#############################################################################
##
#F                             CHEVIE library
##
#Y  Copyright 1992--1993,  Lehrstuhl D f"ur Mathematik,    RWTH Aachen,   and
#Y                         IWR   der   Universit"at    Heidelberg,   Germany.
##
# Ortho o.k. uep 11.2.92
#############################################################################
#                                                                           #
#   Die Greenfunktionen der O_10^+(q) in Charakteristik 2                   #
#                                                                           #
#############################################################################
##
#A {\sc }, 
#A 
##
lprint(`**************************************************************************`);
lprint(`*                                                                        *`);
lprint(`*                                                                        *`);
lprint(`*                    Green Functions of O_10^+(q)  in char 2             *`);
lprint(`*                                                                        *`);
lprint(`*                                                                        *`);
lprint(`**************************************************************************`);

# Tafel mit den Werten

`D5p2green` := array(-2..18, -1..20, [

 [`O_10^+(q)` ,`D5002green`,q^20*(q-1)^5*(q+1)^4*(q^2+1)^2*(q^2+q+1)*(q^2-q+1)
  *(q^4+1)*(q^4+q^3+q^2+q+1), 18, 18, 20, 20],

 [`classes`, ` `, `1^{10}`, `2_0^21^6`, `2_0^41^2`, `2^21^6`, `2^41^2`,
  `3^21^4`, `3^21^4`, `3^22_0^2`, `3^22^2`, `421^4`, `42^3`, `4_0^21^2`,
  `4^21^2`, `4^21^2`, `5^2`, `621^2`, `621^2`, `64`, `82`, `82` ],

 [`classlength`, 1 , 1, (q-1)*(q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^2-q+1)
*(q^4+1), q^2*(q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^
2-q+1)*(q^4+1), q^3*(q-1)^2*(q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^4+1), q
^3*(q-1)^3*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q
^4+1), 1/2*q^6*(q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*
(q^2-q+1)*(q^4+1), 1/2*q^6*(q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)*(q^4+q^3+
q^2+q+1)*(q^2-q+1)*(q^4+1), q^6*(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q
^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), q^7*(q-1)^4*(q+1)^3*(q^2+q+1)*(q^2
+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), q^9*(q-1)^3*(q+1)^2*(q^2+q
+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), q^9*(q-1)^4*(q+1)^3*(
q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), 1/2*q^10*(q-1)
^4*(q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), 1
/2*q^10*(q-1)^5*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+
1)*(q^4+1), q^10*(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1
)*(q^2-q+1)*(q^4+1), q^12*(q-1)^4*(q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^
3+q^2+q+1)*(q^2-q+1)*(q^4+1), 1/2*q^13*(q-1)^4*(q+1)^3*(q^2+q+1)*(q^2+1
)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), 1/2*q^13*(q-1)^4*(q+1)^3*(q^
2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), q^13*(q-1)^5*(q+
1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), 1/2*q^
15*(q-1)^5*(q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q
^4+1), 1/2*q^15*(q-1)^5*(q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q+1)
*(q^2-q+1)*(q^4+1)], 

 [`[[1,1,1,1,1],[]]`, (q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q
^2+q+1)*(q^2-q+1)*(q^4+1), (q+1)^4*(q^2+q+1)*(q^2+1)^2*(q^4+q^3+q^2+q
+1)*(q^2-q+1)*(q^4+1), (q+1)^3*(q^2+q+1)*(q^2+1)*(5*q^6+4*q^5+4*q^4+3*q
^3+2*q^2+q+1), (q+1)^2*(q^2+1)*(10*q^6+15*q^5+15*q^4+10*q^3+6*q^2+3*q+
1), (q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1)*(4*q^3+3*q^2+2*q+1), (q+1)^2*(5*
q^6+15*q^5+16*q^4+13*q^3+7*q^2+3*q+1), (q+1)^2*(25*q^5+26*q^4+18*q^3+7
*q^2+3*q+1), (q+1)^2*(q^2+1)*(5*q^3+6*q^2+3*q+1), (q+1)*(20*q^5+25*q^4+
20*q^3+10*q^2+4*q+1), (q+1)*(10*q^4+15*q^3+10*q^2+4*q+1), (q+1)^2*(q^2+1
)*(6*q^2+3*q+1), (q+1)*(5*q^3+10*q^2+4*q+1), 25*q^3+19*q^2+5*q+1, (q+1)*(5
*q^2+4*q+1), (q+1)*(20*q^3+15*q^2+4*q+1), 10*q^2+5*q+1, (q+1)*(4*q+1), (q+1
)*(4*q+1), 5*q+1, 1, 1], 

