slIrreducibleRepresentationsTensorProduct -- computes the the irreducible SL-subrepresentations of the tensor product of two symmetric products

Synopsis

Usage:

D = slIrreducibleRepresentationsTensorProduct(n,a,b)

D = slIrreducibleRepresentationsTensorProduct(R,a,b)
Inputs:
- n, an integer, positive
- R, a polynomial ring
- a, an integer, positive
- b, an integer, positive
Outputs:
- D, a list, of irreducible representations

Description

This function computes the decomposition in irreducible SL(n+1)-representations of the tensor product S^aV ⊗S^bV, where V = <v₀,...,v_n> and a ≤b.

If n = 1, the decomposition is

S^aV ⊗S^bV = S^a+bV ⊕S^a+b-2V ⊕S^a+b-4V ⊕…⊕S^b-aV,

while if n > 1, the decomposition is

S^aV ⊗S^bV = S^a+bV ⊕V_{(a+b-2)λ₁ + λ₂} ⊕V_{(a+b-4)λ₁ + 2λ₂} ⊕…⊕V_{(b-a)λ₁ + aλ₂},

where λ₁ and λ₂ are the two greatest fundamental weights of the Lie group SL(n+1) and V_{iλ₁+jλ₂} is the irreducible representation of highest weight iλ₁+jλ₂.

i1 : n = 2

o1 = 2

i2 : a = 1, b = 2

o2 = (1, 2)

o2 : Sequence

i3 : D = slIrreducibleRepresentationsTensorProduct(n,a,b);

i4 : #D

o4 = 2

i5 : D#0

         2               2     2                         2     2                                         2     2               2
o5 = {v v , 2v v v  + v v , v v  + 2v v v , 2v v v  + v v , v v , v v v  + v v v  + v v v , 2v v v  + v v , v v  + 2v v v , v v 
       0 0    0 0 1    1 0   0 1     1 0 1    0 0 2    2 0   1 1   0 1 2    1 0 2    2 0 1    1 1 2    2 1   0 2     2 0 2   1 2
     ----------------------------------------------------------------------------------------------------------------------------
                   2
     + 2v v v , v v }
         2 1 2   2 2

o5 : List

i6 : D#1

                  2     2                       2                                                2     2              2
o6 = {v v v  - v v , v v  - v v v , v v v  - v v , v v v  - v v v , v v v  - v v v , v v v  - v v , v v  - v v v , v v  - v v v }
       0 0 1    1 0   0 1    1 0 1   0 0 2    2 0   0 1 2    2 0 1   1 0 2    2 0 1   1 1 2    2 1   0 2    2 0 2   1 2    2 1 2

o6 : List

If a polynomial ring R is given, then n = numgens R - 1 and V = <R₀,...,R_n>.

i7 : R = QQ[x_0,x_1,x_2];

i8 : a = 2, b = 3

o8 = (2, 3)

o8 : Sequence

i9 : D = slIrreducibleRepresentationsTensorProduct(R,a,b);

