// File for storing Hecke algebra data.
LoadIn := [];
LoadInRel := <>;

Append(~LoadIn, <1031, 3, 3, 1, 2, 1031, 2, 2, 2, 4, 2, 3, 1, 4, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <1511, 3, 3, 1, 2, 1511, 2, 3, 3, 4, 2, 3, 1, 9, "D_{7}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <2087, 3, 3, 1, 2, 2087, 2, 2, 2, 4, 2, 3, 1, 3, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <4259, 3, 3, 1, 2, 4259, 2, 2, 2, 4, 2, 3, 1, 3, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <4799, 3, 3, 1, 2, 4799, 2, 3, 3, 22, 2, 4, 9, 9, "D_{7}", Polynomial(\[])>);
hKi := GF(3, 3);
Append(~LoadInRel, <<3, 8, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^19, hKi.1^21, hKi.1^4, 2, hKi.1^5, 2, hKi.1^22, hKi.1^25, hKi.1^5, hKi.1^15,
hKi.1^20, hKi.1, hKi.1^24, hKi.1^17, hKi.1^16, hKi.1^2, hKi.1^25 ]>, <3, 9, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^3, hKi.1^9, hKi.1^23, 
hKi.1^14, hKi.1^24, hKi.1^10, 1, hKi.1^8, hKi.1^9, 2, hKi.1^19, hKi.1^10, hKi.1^12, hKi.1^7, hKi.1^7, hKi.1^7, hKi.1^24 ]>, <3, 10, [ 
GF(3, 3) | 0, 0, 0, 0, hKi.1^19, hKi.1^7, hKi.1^19, hKi.1, hKi.1^14, hKi.1^23, hKi.1^21, hKi.1^21, hKi.1^6, hKi.1, hKi.1^4, hKi.1^17, 
hKi.1^11, hKi.1^20, hKi.1^9, hKi.1^3, hKi.1^19 ]>, <3, 11, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^16, hKi.1^2, hKi.1^7, hKi.1^21, 1, hKi.1^6, 
hKi.1^2, hKi.1^5, hKi.1^5, hKi.1^14, hKi.1^19, hKi.1^18, hKi.1^14, hKi.1^20, hKi.1^20, hKi.1, hKi.1^3 ]>, <3, 12, [ GF(3, 3) | 0, 0, 
0, 0, 2, hKi.1^11, hKi.1^20, hKi.1^19, hKi.1^16, hKi.1^6, hKi.1, 1, hKi.1^11, hKi.1^21, hKi.1^3, hKi.1^9, hKi.1^5, hKi.1^21, hKi.1, 
hKi.1^12, hKi.1^5 ]>, <3, 13, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^23, hKi.1^7, hKi.1^15, 0, hKi.1^14, hKi.1^11, hKi.1^6, hKi.1^12, 
hKi.1^19, hKi.1^4, 2, hKi.1^18, hKi.1^5, hKi.1^9, hKi.1^8, hKi.1^18, hKi.1^19 ]>, <3, 14, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^7, hKi.1^23, 
hKi.1^3, hKi.1^25, hKi.1^24, hKi.1^24, hKi.1^25, hKi.1^12, hKi.1^4, hKi.1^11, hKi.1^20, hKi.1^4, hKi.1^12, hKi.1^6, hKi.1^5, hKi.1^18,
hKi.1^21 ]>>);

