This is a JavaScript, D3.js powered simulator for the π-calculus, a process algebra modelling concurrency and mobility.
I am releasing it for didactic purposes.
Stargazer by Emanuele D'Osualdo is licensed under a Creative Commons Attribution-ShareAlike 4.0 International License.
I would appreciate if you contacted me before using the simulator in presentations/other material. Note that the current version is experimental and distributed as is. A new, open-sourced version will be released at some point.
You can use the syntax of π-calculus with the ascii notation:
- Actions
α.P
- Output:
x<y1,...,yn>.P
- Input:
x(y1,...,yn).P
- Internal:
tau.P
- Output:
- The inactive process:
0
orzero
(it can be omitted after an action:α.zero
can be abbreviatedα
) - Parallel:
P | Q
- Guarded Sum (
M
):α1.P1 + … + αn.Pn
- Process call:
P[y1,...,yn]
- Restriction:
new y1,...,yn.P
- Process definition:
P[y1,...,yn] := M
Parentheses can be used to group actions, for example: x(y).x(z) + x<a>
is different from x(y).(x(z) + x<a>)
.
Your program should have the form
INIT
DEFS
Where INIT
is a process and DEFS
is a sequence of definitions.
You should write normalised programs: the initial term should not contain sums and only the top-level of each definition should be a sum. For example:
new x,y.(A[x] | B[x,y])
A[x] := x(u).new z.(A[u] | B[u,x] | C[z,u])
B[x,y] := x<y>
is normalised, but
new x,y.(A[x] | x<y>)
A[x] := new z.x(u).(A[u] | u<x>| C[z,u])
is not since the initial term contains a sum x<y>
, and so does the continuation in the definition of A[x]
. Moreover the definition of A[x]
contains a restriction at top level which is not allowed: if you need it there, move it outside in the call of A[x]
, otherwise consider if you meant to use it under a prefix.
Process calls A[x]
where A
is not defined, will be treated as if the definition was A[x] := 0
.
Another important restriction: the free names of the body of a definition have to be bound by the definition's head! This means that the definition A[x] := x(y).(z<y> | A[y])
is not valid because z
occurs free in the body but is not in the argument list. To fix the definition you have to include it as in A[x,z] := x(y).(z<y> | A[y,z])
.
You can find an example suite of π-calculus programs at http://gist.github.com/bordaigorl/6e54093b297c0f9df01d0c82f65b89f6
Any Gist can be loaded in Stargazer by using the gist
parameter. For example, to try the above Gist you can go to
http://stargazer.emanueledosualdo.com?gist=6e54093b297c0f9df01d0c82f65b89f6
You can create your own Gist and open it in the same way.
A Gist can contain any number of programs (with extension .pi
), each accompanied by an optional JSON configuration file with the same name but extension .json
.