Transversal non-Clifford gates on almost-good quantum LDPC and quantum locally testable codes

Abstract

We exhibit nontrivial transversal logical multi-controlled-Z gates on [\![N,(N),(N)]\!] quantum low-density parity-check codes and [\![N,(N),(N)]\!] quantum locally testable codes with soundness (1), combining nearly optimal code parameters with fault-tolerant non-Clifford gates for the first time. Remarkably, our proofs are almost entirely algebraic-topological, showing that such presumably intricate logical gates naturally arise as a fundamental topological phenomenon. We develop a general framework for constructing a rich new family of homological invariant forms which we call ''cupcap gates'' that induce transversal logical multi-controlled-Z and, building on insights from [Li et al., arXiv:2603.25831], covering space methods to certify their nontriviality. The claimed almost-good code results follow immediately as examples.