Append(~LoadIn, <5939, 3, 3, 1, 2, 5939, 2, 2, 2, 4, 2, 3, 1, 4, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <6899, 3, 3, 1, 2, 6899, 2, 2, 2, 4, 2, 3, 1, 3, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <6959, 3, 3, 1, 2, 6959, 2, 2, 2, 4, 2, 3, 1, 4, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <7523, 3, 3, 1, 2, 7523, 2, 2, 2, 4, 2, 3, 1, 4, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <7559, 3, 3, 1, 2, 7559, 2, 2, 2, 4, 2, 3, 1, 6, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <7583, 3, 3, 1, 2, 7583, 2, 3, 3, 20, 2, 3, 9, 6, "D_{7}", Polynomial(\[])>);
hKi := GF(3, 3);
Append(~LoadInRel, <<4, 1, [ GF(3, 3) | 0, 0, 0, hKi.1^8, hKi.1^14, hKi.1^11, 1, hKi.1^15, 0, hKi.1^9, hKi.1^25, hKi.1^19, hKi.1, 
hKi.1^8, hKi.1^9, hKi.1^14, hKi.1^15, hKi.1^8, hKi.1^6 ]>, <4, 2, [ GF(3, 3) | 0, 0, 0, hKi.1^5, hKi.1^24, hKi.1^24, hKi.1^19, 
hKi.1^18, hKi.1^2, hKi.1^18, hKi.1^17, hKi.1^7, hKi.1^18, 1, hKi.1^16, hKi.1^4, hKi.1, hKi.1^15, 2 ]>, <4, 3, [ GF(3, 3) | 0, 0, 0, 1,
hKi.1^5, hKi.1^24, hKi.1^25, hKi.1^11, hKi.1^14, 0, hKi.1^19, hKi.1^18, hKi.1^2, hKi.1^17, 2, hKi.1^16, hKi.1^14, hKi.1^12, hKi.1^23 
]>, <4, 4, [ GF(3, 3) | 0, 0, 0, hKi.1^19, hKi.1^10, hKi.1^4, hKi.1^11, hKi.1^3, hKi.1^3, 1, hKi.1^25, hKi.1^24, hKi.1^23, hKi.1^3, 
hKi.1, hKi.1^3, hKi.1^21, hKi.1^15, hKi.1^3 ]>>);

Append(~LoadIn, <8219, 3, 3, 1, 2, 8219, 2, 2, 2, 4, 2, 3, 1, 6, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <8447, 3, 3, 1, 2, 8447, 2, 5, 5, 20, 2, 3, 9, 3, "D_{11}", Polynomial(\[])>);
hKi := GF(3, 5);
Append(~LoadInRel, <<4, 1, [ GF(3, 5) | 0, 0, 0, hKi.1^105, hKi.1^237, hKi.1^124, hKi.1^62, hKi.1^87, hKi.1^179, 
hKi.1^113, hKi.1^18, hKi.1^29, hKi.1^181, hKi.1^71, hKi.1^198, hKi.1^180, hKi.1^146, hKi.1^71, hKi.1^82 ]>, <4, 2, [
GF(3, 5) | 0, 0, 0, hKi.1^240, hKi.1^86, hKi.1^241, hKi.1^61, hKi.1^238, hKi.1^85, hKi.1^161, hKi.1^169, hKi.1^2, 
hKi.1^73, hKi.1^227, hKi.1^124, hKi.1^43, hKi.1^20, hKi.1^51, hKi.1^175 ]>, <4, 3, [ GF(3, 5) | 0, 0, 0, hKi.1^146, 
hKi.1^49, hKi.1^189, hKi.1^172, hKi.1^133, hKi.1^92, hKi.1^144, hKi.1^56, hKi.1^118, hKi.1^152, hKi.1^177, hKi.1^46,
hKi.1^119, hKi.1^171, hKi.1^119, hKi.1^119 ]>, <4, 4, [ GF(3, 5) | 0, 0, 0, hKi.1^51, hKi.1^39, hKi.1^69, hKi.1^130,
hKi.1^40, hKi.1^26, hKi.1^93, hKi.1^212, hKi.1^168, hKi.1^79, hKi.1^207, hKi.1^97, hKi.1^155, hKi.1^52, hKi.1^221, 
hKi.1^68 ]>>);

