Separating modules of support-degree k equate to O(k)-subgraph counts, those of symmetric circuit size n^Θ(k) equate to Θ(k)-WL, and their multiplicities equate to differing automorphism cycle indices.
On Symmetric Circuits and Fixed-Point Logics
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abstract
We study properties of relational structures such as graphs that are decided by families of Boolean circuits. Circuits that decide such properties are necessarily invariant to permutations of the elements of the input structures. We focus on families of circuits that are symmetric, i.e., circuits whose invariance is witnessed by automorphisms of the circuit induced by the permutation of the input structure. We show that the expressive power of such families is closely tied to definability in logic. In particular, we show that the queries defined on structures by uniform families of symmetric Boolean circuits with majority gates are exactly those definable in fixed-point logic with counting. This shows that inexpressibility results in the latter logic lead to lower bounds against polynomial-size families of symmetric circuits.
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cs.CC 1years
2026 1verdicts
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Graph Isomorphism and Representation Theory
Separating modules of support-degree k equate to O(k)-subgraph counts, those of symmetric circuit size n^Θ(k) equate to Θ(k)-WL, and their multiplicities equate to differing automorphism cycle indices.