English

Ancilla-free Quantum Adder with Sublinear Depth

Quantum Physics 2025-08-04 v2 Discrete Mathematics

Abstract

We present the first exact quantum adder with sublinear depth and no ancilla qubits. Our construction is based on classical reversible logic only and employs low-depth implementations for the CNOT ladder operator and the Toffoli ladder operator, two key components to perform ripple-carry addition. Namely, we demonstrate that any ladder of nn CNOT gates can be replaced by a CNOT-circuit with O(logn)O(\log n) depth, while maintaining a linear number of gates. We then generalize this construction to Toffoli gates and demonstrate that any ladder of nn Toffoli gates can be substituted with a circuit with O(log2n)O(\log^2 n) depth while utilizing a linearithmic number of gates. This builds on the recent works of Nie et al. and Khattar and Gidney on the technique of conditionally clean ancillae. By combining these two key elements, we present a novel approach to design quantum adders that can perform the addition of two nn-bit numbers in depth O(log2n)O(\log^2 n) without the use of any ancilla and using classical reversible logic only (Toffoli, CNOT and X gates). We also present new constructions for incrementing and adding a constant to a quantum register.

Cite

@article{arxiv.2501.16802,
  title  = {Ancilla-free Quantum Adder with Sublinear Depth},
  author = {Maxime Remaud and Vivien Vandaele},
  journal= {arXiv preprint arXiv:2501.16802},
  year   = {2025}
}

Comments

V2: Add a section with incrementor and addition of a constant

R2 v1 2026-06-28T21:21:38.363Z