Append(~LoadIn, <8699, 3, 3, 1, 2, 8699, 2, 2, 2, 6, 2, 3, 2, 9, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<2, 3, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1 ]>, <2, 4, [ GF(3, 2) | 0, 0, 0, hKi.1, 1 ]>, <2, 5,
[ GF(3, 2) | 0, 0, 0, hKi.1^2, 1 ]>, <2, 6, [ GF(3, 2) | 0, 0, 0, hKi.1, hKi.1^7 ]>>);

Append(~LoadIn, <9431, 3, 3, 1, 2, 9431, 2, 3, 3, 4, 2, 3, 1, 4, "D_{7}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <9743, 3, 3, 1, 2, 9743, 2, 2, 2, 8, 2, 3, 3, 3, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<2, 5, [ GF(3, 2) | 0, 0, 0, 0, hKi.1^3, hKi.1^5, hKi.1^5 ]>, <2, 6, [ GF(3, 2) | 0, 0, 0, 
hKi.1^6, hKi.1^5, hKi.1^3, hKi.1^7 ]>, <3, 1, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1^2, hKi.1, 1 ]>, <3, 2, [ GF(3, 2)
| 0, 0, 0, hKi.1^3, 2, 2, hKi.1^6 ]>>);

Append(~LoadIn, <9887, 3, 3, 1, 2, 9887, 2, 2, 2, 8, 2, 3, 3, 3, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<2, 5, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1, 2, 1 ]>, <2, 6, [ GF(3, 2) | 0, 0, 0, hKi.1^3, 
hKi.1^2, hKi.1^2, 2 ]>, <3, 1, [ GF(3, 2) | 0, 0, 0, hKi.1^7, hKi.1^5, hKi.1^2, hKi.1^6 ]>, <3, 2, [ GF(3, 2) | 0, 
0, 0, hKi.1^5, hKi.1^2, hKi.1^7, hKi.1^5 ]>>);

