English

On CC\textsuperscript{0} Lower Bounds for AND via Torus Polynomials

Computational Complexity 2026-07-11 v1

Abstract

We explore a torus polynomial approximation based approach towards a long-standing question: whether ANDAND can be computed by CC0CC^0 circuits - the class of constant-depth polynomial size circuits containing MODmMOD_m gates for some mm. Bhrushundi et al. (ITCS 2019) introduced torus polynomial approximations as an approach for proving lower bounds against ACC0ACC^0 - a class containing CC0CC^0 with circuits comprising ANDAND, OROR and NOTNOT gates. We show how lower bounds for torus polynomials approximating ANDAND can be used to make progress on this question. Using lower bounds on the degree of symmetric torus polynomials approximating ANDAND from Krishan and Vishwanathan (ITCS 2026), we prove size lower bounds for symmetric CC0CC^0-circuits computing ANDAND. More precisely, we prove that any depth hh symmetric CC0CC^0 circuit requires 2Ω~(n1/O(h))2^{\widetilde{\Omega}(n^{1/O(h)})} size to compute ANDAND. A key ingredient in our proof is an argument that we can construct symmetric torus polynomials to approximate symmetric CC0CC^0 circuits. Our construction exhibits an explicit correspondence between the symmetry of the circuit and that of the polynomial. Using this, we also establish lower bounds for weaker notions of circuit symmetry. Lower bounds for symmetric CC0CC^0 circuits were also independently established by Pago (ICALP 2026) using different techniques. In the asymmetric regime, we establish degree upper bounds for depth three circuits of the form MODpMODmANDO(1)MOD_p \circ MOD_m \circ AND_{O(1)} where m=pqm=pq is a semiprime. This circuit class is a special case of the constant degree hypothesis, introduced by Barrington, Straubing and Therien (Inf. and Comp., 1990), where mm could be an arbitrary composite number. We argue that improved lower bounds for asymmetric torus polynomials approximating ANDAND imply size lower bounds for semiprime mm and hence progress on the constant-degree hypothesis.

Cite

@article{arxiv.2607.10236,
  title  = {On CC\textsuperscript{0} Lower Bounds for AND via Torus Polynomials},
  author = {Vaibhav Krishan and Jayalal Sarma},
  journal= {arXiv preprint arXiv:2607.10236},
  year   = {2026}
}