 [`[[2,1,1,1],[]]`, -(q-1)*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q^
2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q-1)*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q
^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q^2+q+1)*(3*q^7-q^6-q^4-q^3-q^2
-1)*(q^2+1)*(q+1)^2, -(q+1)*(q^2+1)*(4*q^7+q^6-2*q^5-5*q^4-4*q^3-3*q^2
-2*q-1), -(q^2+q+1)*(q^2-q+1)*(2*q^4-q^3-q^2-q-1)*(q^2+1)*(q+1)^2, -(q+1
)*(q^7+2*q^6-3*q^5-5*q^4-6*q^3-4*q^2-2*q-1), -(q+1)*(5*q^6-5*q^5-8*q^4
-9*q^3-4*q^2-2*q-1), -(q^3-2*q^2-q-1)*(q^2+1)*(q+1)^2, -2*q^6+9*q^4+10*
q^3+6*q^2+3*q+1+5*q^5, (3*q^2+q+1)*(q+1)^2, (q+1)*(q^2+1)*(3*q^2+2*q+1)
, 6*q^2+3*q+1+q^4+3*q^3, 9*q^2+3*q+1+5*q^3, (q+1)^3, (q+1)*(2*q^3+7*q^2
+2*q+1), 4*q^2+3*q+1, (q+1)*(2*q+1), (q+1)*(2*q+1), 3*q+1, 1, 1], 

 [ `[[2,2,1],[]]`, (
q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1
), (q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q
^4+1), (q-1)*(q+1)*(q^5-q^4-q^3-1)*(q^2+q+1)*(q^2+1)^2, (2*q^8-q^7-q^
6-q^5+q^4+q^3+q^2+q+1)*(q^2+1), -(q-1)*(q^2-q+1)*(q^2+q+1)*(q+1)^2*(q^
2+1)^2, (q+1)*(q^7-q^5+q^4+2*q^2+1), -(q-1)*(3*q^4+q^3+3*q^2+1)*(q+1)^
2, (q+1)*(q^4-q^3+q^2+1)*(q^2+1), (q+1)*(q^2+1)^2, (q+1)*(2*q^2+q+1)*(q
^2-q+1), -(q-1)*(q+1)*(2*q^2+q+1)*(q^2+1), q^4+2*q^2+1-q^3+q, -3*q^3+3*q
^2+1+q, (q+1)*(q^2+1), -q^3+3*q^2+q+1, 2*q^2+q+1, q+1, q+1, q+1, 1, 1], 

 [ `[[3,1,1],[]]`, (q-1)^2*(q+1)^4*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1
), (q-1)^2*(q+1)^4*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), (q-1
)*(2*q^7-q^6-q^4-q^3-q^2-1)*(q^2+1)*(q+1)^3, (q-1)*(q^5-2*q^4-2*q^3-q
^2-q-1)*(q^2+1)*(q+1)^2, (q-1)*(q^2-q+1)*(q^2+1)*(q^4-q^3-q^2-q-1)*(q+1
)^3, -(q-1)*(q^5+q^4+3*q^3+2*q^2+q+1)*(q+1)^2, (q^3-3*q^2+q-1)*(q^2-q-
1)*(q+1)^2, -(q-1)*(q^2+q+1)*(q^2+1)*(q+1)^2, -(q+1)*(q^5+2*q^4-2*q^3-q
^2-q-1), -(q+1)*(2*q^4-q^2-q-1), (q^2+1)*(q+1)^2, -(q+1)*(q^3-q^2-q-1), 
q^3+4*q^2+2*q+1, -(q+1)*(q^2-q-1), -(q+1)*(q^3-3*q^2-q-1), (q+1)^2, (q+1)
^2, (q+1)^2, 2*q+1, 1, 1], 