Append(~LoadIn, <10079, 3, 3, 1, 2, 10079, 2, 2, 2, 60, 2, 3, 29, 5, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<6, 5, [ GF(3, 2) | 0, 0, 0, 2, hKi.1^3, 1, 1, hKi.1^3, 2, hKi.1^5, hKi.1^7, 1, hKi.1^3, 
hKi.1^5, hKi.1^3, hKi.1^7, hKi.1^5, hKi.1^6, hKi.1, 0, 1, hKi.1^5, hKi.1^2, 0, hKi.1^2, 1, hKi.1^2, hKi.1^2, 0, 
hKi.1^3, hKi.1^6, 2, hKi.1^5, 1, hKi.1^5, hKi.1^5, hKi.1^6, hKi.1^5, hKi.1^5, hKi.1^7, hKi.1^2, hKi.1^7, hKi.1^5, 
hKi.1^2, 2, hKi.1^5, hKi.1^6, 2, hKi.1, hKi.1^2, hKi.1, 1, hKi.1^7, 1, hKi.1^3, hKi.1^3, 0, 1, 1 ]>, <6, 6, [ GF(3, 
2) | 0, 0, 0, 0, hKi.1, 0, 1, hKi.1, 0, hKi.1^6, 2, hKi.1^3, hKi.1^5, hKi.1^5, hKi.1, hKi.1^6, hKi.1^3, 0, hKi.1^2, 
2, 2, hKi.1^2, hKi.1^6, 1, hKi.1^5, 2, hKi.1^7, hKi.1, 1, 2, 1, hKi.1^7, hKi.1, hKi.1^5, 1, hKi.1^6, hKi.1, hKi.1^7,
hKi.1^2, hKi.1, hKi.1^6, 2, 0, 2, 2, hKi.1^7, hKi.1, hKi.1, 0, hKi.1^2, hKi.1^5, 2, hKi.1^5, hKi.1^5, hKi.1^2, 
hKi.1^6, hKi.1, hKi.1, hKi.1^5 ]>, <6, 7, [ GF(3, 2) | 0, 0, 0, hKi.1, hKi.1^2, hKi.1^5, hKi.1^7, hKi.1^2, hKi.1, 
hKi.1^2, 1, hKi.1^7, 0, hKi.1^2, hKi.1, hKi.1^5, hKi.1^5, hKi.1^5, hKi.1^7, 1, hKi.1^6, 0, hKi.1^2, hKi.1^7, 
hKi.1^5, hKi.1^2, 0, hKi.1^7, 1, hKi.1^3, hKi.1^6, hKi.1^6, hKi.1, hKi.1^2, 2, hKi.1^7, 0, hKi.1^7, hKi.1^6, 
hKi.1^5, 2, 0, hKi.1, 1, hKi.1^3, hKi.1^5, 1, hKi.1^7, 1, 0, 1, 1, 2, 0, 2, 2, hKi.1^3, 1, hKi.1^5 ]>, <6, 8, [ 
GF(3, 2) | 0, 0, 0, hKi.1^7, hKi.1^3, hKi.1^3, hKi.1, hKi.1^3, hKi.1^7, hKi.1^3, hKi.1^2, hKi.1^2, hKi.1^5, 2, 
hKi.1^5, hKi.1, 2, hKi.1, 0, 0, hKi.1^5, hKi.1^2, hKi.1^5, hKi.1^3, 0, 1, hKi.1^5, hKi.1^5, hKi.1^5, hKi.1^2, 
hKi.1^6, hKi.1^2, 0, 0, hKi.1^6, hKi.1^3, hKi.1, hKi.1, hKi.1^6, 0, 1, hKi.1^5, hKi.1^2, hKi.1^5, 1, 1, hKi.1^2, 
hKi.1^6, 0, hKi.1^6, hKi.1^6, 0, 1, hKi.1^7, hKi.1^3, hKi.1^2, hKi.1^2, hKi.1^2, 1 ]>, <6, 9, [ GF(3, 2) | 0, 0, 0, 
hKi.1^3, 2, hKi.1^7, hKi.1^5, 2, hKi.1^3, hKi.1^5, hKi.1, hKi.1, 1, hKi.1^5, hKi.1^3, 1, hKi.1^5, 0, 1, hKi.1^2, 
hKi.1, hKi.1^3, hKi.1^6, 1, hKi.1^2, 2, 2, 2, hKi.1^2, hKi.1^2, 1, hKi.1^6, hKi.1^5, 0, 2, 2, hKi.1^3, hKi.1^6, 
hKi.1^7, hKi.1^7, hKi.1^3, hKi.1^5, 0, hKi.1, hKi.1^5, 1, hKi.1^3, 1, hKi.1^5, hKi.1, 1, hKi.1^7, hKi.1^6, hKi.1^5, 
2, 1, 0, hKi.1^5, hKi.1^5 ]>>);

Append(~LoadIn, <10247, 3, 3, 1, 2, 10247, 2, 2, 2, 10, 2, 4, 3, 5, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<2, 6, [ GF(3, 2) | 0, 0, 0, 0, hKi.1^5, hKi.1^6, 0, hKi.1^7, hKi.1^5 ]>, <2, 7, [ GF(3, 2) | 0,
0, 0, 0, hKi.1^5, hKi.1^6, hKi.1^3, 1, hKi.1^3 ]>, <2, 8, [ GF(3, 2) | 0, 0, 0, 0, hKi.1^2, hKi.1^6, hKi.1^7, 
hKi.1^3, 1 ]>, <2, 9, [ GF(3, 2) | 0, 0, 0, 0, 1, hKi.1^3, 2, hKi.1^2, hKi.1^3 ]>, <2, 10, [ GF(3, 2) | 0, 0, 0, 0, 
hKi.1^3, hKi.1^3, hKi.1^7, hKi.1^3, hKi.1^3 ]>, <3, 1, [ GF(3, 2) | 0, 0, 0, 0, hKi.1^2, hKi.1^6, 0, hKi.1^3, 
hKi.1^5 ]>, <3, 2, [ GF(3, 2) | 0, 0, 0, 0, 0, 0, hKi.1^7, hKi.1^7, 0 ]>>);

