Abstract — We outline a procedure for using pseudorandom generators to construct binary codes with good properties, assuming the existence of sufficiently hard functions. Specifically, we give a polynomial time algorithm, which for every integers n and k, constructs polynomially many linear codes of block length n and dimension k, most of which achieving the Gilbert-Varshamov bound. The success of the procedure relies on the assumption that the exponential time class of E def = DTIME[2 O(n) ] is not contained in the sub-exponential space class DSPACE[2 o(n)]. The methods used in this paper are by now standard within computational complexity theory, and the main contribution of this note is observing that they are relevant to the constructio...
A number of recent results have constructed randomness extractors and pseudorandom generators (PRGs)...
We present a simple new construction of a pseudorandom bit generator, based on the constant depth ge...
We obtain new bounds on the parameters and we give new constructions of linear error-block codes. We...
A central paradox of coding theory has been noted for many years, and concerns the existence and con...
Existing proofs that deduce BPP=P from circuit lower bounds convert randomized algorithms into deter...
We study the complexity of building pseudorandom generators (PRGs) from hard functions. We show that...
Pseudo-randomness is an indispensable tool in theoretical computer science. In this dissertation, we...
Abstract—For and , we study the task of transforming a hard function , with ...
AbstractR. Impagliazzo and A. Wigderson (1997, in “Proceedings of the twenty-ninth Annual ACM Sympos...
and Luby show that a pseudorandom generator can be constructed from any one-way function. This plaus...
We give a polynomial time construction of binary codes with the best currently known trade-off betwe...
We study the average-case hardness of the class NP against deterministic polynomial time algorithms....
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2002.Includes bibliogr...
The fact that the general decoding problem for linear codes and the general problem of finding the w...
We study the average-case hardness of the class NP against deterministic polynomial time algorithms....
A number of recent results have constructed randomness extractors and pseudorandom generators (PRGs)...
We present a simple new construction of a pseudorandom bit generator, based on the constant depth ge...
We obtain new bounds on the parameters and we give new constructions of linear error-block codes. We...
A central paradox of coding theory has been noted for many years, and concerns the existence and con...
Existing proofs that deduce BPP=P from circuit lower bounds convert randomized algorithms into deter...
We study the complexity of building pseudorandom generators (PRGs) from hard functions. We show that...
Pseudo-randomness is an indispensable tool in theoretical computer science. In this dissertation, we...
Abstract—For and , we study the task of transforming a hard function , with ...
AbstractR. Impagliazzo and A. Wigderson (1997, in “Proceedings of the twenty-ninth Annual ACM Sympos...
and Luby show that a pseudorandom generator can be constructed from any one-way function. This plaus...
We give a polynomial time construction of binary codes with the best currently known trade-off betwe...
We study the average-case hardness of the class NP against deterministic polynomial time algorithms....
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2002.Includes bibliogr...
The fact that the general decoding problem for linear codes and the general problem of finding the w...
We study the average-case hardness of the class NP against deterministic polynomial time algorithms....
A number of recent results have constructed randomness extractors and pseudorandom generators (PRGs)...
We present a simple new construction of a pseudorandom bit generator, based on the constant depth ge...
We obtain new bounds on the parameters and we give new constructions of linear error-block codes. We...