אירועים והרצאות בפקולטה למדעי המחשב ע"ש הנרי ומרילין טאוב

Locally Decodable Codes (LDC) allow one to decode any particular symbol of the input message by making a constant number of queries to a codeword, even if a constant fraction of the codeword is damaged. In a recent work ~\cite{Yekhanin08} Yekhanin constructs a $3$-query LDC with sub-exponential length of size $\exp(\exp(O(\frac{\log n}{\log\log n})))$. However, this construction requires a conjecture that there are infinitely many Mersenne primes. In this paper we give the first unconditional constant query LDC construction with subexponantial codeword length. In addition our construction reduces codeword length. We give construction of \(3\)-query LDC with codeword length $\exp(\exp(O(\sqrt{\log n \log \log n })))$. Our construction also could be extended to higher number of queries.