Append(~LoadIn, <10847, 3, 3, 1, 2, 10847, 2, 3, 3, 22, 2, 4, 9, 9, "D_{7}", Polynomial(\[])>);
hKi := GF(3, 3);
Append(~LoadInRel, <<3, 8, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^2, hKi.1^20, hKi.1, 1, 1, hKi.1^18, hKi.1^19, hKi.1^14, 
hKi.1^7, hKi.1^17, hKi.1^12, hKi.1^9, hKi.1^5, hKi.1^5, hKi.1^10, hKi.1^18, hKi.1^19 ]>, <3, 9, [ GF(3, 3) | 0, 0, 
0, 0, hKi.1^22, hKi.1^6, hKi.1^20, hKi.1^23, hKi.1^8, hKi.1^4, hKi.1^9, hKi.1^5, hKi.1^22, hKi.1^5, hKi.1^23, 
hKi.1^6, hKi.1^18, hKi.1^3, hKi.1^8, hKi.1^12, hKi.1^11 ]>, <3, 10, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^4, hKi.1^18, 
hKi.1^25, 0, hKi.1^16, hKi.1^25, hKi.1^15, hKi.1^7, hKi.1^23, hKi.1^14, hKi.1^23, hKi.1^16, hKi.1^3, hKi.1^3, 
hKi.1^2, hKi.1^12, hKi.1^8 ]>, <3, 11, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^11, hKi.1^6, hKi.1^8, hKi.1, 0, hKi.1^3, 
hKi.1^3, hKi.1^10, hKi.1^24, hKi.1^20, hKi.1^12, hKi.1^9, hKi.1^14, hKi.1^9, hKi.1^2, hKi.1^4, 2 ]>, <3, 12, [ GF(3,
3) | 0, 0, 0, 0, hKi.1^4, 1, hKi.1^5, hKi.1^18, hKi.1^15, hKi.1^2, 0, hKi.1^12, hKi.1^10, hKi.1^24, hKi.1^20, 
hKi.1^22, hKi.1^7, hKi.1^12, hKi.1^9, hKi.1^6, hKi.1 ]>, <3, 13, [ GF(3, 3) | 0, 0, 0, 0, hKi.1^17, hKi.1^23, 2, 
hKi.1^25, 0, 1, 0, hKi.1^3, 2, 0, hKi.1^22, hKi.1^24, hKi.1^6, hKi.1^14, hKi.1^24, hKi.1^14, 2 ]>, <3, 14, [ GF(3, 
3) | 0, 0, 0, 0, hKi.1, hKi.1^18, hKi.1^20, 2, hKi.1^11, hKi.1^15, hKi.1^18, hKi.1^6, hKi.1^7, hKi.1^8, hKi.1^18, 
hKi.1^10, hKi.1^25, hKi.1^20, hKi.1^19, hKi.1^5, hKi.1^18 ]>>);

