From: Identifying the pulsed neuron networks’ structures by a nonlinear Granger causality method
Notation relation | Notation relation | Notation relation | Notation relation |
---|---|---|---|
1 (1 \(\to 2\)/3,4,5,6) | 2 (1 \(\to 3\)/2,4,5,6) | 3 (1 \(\to 4\)/2,3,5,6) | 4 (1 \(\to 5\)/2,3,4,6) |
5 (1 \(\to 6\)/2,3,4,5) | 6 (2 \(\to 1\)/3,4,5,6) | 7 (2 \(\to 3\)/1,4,5,6) | 8 (2 \(\to 4\)/1,3,5,6) |
9 (2 \(\to 5\)/1,3,4,6) | 10 (2 \(\to 6\)/1,3,4,5) | 11 (3 \(\to 1\)/2,4,5,6) | 12 (3 \(\to 2\)/1,4,5,6) |
13 (3 \(\to 4\)/1,2,5,6) | 14 (3 \(\to 5\)/1,2,4,6) | 15 (3 \(\to 6\)/1,2,4,5) | 16 (4 \(\to 1\)/2,3,5,6) |
17 (4 \(\to 2\)/1,3,5,6) | 18 (4 \(\to 3\)/1,2,5,6) | 19 (4 \(\to 5\)/1,2,3,6) | 20 (4 \(\to 6\)/1,2,3,5) |
21 (5 \(\to 1\)/2,3,4,6) | 22 (5 \(\to 2\)/1,3,4,6) | 23 (5 \(\to 3\)/1,2,4,6) | 24 (5 \(\to 4\)/1,2,3,6) |
25 (5 \(\to 6\)/1,2,3,4) | 26 (6 \(\to 1\)/2,3,4,5) | 27 (6 \(\to 2\)/1,3,4,5) | 28 (6 \(\to 3\)/1,2,4,5) |
29 (6 \(\to 4\)/1,2,3,5) | 30 (6 \(\to 5\)/1,2,3,4) |