 [`[[3,2],[]]`, -(q-1)^3*(q+1)^3*(q^2+1)^2*(q^4+q
^3+q^2+q+1)*(q^2-q+1)*(q^4+1), -(q-1)^3*(q+1)^3*(q^2+1)^2*(q^4+q^3+q
^2+q+1)*(q^2-q+1)*(q^4+1), (q-1)^2*(q+1)^2*(q^2+1)*(q^4+q^3+q^2+q+1)*(
q^2-q+1), -(q-1)*(q+1)*(q^2+1)*(q^6-q^5+q^3+1), (q-1)^2*(q+1)^2*(q^2+1)
*(q^4+q^3+q^2+q+1)*(q^2-q+1), -(q-1)*(q+1)*(q^6+q^3+q^2+1), (q-1)*(q+1)*
(q^5-q^3-q^2-1), -(q-1)*(q+1)^2*(q^2+1)*(q^2-q+1), q^6-q^5+q^3+1, (q+1
)*(q^2-q+1), -(q-1)*(q+1)*(q^2+1), q^4+1, -(q-1)*(q^2+q+1), (q+1)*(q^2-q+1
), -(q-1)*(q+1)*(q^2+1), q^2+1, -(q-1)*(q+1), -(q-1)*(q+1), 1, 1, 1], 

 [`[[4,1],[]]`  
, -(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^
4+1), -(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q
^4+1), -(q^2+1)*(q^5-q^4-q^3-1)*(q^2+q+1)*(q-1)^2*(q+1)^2, (q-1)*(q+1)*
(q^7+q^6+q^5-q^4-q^3-q^2-q-1), (q^2+1)*(q^2-q+1)*(q^2+q+1)*(q-1)^2*(q
+1)^3, (q-1)*(q^5-q^2-1)*(q+1)^2, (q-1)*(q+1)^3*(q^3-2*q^2+q-1), (q-1)*(
q+1)*(q^3-q-1)*(q^2+1), -(q-1)*(q+1)^2*(q^2+1), -(q-1)*(q+1)*(q^2+q+1), -(
q-1)*(q+1)^2*(q^2+1), -(q-1)*(q+1)*(q^2+q+1), -q^3+q^2+q+1, -(q-1)*(q+1)^
2, -q^3+q^2+q+1, q+1, q+1, q+1, q+1, 1, 1], 

 [`[[5],[]]`, (q-1)^4*(q+1)^4*(q^
2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+1), (q-1)^4*(q+1)^4*(q^2+q+1)*(q^2+1)^
2*(q^2-q+1)*(q^4+1), -(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1), (q-1)
^2*(q+1)^2*(q^2+1), -(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1), (q-1)
^2*(q+1)^2*(q^2+1), (q-1)^2*(q+1)^2*(q^2+1), (q-1)^2*(q+1)^2*(q^2+1), 
-(q-1)*(q+1), -(q-1)*(q+1), (q-1)^2*(q+1)^2*(q^2+1), -(q-1)*(q+1), -(q-1)*(q
+1), -(q-1)*(q+1), -(q-1)*(q+1), 1, -(q-1)*(q+1), -(q-1)*(q+1), 1, 1, 1], 

 [`[[1,1,1],[1,1]]`
, (q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*
(q^4+1), (q-1)^2*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q
+1)*(q^4+1), (q-1)*(q+1)*(q^5-q^4-q^3-1)*(q^2+q+1)*(q^2+1)^2, -(q-1)*(q+
1)*(2*q^4+q^3+q^2+q+1)*(q^2+1)^2, (q+1)*(q^2-q+1)*(q^2+q+1)*(4*q^5-q^4
+1)*(q^2+1), (q+1)*(5*q^7+3*q^5+q^4+2*q^2+1), (q-1)*(q^6-7*q^5-4*q^4-7*
q^3-4*q^2-2*q-1), (q+1)*(q^2+1)*(5*q^4-q^3+q^2+1), -(q-1)*(4*q^3+3*q^2+
2*q+1)*(q^2+1), (q+1)*(2*q^2+q+1)*(q^2-q+1), (6*q^4+3*q^3+q^2+q+1)*(q^2+
1), 5*q^4+2*q^2+1+3*q^3+q, q^3+3*q^2+1+q, 5*q^3+q^2+1+q, -(q-1)*(q+1)*(4
*q^2+1+q), -(2*q+1)*(q-1), 4*q^2+1+q, 4*q^2+1+q, q+1, 1, 1], 

