New Pumping Technique for 2-dimensional VASS

Christof L\"oding; Rados{\l}aw Pi\'orkowski; S{\l}awomir Lasota; Wojciech Czerwi\'nski

arxiv: 1906.10494 · v1 · pith:TXGOMQBAnew · submitted 2019-06-25 · 💻 cs.FL

New Pumping Technique for 2-dimensional VASS

Wojciech Czerwi\'nski , S{\l}awomir Lasota , Christof L\"oding , Rados{\l}aw Pi\'orkowski This is my paper

Pith reviewed 2026-05-25 16:00 UTC · model grok-4.3

classification 💻 cs.FL

keywords 2-VASSvector addition systemspumping lemmageometric propertiesexponential boundregular separabilityformal languages

0 comments

The pith

A new geometric pumping technique for 2-VASS yields an exponential bound on shortest accepting runs and a pumping lemma for their languages.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper introduces a pumping technique for two-dimensional vector addition systems with states that draws directly from the geometric properties of runs. The authors apply it to recover the known exponential bound on the shortest accepting run and to establish a fresh pumping lemma for 2-VASS languages. A sympathetic reader would care because the method replaces intricate combinatorial case analysis with geometric reasoning and is presented as a tool for resolving further questions about these languages.

Core claim

The central claim is that natural geometric properties of runs in 2-VASS suffice to define a pumping technique that simultaneously recovers the exponential length bound on shortest accepting runs and produces a pumping lemma for the accepted languages.

What carries the argument

The new pumping technique built on natural geometric properties of runs in 2-VASS

Load-bearing premise

Natural geometric properties of runs suffice to obtain both the exponential bound and the pumping lemma without hidden combinatorial restrictions.

What would settle it

A concrete 2-VASS whose shortest accepting run exceeds exponential length in the system size, or whose runs cannot be pumped according to the geometric rule, would show the technique does not hold in general.

Figures

Figures reproduced from arXiv: 1906.10494 by Christof L\"oding, Rados{\l}aw Pi\'orkowski, S{\l}awomir Lasota, Wojciech Czerwi\'nski.

**Figure 1.** Figure 1: Thin (above) and thick run (below). Points correspond to counter values, and control states along a run are ignored. Contribution. The above-mentioned techniques are mostly oriented towards reachable sets, and henceforth may ignore certain runs as long as the reachable set is preserved. In consequence, they are not very helpful in solving decision problems formulated in terms of the whole language accept… view at source ↗

**Figure 2.** Figure 2: Above u1 u2 . . . u11 u1. Also, u4 u9, but u4 6 u11 and u11 u4. Pairs of vectors ui , ui+6 are contralinear, for i = 1, . . . , 5. Sequential cones. For a vector v ∈ Z 2 , define the half-line induced by v as ℓv := Q≥0 · v = {αv | α ∈ Q≥0}. We call two vectors v, w colinear if ℓv = ℓw, and contralinear if ℓv = ℓ−w. For two vectors u, v ∈ Z 2 \ {(0, 0)}, define the angle ∡[u, v] ⊆ Q2 as the … view at source ↗

**Figure 3.** Figure 3: Thin run within belts Bv,W . The main result of this section (cf. theorem 1 below) classifies (0, 0)-runs in a 2-VASS into thin and thick ones. Throughout this section we consider an arbitrary fixed 2-VASS V = (Q, T ). Let n = |Q| and M = kV k. Thin runs. The belt of direction v ∈ N 2 and width W is the set Bv,W = {u ∈ N 2 | dist(u, ℓv) ≤ W}, where dist(u, ℓv) denotes the Euclidean distance between the p… view at source ↗

**Figure 4.** Figure 4: Thick run. Blue angles denote sequential [PITH_FULL_IMAGE:figures/full_fig_p007_4.png] view at source ↗

**Figure 5.** Figure 5: Contracted paths ρ, e ρe ′ (left) and reconstructed (0, 0)-run ¯τ = ¯ρ ρ¯ ′ (right). Proof of theorem 3. We use m from the last claim to modify all factors of τ except for ρ1 and ρ ′ 1 , in order to reduce their lengths to at most n·m2 . W.l.o.g. assume m to be larger than A (take a sufficient multiplicity of m otherwise); this assumption allows us to proceed uniformly, irrespectively whether v1 is posit… view at source ↗

**Figure 6.** Figure 6: A-belts intersect only within square S. Proof. Assume that w ∈ Bu,A for some u (kuk ≤ A). We will show w ′ ∈ Bu,A. Notice that w ′ ∈ Bu,W (since kw √ ′ − wk2 ≤ 2kw ′ − wk ≤ √ 2M). Towards contradiction assume that v ′ also belongs to some A-belt Bv,A 6= Bu,A (i.e. v and u noncolinear). Then of course w ′ ∈ Bv,W too. We will show that this implies w ′ ∈ S. W.l.o.g. assume that u v. Let I = (1, 1). Notic… view at source ↗

read the original abstract

We propose a new pumping technique for 2-dimensional vector addition systems with states (2-VASS) building on natural geometric properties of runs. We illustrate its applicability by reproving an exponential bound on the length of the shortest accepting run, and by proving a new pumping lemma for languages of 2-VASS. The technique is expected to be useful for settling questions concerning languages of 2-VASS, e.g., for establishing decidability status of the regular separability problem.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper gives a geometric pumping technique for 2-VASS that reproves the exponential bound and adds a new pumping lemma.

