Average-Case Reductions for k-XOR and Tensor PCA

Abstract

We study the computational properties of two canonical planted average-case problems -- noisy planted k-XOR and Tensor PCA -- by formally unifying them into a family of planted problems parametrized by tensor order k, number of entries m, and noise level δ. We build a wide range of poly-time average-case reductions within this family, across all regimes m ∈ [1, nk]. In the denser m ≥ nk/2 regime, our reductions preserve proximity to the computational threshold, and, as a central application, reduce conjectured-hard k-XOR instances with m ≈ nk/2 to conjectured-hard instances of Tensor PCA. Additionally, we give new order-reducing maps at fixed densities (e.g., 5 4 for k-XOR with m ≈ nk/2 entries and 7 4 for Tensor PCA). In the sparser m ≤ nk/2 regime, we relate instances of different orders, reducing, for example, 7-XOR with m = n3.4 to the classical setting of 3-XOR with m = (n1.4). Taken together, these results establish a hardness partial order in the space of planted tensor models.