 [`[[1],[1,1,1,1]]`, (q-1
)^4*(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), (q-1)^4*
(q^2+q+1)*(q^2+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q^2+q+1)*(3
*q^6-2*q^5+2*q^4-q^3+2*q^2-q+1)*(q^2+1)*(q-1)^3, (2*q^4-q^3+q^2-q+1)*
(q-1)^2*(q^2+1)^2, (q^2+1)*(q^2+q+1)*(4*q^4-q^3+q^2-q+1)*(q^2-q+1)*(q-
1)^2, (q-1)*(5*q^7-10*q^6+9*q^5-11*q^4+6*q^3-4*q^2+2*q-1), -(7*q^5-6*q
^4+6*q^3-3*q^2+q-1)*(q-1)^2, -(11*q^5-8*q^4+4*q^3-5*q^2+3*q-1)*(q^2+1)
, (4*q^4-3*q^3+3*q^2-q+1)*(q-1)^2, -(q-1)*(6*q^4-3*q^3+4*q^2-2*q+1), (q-
1)*(2*q-1)*(3*q^2+1)*(q^2+1), (q-1)*(5*q^3-4*q^2+2*q-1), -7*q^3+3*q^2-3*q
+1, -11*q^3+9*q^2-3*q+1, (q-1)*(4*q^3-q^2+2*q-1), (q-1)*(2*q-1), 4*q^2-3*q
+1, 4*q^2-3*q+1, -3*q+1, 1, 1], 

 [ `[[2,1],[1,1]]`, -(q-1)^3*(q+1)*(q^2+q+1)*(q^2+1
)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q-1)^3*(q+1)*(q^2+q+1)*(q^2
+1)^2*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), (q^2+1)*(q^2+q+1)*(q^3+q^2
+1)*(q^4+1)*(q-1)^2, -(q-1)*(q^4+1)*(q^2+1)^2, -(q-1)*(q+1)*(q^2+q+1)*(q
^2-q+1)*(2*q^4-q^3+q^2-q+1)*(q^2+1), -(q^6-q^5-2*q^4+q^3-q^2+q-1)*(q
^2+1), (q+1)*(3*q^4-q^3+3*q^2+1)*(q-1)^2, -(q^5-4*q^4-q^2+q-1)*(q^2+1)
, -(q-1)*(2*q^5+q^4+2*q^2+1), -q^3+2*q^2-q+1+3*q^4, -(q-1)*(q^2+1)^2, (
q^2-q+1)*(q^2+1), q^2-q+1-3*q^3, 3*q^2-q+1+q^3, (2*q^2+q+1)*(q-1)^2, -q
+1, 2*q^2-q+1, 2*q^2-q+1, -q+1, 1, 1], 

 [`[[3],[1,1]]`, (q-1)^4*(q+1)^2*(q^2+1)
^2*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), (q-1)^4*(q+1)^2*(q^2+1)^2*(q
^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), -(q-1)^3*(q+1)*(q^2+1)*(2*q^7+q^6+q
^4+q^3+q^2+1), (q-1)^2*(q+1)*(q^2+1)^2*(q^3-q+1), (q-1)^2*(q+1)*(q^2+1
)*(q^2-q+1)*(q^5+2*q^4+1), -(q-1)*(q+1)*(q^6-2*q^5+4*q^4-3*q^3+3*q^2-2*
q+1), (q-1)^2*(q^5-q^3+q^2+1), -(q-1)*(q+1)*(q^2+1)*(q^3+2*q^2-2*q+1), -
(q-1)*(q^2+1)*(q^3-q+1), (q+1)*(q^2-q+1)*(2*q^2-2*q+1), (q-1)^2*(q^2+1), 
-(q-1)*(q^3+q^2-q+1), (q-1)*(q^2+q-1), -q^3+4*q^2-2*q+1, -(q-1)^3*(q+1), 
(q-1)^2, (q-1)^2, (q-1)^2, -2*q+1, 1, 1], 

 [`[[1,1],[2,1]]`, -(q-1)^3*(q+1)^3*(q^2+q+1)*(q^2+1)*(q^2-q+1)*
  (q^4+q^3+q^2+q+1)*(q^4+1), -(q-1)^3*(q+1)^3*
(q^2+q+1)*(q^2+1)*(q^2-q+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q^2+1)*(q^5-q
^4-q^3-1)*(q^2+q+1)*(q-1)^2*(q+1)^2, (2*q^4+q^3+q^2+q+1)*(q^2+1)*(q-1)
^2*(q+1)^2, -(q-1)*(q^2-q+1)*(2*q^5-q^4+1)*(q^2+q+1)*(q+1)^2, -(q-1)*(q
^5+q^2+1)*(q+1)^2, -(q-1)*(q+1)*(q^5-2*q^4+2*q^3+q^2+q+1), -(q-1)*(q+1)*
(q^5+2*q^4+q^2+q+1), (q-1)*(q+1)*(2*q^4-q^3-q^2-q-1), -(q-1)*(q+1)*(q^2+
q+1), (q^3+q^2-q+1)*(q+1)^2, (q^2-q+1)*(q+1)^2, (q+1)*(q^2+1), -q^2+1+q
^3+q, -(q-1)*(q+1)*(2*q^2+q+1), -(2*q+1)*(q-1), 2*q^2+q+1, 2*q^2+q+1, q+1, 
1, 1], 

