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Tight Lower Bounds on The Single-Error Detection Threshold for Analog Error-Correcting Codes

Information Theory 2026-05-12 v1 math.IT

Abstract

Analog error-correcting codes (Analog ECCs) for approximate vector-matrix multiplication have been extensively studied as means to achieve fault-tolerant in-memory computation. The theoretical foundations for such coding schemes, particularly the characterization of their correction capabilities via the height profile, have been well established in recent literature. In this paper, we focus on the case of single-error detection Analog ECCs. Among several open problems related to this case proposed by Ron M. Roth in [1], Problem 1 asks: "Identify the values of kk and nn for which every linear [n,k][n, k] code C\mathcal{C} over R\mathbb{R} satisfies: h1(C):=maxcC{0}h1(c)knk."\mathsf{h}_1(\mathcal{C}):=\max_{\boldsymbol{c}\in \mathcal{C}\setminus{\{\boldsymbol{0}\}}}\mathsf{h}_1(\boldsymbol{c})\geq \Big\lceil \frac{k}{n-k} \Big\rceil.\text{"} Here, for any xRn\boldsymbol{x}\in\mathbb{R}^n, h1(x)\mathsf{h}_1(\boldsymbol{x}) represents the ratio between the largest and second largest absolute values of x\boldsymbol{x}'s entries. As the simplest special case of Problem 1 (with nk=2n-k=2), the following problem was posed as Problem 2 in [1]: "Must every (n2)(n-2)-dimensional subspace of Rn\mathbb{R}^n, nn even, contain a nonzero vector in which the ratio between the largest and second largest absolute values of its entries is at least (n/2)1(n/2)-1?" These problems directly pertain to the lower bounds on the single-error detection threshold for Analog ECCs: Problem 1 corresponds to arbitrary nkn-k and Problem 2 corresponds to nk=2n-k=2. In this paper, we provide an affirmative answer to Problem 2 and a rigorous proof using theories related to convex optimization. Furthermore, we extend our analytical method to show that the lower bound in Problem 1 is tight for the case where nkn-k divides kk. Our results fill the gap in the lower bound theory of thresholds for single-error detection in Analog ECCs.

Keywords

Cite

@article{arxiv.2605.08973,
  title  = {Tight Lower Bounds on The Single-Error Detection Threshold for Analog Error-Correcting Codes},
  author = {Zhengyi Jiang and Wenhao Liu and Zhongyi Huang and Bo Bai and Gong Zhang and Hanxu Hou},
  journal= {arXiv preprint arXiv:2605.08973},
  year   = {2026}
}
R2 v1 2026-07-01T13:00:00.675Z