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# the graph in sage

I want define new graph in sage. Let G be finite group. The graph's vertices are subgroup and two vertices are adjacent if and only if sum of two subgroup is G.

I have trouble with define this graph in sage. Any suggestion? I have idea in gap but I don't have idea what can I change in sage?

Summands := function(G)

local n, i, sgl, l, A, B, D;

obtain a list of all subgroups

sgl := List(LatticeSubgroups(G)!.conjugacyClassesSubgroups, Representative);

n is the number of divisors of |G|

n := Size(DivisorsInt(Size(G)));

D := [];

if IsOddInt(n) then l := QuoInt(n + 1, 2);
else l := QuoInt(n, 2);
fi;

for i in [1..l] do
for A in Filtered(sgl, function(g) return Size(g) = DivisorsInt(Size(G))[i]; end) do
for B in Filtered(sgl, function(g) return Size(g) = DivisorsInt(Size(G))[n+1-i]; end) do
od;
od;
od;

return D;
end;
-

Here are Sage equivalents to some of these commands. Incidentally, we use GAP for the group calculations!

sage: D = DihedralGroup(5)
sage: D.subgroups()
[Permutation Group with generators [()], Permutation Group with generators [(2,5)(3,4)], Permutation Group with generators [(1,2)(3,5)], Permutation Group with generators [(1,3)(4,5)], Permutation Group with generators [(1,4)(2,3)], Permutation Group with generators [(1,5)(2,4)], Permutation Group with generators [(1,2,3,4,5)], Permutation Group with generators [(1,5,4,3,2), (1,5)(2,4)]]
sage: divisors(D.cardinality())
[1, 2, 5, 10]

To make graphs in Sage, you can pass dictionaries of lists or other things; see

sage: Graph?