We cement the intuitive connection between relaxed local correctability and
local testing by presenting a concrete framework for building a relaxed locally
correctable code from any family of linear locally testable codes with
sufficiently high rate. When instantiated using the locally testable codes of
Dinur et al. (STOC 2022), this framework yields the first asymptotically good
relaxed locally correctable and decodable codes with polylogarithmic query
complexity, which finally closes the superpolynomial gap between query lower
and upper bounds. Our construction combines high-rate locally testable codes of
various sizes to produce a code that is locally testable at every scale: we can
gradually "zoom in" to any desired codeword index, and a local tester at each
step certifies that the next, smaller restriction of the input has low error.
Our codes asymptotically inherit the rate and distance of any locally
testable code used in the final step of the construction. Therefore, our
technique also yields nonexplicit relaxed locally correctable codes with
polylogarithmic query complexity that have rate and distance approaching the
Gilbert-Varshamov bound.Comment: 18 page