Linear codes are proposed as a solution to the recovery problem in Hyperdimensional Computing (HDC). By encoding using random linear codes, favorable properties are retained without loss of information. The use of linear codes allows for simple implementation of key-value stores, reduction of search space size, and efficient factorization solutions. The paper demonstrates the benefits of linear codes in HDC through experimental results and theoretical analysis.
Linear Codes for Hyperdimensional Computing introduces a novel approach to solving the recovery problem in HDC by proposing the use of random linear codes. The paper highlights that encoding with linear codes retains favorable properties while offering efficient recovery algorithms. By implementing techniques in Python using benchmark software libraries, promising experimental results were demonstrated.
The content delves into the theoretical foundations of Hyperdimensional Computing (HDC) and its applications, focusing on the recovery problem. It explores the use of random linear codes to address challenges in HDC, showcasing their advantages over traditional methods.
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