i10 : #D

o10 = 3

i11 : D#0

        2 3    2 2           3    2   2         2      2 3    2 2           3   2 3           2     2 2      2               2  
o11 = {x x , 3x x x  + 2x x x , 3x x x  + 6x x x x  + x x , 3x x x  + 2x x x , x x  + 6x x x x  + 3x x x , 3x x x x  + 3x x x x 
        0 0    0 0 1     0 1 0    0 0 1     0 1 0 1    1 0    0 0 2     0 2 0   0 1     0 1 0 1     1 0 1    0 0 1 2     0 1 0 2
      ---------------------------------------------------------------------------------------------------------------------------
              2          3        3     2   2   2 2                    2 2             2         2      2   2         2      2 3 
      + 3x x x x  + x x x , 2x x x  + 3x x x , x x x  + 4x x x x x  + x x x  + 2x x x x  + 2x x x x , 3x x x  + 6x x x x  + x x ,
          0 2 0 1    1 2 0    0 1 1     1 0 1   0 1 2     0 1 0 1 2    1 0 2     0 2 0 1     1 2 0 1    0 0 2     0 2 0 2    2 0 
      ---------------------------------------------------------------------------------------------------------------------------
       2 3        2       2              3           2   2   2           2                       2      2 2      2 2           3 
      x x , 3x x x x  + 3x x x x  + x x x  + 3x x x x , x x x  + 2x x x x  + 4x x x x x  + 2x x x x  + x x x , 3x x x  + 2x x x ,
       1 1    0 1 1 2     1 0 1 2    0 2 1     1 2 0 1   0 1 2     0 1 0 2     0 2 0 1 2     1 2 0 2    2 0 1    1 1 2     1 2 1 
      ---------------------------------------------------------------------------------------------------------------------------
              2    2   2         2                    2   2   2 3           2     2 2      2   2         2      2 3       3  
      2x x x x  + x x x  + 2x x x x  + 4x x x x x  + x x x , x x  + 6x x x x  + 3x x x , 3x x x  + 6x x x x  + x x , x x x  +
        0 1 1 2    1 0 2     0 2 1 2     1 2 0 1 2    2 0 1   0 2     0 2 0 2     2 0 2    1 1 2     1 2 1 2    2 1   0 1 2  
      ---------------------------------------------------------------------------------------------------------------------------
              2           2     2         2 3           2     2 2          3     2   2        3     2   2   2 3
      3x x x x  + 3x x x x  + 3x x x x , x x  + 6x x x x  + 3x x x , 2x x x  + 3x x x , 2x x x  + 3x x x , x x }
        0 2 1 2     1 2 0 2     2 0 1 2   1 2     1 2 1 2     2 1 2    0 2 2     2 0 2    1 2 2     2 1 2   2 2

o11 : List

i12 : D#1

        2 2          3    2   2        2      2 3   2 2          3   2 3          2     2 2      2              2          3 
o12 = {x x x  - x x x , 2x x x  - x x x x  - x x , x x x  - x x x , x x  + x x x x  - 2x x x , 2x x x x  - x x x x  - x x x ,
        0 0 1    0 1 0    0 0 1    0 1 0 1    1 0   0 0 2    0 2 0   0 1    0 1 0 1     1 0 1    0 0 1 2    0 2 0 1    1 2 0 
      ---------------------------------------------------------------------------------------------------------------------------
           2          2         3    2   2   2 2      2 2            2        2                   2 2             2        2   
      x x x x  - x x x x , x x x  - x x x , x x x  - x x x  + x x x x  - x x x x , 2x x x x x  + x x x  - 2x x x x  - x x x x ,
       0 1 0 2    0 2 0 1   0 1 1    1 0 1   0 1 2    1 0 2    0 2 0 1    1 2 0 1    0 1 0 1 2    1 0 2     0 2 0 1    1 2 0 1 
      ---------------------------------------------------------------------------------------------------------------------------
        2   2        2      2 3       2            2    2              3          2    2   2                       2      2 2   
      2x x x  - x x x x  - x x , x x x x  - x x x x , 2x x x x  - x x x  - x x x x , 2x x x  + 2x x x x x  - 3x x x x  - x x x ,
        0 0 2    0 2 0 2    2 0   0 1 1 2    1 2 0 1    1 0 1 2    0 2 1    1 2 0 1    0 1 2     0 2 0 1 2     1 2 0 2    2 0 1 
      ---------------------------------------------------------------------------------------------------------------------------
              2                      2      2 2     2 2          3          2        2                    2   2    2   2  
      2x x x x  - 2x x x x x  + x x x x  - x x x , x x x  - x x x , 2x x x x  + x x x x  - 2x x x x x  - x x x , 2x x x  -
        0 1 0 2     0 2 0 1 2    1 2 0 2    2 0 1   1 1 2    1 2 1    0 1 1 2    0 2 1 2     1 2 0 1 2    2 0 1    1 0 2  
      ---------------------------------------------------------------------------------------------------------------------------
            2                    2   2   2 3          2     2 2      2   2        2      2 3       3          2     2       
      3x x x x  + 2x x x x x  - x x x , x x  + x x x x  - 2x x x , 2x x x  - x x x x  - x x , x x x  + x x x x  - 2x x x x ,
        0 2 1 2     1 2 0 1 2    2 0 1   0 2    0 2 0 2     2 0 2    1 1 2    1 2 1 2    2 1   0 1 2    1 2 0 2     2 0 1 2 
      ---------------------------------------------------------------------------------------------------------------------------
             2          2   2 3          2     2 2         3    2   2       3    2   2
      x x x x  - x x x x , x x  + x x x x  - 2x x x , x x x  - x x x , x x x  - x x x }
       0 2 1 2    1 2 0 2   1 2    1 2 1 2     2 1 2   0 2 2    2 0 2   1 2 2    2 1 2