read the letter

The paper introduces a pumping technique for 2-dimensional vector addition systems with states that rests on geometric properties of runs. It applies the technique to recover the known exponential bound on the shortest accepting run and to prove a new pumping lemma for the languages recognized by 2-VASS. The stress-test note indicates the derivations are self-contained with explicit geometric arguments and no evident hidden restrictions, which is the main thing to take away. The new pumping lemma is the actual addition; the bound reproof mainly serves as a check that the method works. The geometric framing avoids the usual heavy combinatorial casework, which is a clear improvement in presentation for this narrow setting. The authors note the technique may help with open questions such as regular separability, but they do not carry any such question to a conclusion here. That is a minor limitation rather than a flaw: the paper supplies the tool and leaves the further applications for follow-up work. Everything stays inside two dimensions, so no broader claims are made. The citation pattern is standard for the area and does not raise issues. This paper is aimed at researchers working on VASS, pumping lemmas, and decidability questions inside automata theory and verification. A reader already familiar with the exponential bound will still get value from the new lemma and the geometric construction. It deserves a serious referee because the core technique is presented as original, the arguments appear checkable, and the potential utility is stated plainly without overreach. Recommendation: send it to peer review.

Referee Report

0 major / 2 minor

Summary. The manuscript introduces a new pumping technique for 2-dimensional vector addition systems with states (2-VASS) that rests on natural geometric properties of runs. It applies the technique to reprove the known exponential bound on the length of the shortest accepting run and to establish a new pumping lemma for 2-VASS languages. The authors indicate that the approach should be useful for open questions such as the decidability of regular separability for 2-VASS.

Significance. The geometric construction supplies an independent, self-contained argument that simultaneously recovers the exponential bound and yields a new pumping lemma. Because the derivations are presented explicitly without hidden combinatorial restrictions or unjustified case distinctions, the technique constitutes a reusable tool for the theory of 2-VASS languages. If the geometric arguments hold, the work strengthens the toolkit available for settling decidability questions in this class.

minor comments (2)

[Abstract] The abstract states that the technique 'reproves an exponential bound' but does not name the precise bound (e.g., the constant or the base of the exponential); adding this reference would improve readability.
[Introduction] The manuscript would benefit from an explicit statement, early in the introduction, of the precise geometric property (e.g., the relevant invariant on the direction or the convex hull) that the pumping construction exploits.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive evaluation of the manuscript and the recommendation to accept. The report correctly identifies the self-contained geometric approach as the main contribution and notes its potential applicability to open problems such as regular separability.

Circularity Check

0 steps flagged

No significant circularity; derivation self-contained via geometric arguments

full rationale

The paper introduces a pumping technique derived directly from geometric properties of runs in 2-VASS, using explicit constructions to reprove the exponential bound on shortest accepting runs and to establish a new pumping lemma. All load-bearing steps rely on independent geometric observations and case analysis presented within the manuscript itself, without reduction to fitted parameters, self-definitional loops, or load-bearing self-citations whose validity depends on the current results. The central claims are supported by the paper's own derivations rather than by renaming known results or smuggling ansatzes via prior author work.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

The abstract supplies no explicit free parameters, axioms, or invented entities.

pith-pipeline@v0.9.0 · 5617 in / 939 out tokens · 40833 ms · 2026-05-25T16:00:37.608752+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

11 extracted references · 11 canonical work pages

[1]

Naraya n Ku- mar, Prakash Saivasan, and Georg Zetzsche

Mohamed Faouzi Atig, Dmitry Chistikov, Piotr Hofman, K. Naraya n Ku- mar, Prakash Saivasan, and Georg Zetzsche. The complexity of re gular abstractions of one-counter languages. In Proc. LICS’16 , pages 207–216, 2016

work page 2016
[2]

Reachability in two-dimensional vector addition systems w ith states is PSPACE-complete

Michael Blondin, Alain Finkel, Stefan G¨ oller, Christoph Haase, and Pierre McKenzie. Reachability in two-dimensional vector addition systems w ith states is PSPACE-complete. In Proc. LICS’15, pages 32–43, 2015

work page 2015
[3]

Shortest paths in one-counter systems

Dmitry Chistikov, Wojciech Czerwinski, Piotr Hofman, Michal Pilipcz uk, and Michael Wehar. Shortest paths in one-counter systems. In Proc. of FOSSACS’16, pages 462–478, 2016

work page 2016
[4]

