] do not satisfy those constraints, the point modules of any non-degenerate Sklyanin algebra are still parametrised by a closed projective variety on the projective plane.^[8] If [math]\displaystyle{ S }[/math] is a Sklyanin algebra whose point modules are parametrised by an elliptic curve, then there exists an element [math]\displaystyle{ g \in S }[/math] which annihilates all point modules i.e. [math]\displaystyle{ Mg = 0 }[/math] for all point modules [math]\displaystyle{ M }[/math] of [math]\displaystyle{ S }[/math].

Degenerate Sklyanin algebras

The point modules of degenerate Sklyanin algebras are not parametrised by a projective variety.^[4]

References

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