o12 : List

i13 : D#2

        2   2         2      2 3   2 3           2    2 2     2              2          2          3   2 2      2 2             2
o13 = {x x x  - 2x x x x  + x x , x x  - 2x x x x  + x x x , x x x x  - x x x x  - x x x x  + x x x , x x x  - x x x  - 2x x x x 
        0 0 1     0 1 0 1    1 0   0 1     0 1 0 1    1 0 1   0 0 1 2    0 1 0 2    0 2 0 1    1 2 0   0 1 2    1 0 2     0 2 0 1
      ---------------------------------------------------------------------------------------------------------------------------
              2                  2 2            2        2     2   2         2      2 3       2      2              3          2 
      + 2x x x x , x x x x x  - x x x  - x x x x  + x x x x , x x x  - 2x x x x  + x x , x x x x  - x x x x  - x x x  + x x x x ,
          1 2 0 1   0 1 0 1 2    1 0 2    0 2 0 1    1 2 0 1   0 0 2     0 2 0 2    2 0   0 1 1 2    1 0 1 2    0 2 1    1 2 0 1 
      ---------------------------------------------------------------------------------------------------------------------------
       2   2                  2 2           2                     2      2 2           2        2                   2   2   2   2
      x x x  - 2x x x x x  + x x x , x x x x  - x x x x x  - x x x x  + x x x , x x x x  - x x x x  - x x x x x  + x x x , x x x 
       0 1 2     0 2 0 1 2    2 0 1   0 1 0 2    0 2 0 1 2    1 2 0 2    2 0 1   0 1 1 2    0 2 1 2    1 2 0 1 2    2 0 1   1 0 2
      ---------------------------------------------------------------------------------------------------------------------------
                       2   2   2 3           2    2 2     2   2         2      2 3       3          2          2    2         2 3
      - 2x x x x x  + x x x , x x  - 2x x x x  + x x x , x x x  - 2x x x x  + x x , x x x  - x x x x  - x x x x  + x x x x , x x 
          1 2 0 1 2    2 0 1   0 2     0 2 0 2    2 0 2   1 1 2     1 2 1 2    2 1   0 1 2    0 2 1 2    1 2 0 2    2 0 1 2   1 2
      ---------------------------------------------------------------------------------------------------------------------------
                2    2 2
      - 2x x x x  + x x x }
          1 2 1 2    2 1 2

o13 : List

Ways to use `slIrreducibleRepresentationsTensorProduct` :

slIrreducibleRepresentationsTensorProduct(PolynomialRing,ZZ,ZZ)
slIrreducibleRepresentationsTensorProduct(ZZ,ZZ,ZZ)

slIrreducibleRepresentationsTensorProduct -- computes the the irreducible SL-subrepresentations of the tensor product of two symmetric products

Synopsis

Description

Ways to use slIrreducibleRepresentationsTensorProduct :

Ways to use `slIrreducibleRepresentationsTensorProduct` :