Root systems and Dynkin diagrams(mathematica)

Root Systems and Dynkin diagrams
    * http://en.wikipedia.org/wiki/root_systems
    * http://en.wikipedia.org/wiki/Dynkin_diagram

A_n root systems

(* A_n type Cartan matrix *)
r := 3
rt[i_] := UnitVector[r + 1, i] - UnitVector[r + 1, i + 1]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]

A := Table[b[i, j], {i, 1, r}, {j, 1, r}]

Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm

Print["Cartan matrix"]
A // MatrixForm

B_n root systems

Clear[rt]
(*B_r type Cartan matrix*)
r := 4
rt[i_] :=
If[i < r, UnitVector[r, i] - UnitVector[r, 1 + i], UnitVector[r, r]]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

C_n root systems

Clear[rt]
(*C_r type Cartan matrix*)
r := 4
rt[i_] :=
If[i < r, UnitVector[r, i] - UnitVector[r, 1 + i], 2*UnitVector[r, r]]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

D_n root systems

Clear[rt]
(*D_r type Cartan matrix*)
r := 6
rt[i_] :=
If[i < r, UnitVector[r, i] - UnitVector[r, 1 + i],
UnitVector[r, r - 1] + UnitVector[r, r]]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

G2 root system

Clear[r, rt]
(*G_ 2 type Cartan matrix*)
r := 2
rt[1] := {1, -1, 0}
rt[2] := {-1, 2, -1}
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
A // MatrixForm
rt[1]
rt[2] - rt[1]

F4 root system

Clear[r, rt]
(*F_ 4 type Cartan matrix*)
Clear[rt]
r := 4
rt[1] := {1, -1, 0, 0}
rt[2] := {0, 1, -1, 0}
rt[3] := {0, 0, 1, 0}
rt[4] := {-1, -1, -1, -1}/2
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}]
Print["Cartan matrix"]
A // MatrixForm

E_6 root system

Clear[rt]
(*E_ 6 type Cartan matrix*)
r := 6
rt[1] := {0, 0, 0, 0, 0, 0, 0, 1, \[Minus]1}
rt[2] := {0, 0, 0, 0, 0, 0, 1, -1, 0}
rt[3] := {1, -2, 1, -2, 1, 1, -2, 1, 1}/3
rt[4] := {0, 0, 0, 1, -1, 0, 0, 0, 0}
rt[5] := {0, 0, 0, 0, 1, -1, 0, 0, 0}
rt[6] := {0, 1, -1, 0, 0, 0, 0, 0, 0}
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

http://en.wikipedia.org/wiki/E6_(mathematics)

E_7 root system

Clear[rt]
(*E_ 7 type Cartan matrix*)
r := 7
alp := Sum[UnitVector[r + 1, i]/2, {i, 1, 4}] -
Sum[UnitVector[r + 1, i]/2, {i, 5, 8}]
rt[i_] :=
Piecewise[{{UnitVector[r + 1, i + 2] - UnitVector[r + 1, 1 + i],
    i < 7}, {alp, i == 7}}, {i, 1, r}]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

    * http://en.wikipedia.org/wiki/E7_%28mathematics%29

E_8 root system

Clear[rt]
(*E_ 8 type Cartan matrix*)
alp := -Sum[UnitVector[r, i]/2, {i, 1, r}]
r := 8
rt[i_] :=
Piecewise[{{UnitVector[r, i] - UnitVector[r, 1 + i],
    i < 7}, {UnitVector[r, i] + UnitVector[r, i - 1], i == 7}, {alp,
    i == 8}}, {i, Range[r]}]
b[i_, j_] := (2 Dot[rt[i], rt[j]])/Dot[rt[j], rt[j]]
A := Table[b[i, j], {i, 1, r}, {j, 1, r}]
Print["root vectors"]
Table[rt[i], {i, 1, r}] // TableForm
Print["Cartan matrix"]
A // MatrixForm

related items

    * dilogarithm and Nahm's conjecture (mathematica)

Root systems and Dynkin diagrams(mathematica)

둘러보기 메뉴

검색