Append(~LoadIn, <12011, 3, 3, 1, 2, 12011, 2, 2, 2, 4, 2, 3, 1, 3, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <12119, 3, 3, 1, 2, 12119, 2, 2, 2, 56, 2, 3, 27, 8, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<6, 1, [ GF(3, 2) | 0, 0, 0, hKi.1^6, hKi.1^3, hKi.1, hKi.1^7, 1, hKi.1, hKi.1^2, 2, hKi.1^7, 
hKi.1^5, 1, hKi.1^3, 1, hKi.1^5, hKi.1^3, hKi.1, hKi.1^2, hKi.1^3, hKi.1^2, hKi.1^2, 2, hKi.1^2, 0, 1, 1, hKi.1^6, 
1, hKi.1^5, hKi.1, 2, 1, 0, hKi.1^5, 2, 1, hKi.1^5, hKi.1^6, hKi.1^5, hKi.1^5, 2, hKi.1^3, 1, hKi.1^6, hKi.1, 
hKi.1^2, 2, hKi.1, hKi.1^3, hKi.1, hKi.1^2, hKi.1^6, hKi.1^2 ]>, <6, 2, [ GF(3, 2) | 0, 0, 0, hKi.1, 0, hKi.1^6, 
hKi.1^2, hKi.1^5, hKi.1^3, hKi.1^2, hKi.1^2, hKi.1^6, hKi.1^3, 1, hKi.1^3, 1, hKi.1^6, 2, hKi.1^6, hKi.1^2, hKi.1^5,
1, 1, hKi.1, hKi.1^5, hKi.1^3, hKi.1, hKi.1^3, hKi.1^3, 2, 0, hKi.1^7, hKi.1^6, hKi.1^5, hKi.1^7, hKi.1^2, hKi.1^5, 
1, hKi.1^2, hKi.1^3, hKi.1^3, hKi.1^2, hKi.1, hKi.1, hKi.1^5, hKi.1^6, 2, hKi.1, 1, hKi.1^7, hKi.1^6, 2, 0, hKi.1^6,
hKi.1^7 ]>, <6, 3, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1^6, hKi.1^6, hKi.1^5, hKi.1^5, hKi.1, hKi.1, 2, 0, hKi.1^5, 
0, 0, hKi.1^2, hKi.1^5, 0, hKi.1^3, 1, hKi.1^5, hKi.1^6, 0, hKi.1^7, hKi.1^5, hKi.1^2, hKi.1, hKi.1^6, 0, hKi.1^6, 
1, 2, hKi.1^5, hKi.1, hKi.1^2, hKi.1^2, hKi.1^6, 2, 0, hKi.1^6, 0, hKi.1, hKi.1^2, hKi.1^7, hKi.1^5, 0, hKi.1^6, 
hKi.1^7, hKi.1^6, hKi.1^2, 2, hKi.1^7, 2, hKi.1^6, 1 ]>, <6, 4, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1^3, hKi.1^7, 
hKi.1^7, hKi.1^3, 0, hKi.1^2, hKi.1, hKi.1^5, 2, hKi.1^2, hKi.1^3, 0, 1, hKi.1^7, 0, hKi.1^7, 0, 1, hKi.1^7, 
hKi.1^2, hKi.1^2, hKi.1^7, hKi.1^6, 1, hKi.1, hKi.1^2, hKi.1, 0, 2, hKi.1^3, hKi.1^3, 1, 2, hKi.1^6, 0, 1, hKi.1^6, 
1, hKi.1^7, 0, hKi.1^7, 0, hKi.1^3, 0, hKi.1^5, hKi.1^3, hKi.1^5, hKi.1^3, hKi.1^5, hKi.1^6, hKi.1^5 ]>>);

Append(~LoadIn, <12263, 3, 3, 1, 2, 12263, 2, 2, 2, 8, 2, 3, 3, 3, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<2, 4, [ GF(3, 2) | 0, 0, 0, hKi.1^2, hKi.1, hKi.1^5 ]>, <2, 6, [ GF(3, 2) | 0, 0, 0, 2, 0, 2, 
hKi.1 ]>, <3, 1, [ GF(3, 2) | 0, 0, 0, hKi.1^3, hKi.1^2, hKi.1, 0 ]>, <3, 2, [ GF(3, 2) | 0, 0, 0, 2, hKi.1^7, 
hKi.1^7, hKi.1 ]>>);

