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Spiking Neural P System

Examples

Table cell details:

r:2a;2->1!;1 = rule applied: condition, transformation, delay, (! denotes a firing event)
c:0 = neuron charge after applying the rule
i:1(0) = incoming spikes: charge(source neuron)
c:2 = neuron charge after receiving the spikes

Compute numbers of form 3k + 2 using 3 neurons

Neurons and corresponding rules:

rule0 = [TransformationRule(div=1, mod=0, source=1, target=1, delay=2)]
pn0 = PNeuron(targets=[1], transf_rules=rule0)
pn0.charge = 2 * k - 1

rule1 = [TransformationRule(div=k, mod=0, source=k, target=1, delay=1)]
pn1 = PNeuron(targets=[2], transf_rules=rule1)
pn1.charge = 0

rule2 = [TransformationRule(div=1, mod=0, source=1, target=1, delay=0)]
pn2 = PNeuron(targets=[], transf_rules=rule2, output=True)
pn2.charge = 1

Generated table is for k = 3.

+---------+----------------------+----------------------+----------------------+
|  Step   |       Neuron 0       |       Neuron 1       |       Neuron 2       |
+=========+======================+======================+======================+
| initial | 3                    | 0                    | 1                    |
| charge  |                      |                      |                      |
+---------+----------------------+----------------------+----------------------+
| 0       | r:1a;1->1!;2         | r:-                  | r:1a;1->1!;0         |
|         | c:2                  | c:0                  | c:0                  |
+---------+----------------------+----------------------+----------------------+
| 1       | r:-                  | r:-                  | r:-                  |
|         | c:2                  | c:0                  | c:0                  |
+---------+----------------------+----------------------+----------------------+
| 2       | r:-                  | r:-                  | r:-                  |
|         | c:2                  | c:0                  | c:0                  |
|         |                      | i:1(0)               |                      |
|         |                      | c:1                  |                      |
+---------+----------------------+----------------------+----------------------+
| 3       | r:1a;1->1!;2         | r:-                  | r:-                  |
|         | c:1                  | c:1                  | c:0                  |
+---------+----------------------+----------------------+----------------------+
| 4       | r:-                  | r:-                  | r:-                  |
|         | c:1                  | c:1                  | c:0                  |
+---------+----------------------+----------------------+----------------------+
| 5       | r:-                  | r:-                  | r:-                  |
|         | c:1                  | c:1                  | c:0                  |
|         |                      | i:1(0)               |                      |
|         |                      | c:2                  |                      |
+---------+----------------------+----------------------+----------------------+
| 6       | r:1a;1->1!;2         | r:2a;2->1!;1         | r:-                  |
|         | c:0                  | c:0                  | c:0                  |
+---------+----------------------+----------------------+----------------------+
| 7       | r:-                  | r:-                  | r:-                  |
|         | c:0                  | c:0                  | c:0                  |
|         |                      |                      | i:1(1)               |
|         |                      |                      | c:1                  |
+---------+----------------------+----------------------+----------------------+
| 8       | r:-                  | r:-                  | r:1a;1->1!;0         |
|         | c:0                  | c:0                  | c:0                  |
|         |                      | i:1(0)               |                      |
|         |                      | c:1                  |                      |
+---------+----------------------+----------------------+----------------------+

Compute a finite { 1, 2, ...k } set using a one-neuron system

Neurons and corresponding rules:

rule0 = TransformationRule(div=1, mod=0, source=1, target=1, delay=i) for i in range(1, k)
rule1 = TransformationRule(div=2, mod=0, source=1, target=1, delay=0))
pn0 = PNeuron(targets=[], transf_rules=[rule0, rule1], output=True)
pn0.charge = 2

Generated table is for k = 10 with a system output of 6.

+---------+----------------------+
|  Step   |       Neuron 0       |
+=========+======================+
| initial | 2                    |
| charge  |                      |
+---------+----------------------+
| 0       | r:1a;1->1!;5         |
|         | c:1                  |
+---------+----------------------+
| 1       | r:-                  |
|         | c:1                  |
+---------+----------------------+
| 2       | r:-                  |
|         | c:1                  |
+---------+----------------------+
| 3       | r:-                  |
|         | c:1                  |
+---------+----------------------+
| 4       | r:-                  |
|         | c:1                  |
+---------+----------------------+
| 5       | r:-                  |
|         | c:1                  |
+---------+----------------------+
| 6       | r:1a;1->1!;3         |
|         | c:0                  |
+---------+----------------------+

References

  • Spiking neural P systems

    Ionescu, Mihai, Gheorghe Păun, and Takashi Yokomori. Fundamenta informaticae 71.2, 3 (2006): 279-308.