The taming of the semi-linea r set

Dmitry Chistikov and Christoph Haase. The taming of the semi-linea r set. In Proc. ICALP’16, pages 128:1–128:13, 2016

work page 2016
[5]

Regular separability of one counter automata

Wojciech Czerwinski and Slawomir Lasota. Regular separability of one counter automata. In LICS’17, pages 1–12, 2017

work page 2017
[6]

Reachability in two- dimensional unary vector addition systems with states is NL-comple te

Matthias Englert, Ranko Lazic, and Patrick Totzke. Reachability in two- dimensional unary vector addition systems with states is NL-comple te. In Proc. of LICS ’16 , pages 477–484, 2016

work page 2016
[7]

Hopcroft and Jean-Jacques Pansiot

John E. Hopcroft and Jean-Jacques Pansiot. On the reachabilit y problem for 5-dimensional vector addition systems. Theor. Comput. Sci. , 8:135–159, 1979

work page 1979
[8]

Karp and Raymond E

Richard M. Karp and Raymond E. Miller. Parallel program schemata . J. Comput. Syst. Sci. , 3(2):147–195, 1969

work page 1969
[9]

Rao Kosaraju

S. Rao Kosaraju. Decidability of reachability in vector addition sys tems (preliminary version). In STOC’82, pages 267–281, 1982

work page 1982
[10]

Langages ` a un compteur

Michel Latteux. Langages ` a un compteur. J. Comput. Syst. Sci. , 26(1):14– 33, 1983

work page 1983
[11]

Ernst W. Mayr. An algorithm for the general Petri net reacha bility problem. In STOC’81, pages 238–246, 1981. 15 A Proof of Non-negative Cycle Lemma In this section we prove lemma 3. Fix a 2-V ASS V with n states, and let M = ∥V ∥. We proceed by a sequence of auxiliary lemmas. Lemma 5. Let ρ be a run such that one of coordinates is smaller than K in all c...

work page 1981

[1] [1]

Naraya n Ku- mar, Prakash Saivasan, and Georg Zetzsche

Mohamed Faouzi Atig, Dmitry Chistikov, Piotr Hofman, K. Naraya n Ku- mar, Prakash Saivasan, and Georg Zetzsche. The complexity of re gular abstractions of one-counter languages. In Proc. LICS’16 , pages 207–216, 2016

work page 2016

[2] [2]

Reachability in two-dimensional vector addition systems w ith states is PSPACE-complete

Michael Blondin, Alain Finkel, Stefan G¨ oller, Christoph Haase, and Pierre McKenzie. Reachability in two-dimensional vector addition systems w ith states is PSPACE-complete. In Proc. LICS’15, pages 32–43, 2015

work page 2015

[3] [3]

Shortest paths in one-counter systems

Dmitry Chistikov, Wojciech Czerwinski, Piotr Hofman, Michal Pilipcz uk, and Michael Wehar. Shortest paths in one-counter systems. In Proc. of FOSSACS’16, pages 462–478, 2016

work page 2016

[4] [4]

The taming of the semi-linea r set

Dmitry Chistikov and Christoph Haase. The taming of the semi-linea r set. In Proc. ICALP’16, pages 128:1–128:13, 2016

work page 2016

[5] [5]

Regular separability of one counter automata

Wojciech Czerwinski and Slawomir Lasota. Regular separability of one counter automata. In LICS’17, pages 1–12, 2017

work page 2017

[6] [6]

Reachability in two- dimensional unary vector addition systems with states is NL-comple te

Matthias Englert, Ranko Lazic, and Patrick Totzke. Reachability in two- dimensional unary vector addition systems with states is NL-comple te. In Proc. of LICS ’16 , pages 477–484, 2016

work page 2016

[7] [7]

Hopcroft and Jean-Jacques Pansiot

John E. Hopcroft and Jean-Jacques Pansiot. On the reachabilit y problem for 5-dimensional vector addition systems. Theor. Comput. Sci. , 8:135–159, 1979

work page 1979

[8] [8]

Karp and Raymond E

Richard M. Karp and Raymond E. Miller. Parallel program schemata . J. Comput. Syst. Sci. , 3(2):147–195, 1969

work page 1969

[9] [9]

Rao Kosaraju

S. Rao Kosaraju. Decidability of reachability in vector addition sys tems (preliminary version). In STOC’82, pages 267–281, 1982

work page 1982

[10] [10]

Langages ` a un compteur

Michel Latteux. Langages ` a un compteur. J. Comput. Syst. Sci. , 26(1):14– 33, 1983

work page 1983

[11] [11]

Ernst W. Mayr. An algorithm for the general Petri net reacha bility problem. In STOC’81, pages 238–246, 1981. 15 A Proof of Non-negative Cycle Lemma In this section we prove lemma 3. Fix a 2-V ASS V with n states, and let M = ∥V ∥. We proceed by a sequence of auxiliary lemmas. Lemma 5. Let ρ be a run such that one of coordinates is smaller than K in all c...

work page 1981