Vector addition system explained

A vector addition system (VAS) is one of several mathematical modeling languages for the description of distributed systems. Vector addition systems were introduced by Richard M. Karp and Raymond E. Miller in 1969,[1] and generalized to vector addition systems with states (VASS) by John E. Hopcroft and Jean-Jacques Pansiot in 1979.[2] Both VAS and VASS are equivalent in many ways to Petri nets introduced earlier by Carl Adam Petri. Reachability in vector addition systems is Ackermann-complete (and hence nonelementary).[3] [4]

Informal definition

A vector addition system consists of a finite set of integer vectors. An initial vector is seen as the initial values of multiple counters, and the vectors of the VAS are seen as updates. These counters may never drop below zero. More precisely, given an initial vector with non negative values, the vectors of the VAS can be added componentwise, given that every intermediate vector has non negative values. A vector addition system with states is a VAS equipped with control states. More precisely, it is a finite directed graph with arcs labelled by integer vectors. VASS have the same restriction that the counter values should never drop below zero.

Formal definitions and basic terminology

V\subseteqZd

for some

d\geq1

.

(Q,T)

such that

T\subseteqQ x Zd x Q

for some

d>0

.

Transitions

V\subseteqZd

be a VAS. Given a vector

u\inNd

, the vector

u+v

can be reached, in one transition, if

v\inV

and

u+v\inNd

.

(Q,T)

be a VASS. Given a configuration

(p,u)\inQ x Nd

, the configuration

(q,u+v)

can be reached, in one transition, if

(p,v,q)\inT

and

u+v\inNd

.

See also

Notes and References

  1. Karp. Richard M.. Miller. Raymond E.. Parallel program schemata. Journal of Computer and System Sciences. May 1969. 3. 2. 147–195. 10.1016/S0022-0000(69)80011-5. free.
  2. Hopcroft. John E.. Pansiot. Jean-Jacques. On the reachability problem for 5-dimensional vector addition systems. Theoretical Computer Science. 1979. 8. 2. 135–159. 10.1016/0304-3975(79)90041-0. 1813/6102. free.
  3. Czerwiński . Wojciech . Orlikowski . Łukasz . Reachability in Vector Addition Systems is Ackermann-complete . 2021 . 2021 IEEE 62nd Annual Symposium on Foundations of Computer Science (FOCS) . 2104.13866.
  4. Leroux . Jérôme . The Reachability Problem for Petri Nets is Not Primitive Recursive . 2021 . 2021 IEEE 62nd Annual Symposium on Foundations of Computer Science (FOCS) . 2104.12695.