 [`[[2],[2,1]]`, (q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(
q^2-q+1)*(q^4+1), (q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*
(q^2-q+1)*(q^4+1), -(q-1)^3*(q+1)*(q^2+q+1)*(q^4+1)*(q^3+q^2+1), (q-1)^
2*(q+1)*(q^2+1)*(q^4+1), (q-1)^2*(q+1)*(q^2+q+1)*(q^2-q+1)*(q^4+1), (q-1)
*(q^7-q^5-q^4-1), (q-1)^2*(q+1)*(q^4-q^3+q^2+1), (q-1)*(q+1)*(q^5-2*q^
4-q^2+q-1), -(q-1)*(q^4+1), -(q-1)*(2*q^4+q^3+1), -(q-1)*(q+1)*(2*q^4-q^3
+q^2-q+1), q^4+q^3-q+1, (q-1)^2*(q+1), q^3+q^2-q+1, (q-1)^2*(q+1), -q+1
, -q+1, -q+1, -q+1, 1, 1], 

 [`[[1],[3,1]]`, (q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)^2
*(q^4+q^3+q^2+q+1)*(q^4+1), (q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)^2*(q^4+
q^3+q^2+q+1)*(q^4+1), -(q+1)*(q^2+q+1)*(q^4+q^3+q^2+q+1)*(q^2+1)*(q-1)
^3, -(q+1)*(q^3-q-1)*(q-1)^2*(q^2+1)^2, (q^2+q+1)*(q^4-q^3+q^2-q+1)*(q
^2+1)*(q-1)^2*(q+1)^2, -(q-1)*(q+1)*(q^6-q^3+q^2+1), -(q^3-2*q^2-1)*(q-
1)^2*(q+1)^2, (q^5+2*q^4-q^3-q^2+1)*(q^2+1), (q+1)*(q^3+2*q^2+q+1)*(q-
1)^2, -(q-1)*(q^2+q+1), -(q-1)*(q+1)*(q^2+1), -(q-1)*(q+1)*(q^2+1), -(q-1)*
(q^2+q+1), (q+1)*(q^2-q+1), (q-1)*(q^3-q^2-q-1), -(q-1)*(q+1), q^2+1, q^2
+1, 1, 1, 1], 

 [`[[1],[2,2]]`, (q-1)^4*(q+1)^4*(q^2+q+1)*(q^2-q+1)*(q^4+q^3+q
^2+q+1)*(q^4+1), (q-1)^4*(q+1)^4*(q^2+q+1)*(q^2-q+1)*(q^4+q^3+q^2+q+1)
*(q^4+1), (q^5-q^4-q^3-1)*(q^2+q+1)*(q-1)^3*(q+1)^3, -(2*q^4+q^3+q^2+
q+1)*(q-1)^3*(q+1)^3, -(q^2+q+1)*(q^2-q+1)*(q-1)^3*(q+1)^4, (q-1)*(q^5+q
^2-1)*(q+1)^2, (q^3+q+1)*(q-1)^2*(q+1)^2, -(3*q^5-2*q^4+q^2+q-1)*(q+1)
^2, (q-1)^2*(q+1)^3, (q-1)*(q+1)*(2*q^3+q^2-q-1), -(q-1)*(2*q^3-q^2+1)*(
q+1)^2, (q-1)*(q+1)*(q^2-q-1), -q^2+1+q^3+q, -(q+1)*(3*q^2-1), -(q-1)*(q+1
)^2, -(2*q+1)*(q-1), q+1, q+1, q+1, 1, 1], 