Append(~LoadIn, <12959, 3, 3, 1, 2, 12959, 2, 5, 5, 20, 2, 3, 9, 4, "D_{11}", Polynomial(\[])>);
hKi := GF(3, 5);
Append(~LoadInRel, <<4, 1, [ GF(3, 5) | 0, 0, 0, hKi.1^43, hKi.1^218, hKi.1^110, hKi.1^53, hKi.1, hKi.1^104, hKi.1, 
hKi.1^210, hKi.1^112, hKi.1^178, hKi.1^9, hKi.1^165, hKi.1^215, hKi.1^238, hKi.1^103, hKi.1^216 ]>, <4, 2, [ GF(3, 
5) | 0, 0, 0, hKi.1^23, hKi.1^193, hKi.1^49, hKi.1^118, hKi.1^163, hKi.1^62, hKi.1^144, hKi.1^127, hKi.1^174, 
hKi.1^167, hKi.1^15, hKi.1^125, hKi.1^90, hKi.1^61, hKi.1^176, hKi.1^80 ]>, <4, 3, [ GF(3, 5) | 0, 0, 0, hKi.1^153, 
hKi.1^101, hKi.1^31, hKi.1^204, hKi.1^30, hKi.1^53, hKi.1^239, hKi.1^87, hKi.1^172, hKi.1^180, hKi.1^47, hKi.1^78, 
hKi.1^132, hKi.1^161, hKi.1^26, hKi.1^116 ]>, <4, 4, [ GF(3, 5) | 0, 0, 0, hKi.1^195, hKi.1^238, hKi.1^218, 
hKi.1^20, hKi.1^203, hKi.1^239, hKi.1^184, hKi.1, hKi.1^234, hKi.1^59, hKi.1^231, hKi.1^177, hKi.1^76, hKi.1^94, 
hKi.1^116, hKi.1^236 ]>>);

Append(~LoadIn, <13907, 3, 3, 1, 2, 13907, 2, 2, 2, 22, 2, 4, 9, 8, "D_{5}", Polynomial(\[])>);
hKi := GF(3, 2);
Append(~LoadInRel, <<3, 8, [ GF(3, 2) | 0, 0, 0, 0, hKi.1, hKi.1^5, hKi.1^2, hKi.1^2, hKi.1^6, hKi.1, hKi.1, 0, 
hKi.1^2, 2, hKi.1^5, hKi.1^2, 0, 0, 2, hKi.1, 0 ]>, <3, 9, [ GF(3, 2) | 0, 0, 0, 0, 1, hKi.1^2, 1, 0, hKi.1^3, 
hKi.1, hKi.1^3, hKi.1^2, 0, 0, hKi.1^5, 0, hKi.1^7, 1, hKi.1^7, hKi.1^3, 1 ]>, <3, 10, [ GF(3, 2) | 0, 0, 0, 0, 
hKi.1^3, hKi.1^7, 1, hKi.1, hKi.1^5, hKi.1^5, 2, hKi.1, hKi.1^6, 0, hKi.1^7, hKi.1^3, hKi.1^3, hKi.1^7, 2, hKi.1, 1 
]>, <3, 11, [ GF(3, 2) | 0, 0, 0, 0, 2, hKi.1^2, hKi.1^7, 2, hKi.1^5, hKi.1^5, 0, hKi.1^7, hKi.1^7, hKi.1^3, 
hKi.1^7, hKi.1^6, hKi.1^6, 0, hKi.1^2, 0, 0 ]>, <3, 12, [ GF(3, 2) | 0, 0, 0, 0, 2, hKi.1^3, hKi.1^5, hKi.1, 2, 
hKi.1^2, hKi.1^3, 2, 0, 0, hKi.1, hKi.1, hKi.1^5, hKi.1^7, 0, 0, hKi.1^2 ]>, <3, 13, [ GF(3, 2) | 0, 0, 0, 0, 0, 1, 
hKi.1^6, hKi.1^2, 0, hKi.1^2, hKi.1^6, hKi.1^5, 0, hKi.1^7, 1, hKi.1^6, 1, hKi.1^6, hKi.1^5, hKi.1^3, 0 ]>, <3, 14, 
[ GF(3, 2) | 0, 0, 0, 0, hKi.1^3, hKi.1^6, hKi.1^2, 2, 2, 1, hKi.1^6, 0, hKi.1^3, hKi.1^7, 0, hKi.1^2, 0, hKi.1^2, 
hKi.1^6, 0, 0 ]>>);

