Output of /home/aschiem/Pgm/Hn/hn --invar -t --herm_lll2 0.0001 --shells-8 --herm_lll3 0.8

&K=Q(sqrt(-6))
&Hdim=2      V=K^2
&HNeighbourhood at <5,-2+w> contains 2 classes:
mass of the neighbourhood is 1/2
  Steinitz class <2,w>:
&Hlattice (#1 <- #2)
     <1>    <2,w> 
       3 
  1+1/2w        1 
  |Aut| = 2^2
  #short vectors:
    0    2    8    6    8   14    8    6


&Hlattice (#2 <- #1)
     <1>    <2,w> 
       1 
       0      1/2 
  |Aut| = 2^2
  #short vectors:
    2    2    6    6    4   14    8    6



&Adjacence matrix (M_ij=#{neighbours of class i isometric to class j}):
  2   4 
  4   2 


classes of Z-lattices with respect to the trace form (scaled by 1/2)
one representative of each class
&Dim=4      V=Q^4

&Genus of the trace-forms:
det= 36 = 2^2 *3^2
   2-adic symbol:  [1^2 2^2]_4 
   3-adic symbol:  1^-2 3^-2 
  -1-adic symbol:  +^4 -^0 
level(of 2-scaled form)=24, weight=2
a_0,..,a_8 determine modular form

&Gram (#1 <- H1)
  2 
  1   3 
  1   0   3 
  0   1   1   4 
  |Aut| = 2^4
  #short vectors:
    0    2    8    6    8   14    8    6

&Gram (#2 <- H2)
  1 
  0   2 
  0   0   3 
  0   0   0   6 
  |Aut| = 2^4
  #short vectors:
    2    2    6    6    4   14    8    6

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