 [`[[],[2,1,1,1]]`, -(q-1)^5*(q+1)*(q^2+q
+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), -(q-1)^5*(q+1)*(q^2+q+
1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^2-q+1)*(q^4+1), (q-1)^4*(q+1)*(q^2+q+1)
*(3*q^6-2*q^5+2*q^4-q^3+2*q^2-q+1), -(q-1)^3*(q+1)*(q^2+1)*(2*q^4-q^3+
q^2-q+1), -(q-1)^3*(q^2+q+1)*(q^2-q+1)*(2*q^5+3*q^4+1), -(q-1)^2*(q^6-q
^5-4*q^4+q^3-q^2+q-1), -(q-1)^4*(q^3-2*q^2-q-1), (q-1)*(q+1)*(7*q^5-6*q
^4+4*q^3-5*q^2+3*q-1), (q-1)^2*(2*q^4-q^3+q^2-q+1), -(q-1)*(q^3+2*q^2-
2*q+1), -(q-1)^2*(3*q^3-q^2+q-1), (q-1)^2*(q^2-q+1), (q-1)*(q^2+2*q-1), -
7*q^3+7*q^2-3*q+1, -(q-1)^2*(q+1)*(2*q-1), (q-1)*(2*q-1), (q-1)*(2*q-1), (q-
1)*(2*q-1), -3*q+1, 1, 1], 

 [`[[],[4,1]]`, -(q-1)^5*(q+1)^3*(q^2+q+1)*(q^2+1)^
2*(q^4+q^3+q^2+q+1)*(q^2-q+1), -(q-1)^5*(q+1)^3*(q^2+q+1)*(q^2+1)^2*(q
^4+q^3+q^2+q+1)*(q^2-q+1), (q-1)^4*(q+1)^2*(q^2+q+1)*(q^2+1)*(q^3+q^2
+1), -(q-1)^3*(q+1)^2*(q^2+1)^2, -(q-1)^3*(q+1)^2*(q^2+q+1)*(q^2+1)*(q
^2-q+1), (q-1)^2*(q+1)*(q^5+q^2+1), -(q-1)^3*(q+1)*(q^3+2*q^2+q+1), -(q-
1)*(q+1)*(q^2+1)*(q^3-q+1), (q-1)^2*(q+1)*(q^2+1), -(q-1)*(q+1)*(q^2-q+1)
, (q-1)^2*(q+1)*(q^2+1), -(q-1)*(q+1)*(q^2-q+1), (q-1)^2*(q+1), q^3+q^2-q
+1, (q-1)^2*(q+1), -q+1, -q+1, -q+1, -q+1, 1, 1], 

 [`[[],[3,2]]`, -(q-1)^5*(q+1)
^3*(q^2+q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^4+1), -(q-1)^5*(q+1)^3*(q^2
+q+1)*(q^2+1)*(q^4+q^3+q^2+q+1)*(q^4+1), (q-1)^4*(q+1)^2*(q^2+q+1)*(q^
4+q^3+q^2+q+1), (q-1)^3*(q+1)^2*(q^2+1)*(q^3-q-1), (q-1)^4*(q+1)^2*(q^
2+q+1)*(q^4+q^3+q^2+q+1), -(q-1)^2*(q+1)*(q^5+q^4+q^3-q-1), -(q-1)^3*(q
+1)^2*(q^2+q+1), (q-1)*(q+1)*(q^5+q^3+q^2-1), -(q-1)^2*(q+1)*(q^3-q-1), 
(q-1)*(2*q^3+q^2-q-1), (q-1)^2*(q+1)^2, (q-1)^2*(q+1)^2, (q-1)*(q^2-q-1)
, -(q+1)*(q^2+q-1), (q-1)^2*(q+1)^2, -(q-1)*(q+1), -(q-1)*(q+1), -(q-1)*(q+1
), 1, 1, 1]
]):

KlassentypOrdD5002green:=array(1..20,[1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1,1]):

NurPolynomD5002green:=true:

# 5) Informationen:
Information.`D5002green`:=TEXT(
`- Information about the Green functions of $O_10^+(2^n)$.`,
``,
`- CHEVIE-name of the table: ``D5p2green```,
``,
`- The table was published in:`,
`  {\\sc G. Malle}, Green functions for groups of types E_6 and F_4 in`,
`    characteristic 2, {\\em Comm. Algebra \\bf21} (1993), 747--798.`,
``,
`- The notation for the unipotent classes is taken from:`,
`  {\\sc N. Spaltenstein}, Classes unipotents et sous-groupes de Borel,`,
`    Springer Lecture Notes 946, Berlin  - Heidelberg - New York 1982.`,
``
):

g := `D5p2green`;
print(`g := ``D5p2green`` `);