Append(~LoadIn, <14699, 3, 3, 1, 2, 14699, 2, 2, 2, 4, 2, 3, 1, 6, "D_{5}", Polynomial(\[])>);
Append(~LoadInRel, <>);

Append(~LoadIn, <14783, 3, 3, 1, 2, 14783, 2, 3, 3, 20, 2, 3, 9, 3, "D_{13}",
Polynomial(\[])>);
hKi := GF(3, 3);
Append(~LoadInRel, <<4, 1, [ GF(3, 3) | 0, 0, 0, hKi.1^2, hKi.1^3, hKi.1^7,
hKi.1^14, 0, 0, hKi.1^8, hKi.1^15, 2, hKi.1^14, hKi.1^11, hKi.1^17, hKi.1^7,
hKi.1, hKi.1^4, 0 ]>, <4, 2, [ GF(3, 3) | 0, 0, 0, hKi.1^2, hKi.1^3, hKi.1^10,
hKi.1^2, 0, hKi.1^12, hKi.1^15, hKi.1^2, hKi.1^22, hKi.1^19, hKi.1^19, hKi.1,
hKi.1^16, 1, 0, hKi.1^10 ]>, <4, 3, [ GF(3, 3) | 0, 0, 0, hKi.1^10, hKi.1^18,
hKi.1^18, hKi.1^10, hKi.1^12, hKi.1^17, hKi.1^22, hKi.1^24, hKi.1^22, hKi.1^19,
hKi.1^4, hKi.1^2, hKi.1^9, hKi.1^18, hKi.1^14, hKi.1^10 ]>, <4, 4, [ GF(3, 3) |
0, 0, 0, hKi.1^9, hKi.1^21, hKi.1, hKi.1^4, hKi.1^3, hKi.1^8, hKi.1^7, hKi.1^25,
hKi.1, hKi.1^24, hKi.1^9, 2, hKi.1^21, hKi.1, hKi.1^18, hKi.1^22 ]>>);

Append(~LoadIn, <14783, 3, 3, 1, 2, 14783, 2, 3, 3, 20, 2, 3, 9, 3, "D_{13}",
Polynomial(\[])>);
hKi := GF(3, 3);
Append(~LoadInRel, <<4, 1, [ GF(3, 3) | 0, 0, 0, hKi.1^12, hKi.1^14, hKi.1^4,
hKi.1^20, hKi.1^11, hKi.1^19, hKi.1^21, hKi.1^24, hKi.1^23, 1, hKi.1^14,
hKi.1^23, hKi.1^8, hKi.1^3, hKi.1^11, hKi.1^24 ]>, <4, 2, [ GF(3, 3) | 0, 0, 0,
hKi.1^8, hKi.1^12, 1, hKi.1, hKi.1^15, hKi.1^16, 0, hKi.1^21, hKi.1^3, hKi.1^8,
hKi.1^11, hKi.1^19, hKi.1^24, 0, hKi.1^12, hKi.1^21 ]>, <4, 3, [ GF(3, 3) | 0,
0, 0, hKi.1^11, hKi.1^10, hKi.1^4, hKi.1^23, hKi.1^25, hKi.1^15, hKi.1^4,
hKi.1^5, hKi.1^21, 2, hKi.1^23, hKi.1^4, hKi.1^7, hKi.1^4, 2, hKi.1^7 ]>, <4, 4,
[ GF(3, 3) | 0, 0, 0, hKi.1^10, hKi.1^21, hKi.1^22, hKi.1^6, hKi.1^2, hKi.1^23,
hKi.1^15, hKi.1^6, hKi.1^5, hKi.1^25, 0, hKi.1^19, hKi.1^19, hKi.1^11, 2,
hKi.1^2 ]>>);
