Testing whether a subgraph is convex or isometric
Pith reviewed 2026-05-23 02:42 UTC · model grok-4.3
The pith
Isometric and convex subgraph tests cannot run in subquadratic time on sparse graphs.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The problems of testing whether a subgraph is isometric or geodesically convex cannot be solved in subquadratic time when the host graph is sparse, as established by conditional lower bounds, although the same problems admit subquadratic solutions on planar graphs and near-linear solutions on graphs of bounded treewidth or on plane graphs whose subgraph is delimited by few cycles.
What carries the argument
Conditional lower bounds obtained by reduction from all-pairs distance computation, which establish that quadratic time is necessary for the two decision problems on sparse graphs.
If this is right
- The two decision problems are at least as hard as all-pairs distance computation on sparse graphs.
- Planarity of the host graph permits a subquadratic algorithm for both decisions.
- Bounded treewidth of the host graph permits a near-linear algorithm for both decisions.
- When the host graph is plane and the subgraph is delimited by a constant number of cycles, both decisions can be made in near-linear time.
Where Pith is reading between the lines
- Similar quadratic barriers may exist for other distance-preservation properties of subgraphs.
- Implementations in network or map applications could exploit planarity or low treewidth to avoid the general quadratic cost.
- The reduction technique might extend to additional graph classes that possess exploitable structure.
Load-bearing premise
That all-pairs distances cannot be computed in subquadratic time on sparse graphs.
What would settle it
An algorithm that correctly decides both problems in O(n^{2-ε}) time for some constant ε>0 on every sparse graph with Θ(n) edges would refute the central negative claim.
read the original abstract
We consider the following two algorithmic problems: given a graph $G$ and a subgraph $H\subseteq G$, decide whether $H$ is an isometric or a geodesically convex subgraph of $G$. It is relatively easy to see that the problems can be solved by computing the distances between all pairs of vertices. We provide a conditional lower bound showing that, for sparse graphs with $n$ vertices and $\Theta(n)$ edges, we cannot expect to solve the problem in $O(n^{2-\varepsilon})$ time for any constant $\varepsilon>0$. We also show that the problem can be solved in subquadratic time for planar graphs and in near-linear time for graphs of bounded treewidth. Finally, we provide a near-linear time algorithm for the setting where $G$ is a plane graph and $H$ is defined by a few cycles in $G$.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper studies two problems: given G and subgraph H, decide if H is isometric (distance-preserving) or geodesically convex in G. Both are solvable via all-pairs shortest paths. The central results are a conditional lower bound that neither problem admits O(n^{2-ε}) time on sparse n-vertex graphs (under a standard fine-grained hypothesis), together with subquadratic algorithms on planar graphs, near-linear algorithms on bounded-treewidth graphs, and a near-linear algorithm when G is plane and H is delimited by a constant number of cycles.
Significance. The conditional lower bound, if the reduction is correct, shows that the all-pairs baseline is essentially optimal for general sparse graphs and thereby tightens our understanding of distance-based subgraph problems. The algorithmic results for planar graphs, bounded treewidth, and the special plane-graph case supply concrete improvements that are likely to be useful in practice.
minor comments (2)
- [Abstract] Abstract: the conditional lower bound is stated without naming the underlying hypothesis (e.g., APSP conjecture or SETH). While the full technical section presumably contains the explicit assumption and reduction, a single-sentence clarification in the abstract would improve readability.
- The manuscript should include a brief comparison table or paragraph contrasting the new running times with the all-pairs baseline and with prior work on related distance or convexity problems.
Simulated Author's Rebuttal
We thank the referee for their positive summary and recommendation of minor revision. No major comments were listed in the report.
Circularity Check
No significant circularity detected
full rationale
The paper presents standard algorithmic results for deciding isometric/convex subgraphs via all-pairs distances, plus conditional lower bounds under external fine-grained assumptions (e.g., APSP conjecture) and faster algorithms for planar/bounded-treewidth cases. No equations, predictions, or derivations are shown that reduce by construction to fitted inputs or self-citations. The lower-bound claim is a reduction from a known external hypothesis, not internally derived or self-referential. This is a normal non-circular outcome for a complexity paper.
Axiom & Free-Parameter Ledger
Reference graph
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