#	Algebra (L)	Fundamental group (H)	Generators of H (k)
1	\( 4 A_1 \)	\(Z_2^2\)	0 0 1 1 1 1 0 0
2	\( 2 A_2 \)	\(Z_1\)	0 0
3	\( 2 A_1+A_2 \)	\(Z_2\)	1 1 0
4	\( A_1+A_3 \)	\(Z_2\)	0 2
5	\( 2 C_2 \)	\(Z_1\)	0 0
6	\( A_2+C_2 \)	\(Z_1\)	0 0
7	\( A_1+C_3 \)	\(Z_1\)	0 0
8	\( 3 A_1+A_1^2 \)	\(Z_2\)	0 1 1 0
9	\( A_1+A_2+A_1^2 \)	\(Z_1\)	0 0 0
10	\( A_3+A_1^2 \)	\(Z_4\)	1 1
11	\( A_1+C_2+A_1^2 \)	\(Z_1\)	0 0 0
12	\( C_3+A_1^2 \)	\(Z_1\)	0 0
13	\( 2 A_1+2 A_1^2 \)	\(Z_2\)	0 0 1 1
14	\( 2 A_1+2 A_1^2 \)	\(Z_2\)	1 1 1 1
15	\( 2 A_1+2 A_1^2 \)	\(Z_2^2\)	0 0 1 1 1 1 0 0
16	\( A_2+2 A_1^2 \)	\(Z_2\)	0 1 1
17	\( A_1+A_2+A_1^4 \)	\(Z_1\)	0 0 0
18	\( A_1+C_2+A_1^4 \)	\(Z_1\)	0 0 0
19	\( C_3+A_1^4 \)	\(Z_1\)	0 0
20	\( 2 A_1+A_1^2+A_1^4 \)	\(Z_1\)	0 0 0 0
21	\( A_2+A_1^2+A_1^4 \)	\(Z_1\)	0 0 0
22	\( C_2+A_1^2+A_1^4 \)	\(Z_1\)	0 0 0
23	\( A_1+2 A_1^2+A_1^4 \)	\(Z_1\)	0 0 0 0
24	\( 2 A_1+2 A_1^4 \)	\(Z_1\)	0 0 0 0
25	\( A_2+2 A_1^4 \)	\(Z_1\)	0 0 0
26	\( C_2+2 A_1^4 \)	\(Z_1\)	0 0 0
27	\( A_1+A_1^2+2 A_1^4 \)	\(Z_1\)	0 0 0 0
28	\( A_1+A_1^2+2 A_1^4 \)	\(Z_2\)	1 1 1 1
29	\( 2 A_1^2+2 A_1^4 \)	\(Z_1\)	0 0 0 0