One of the founding results of lattice based cryptography is a quantum reduction from the Short Integer Solution problem to the Learning with Errors problem introduced by Regev. It has recently been pointed out by Chen, Liu and Zhandry that this reduction can be made more powerful by replacing the learning with errors problem with a quantum equivalent, where the errors are given in quantum superposition. In the context of codes, this can be adapted to a reduction from finding short codewords to a quantum decoding problem for random linear codes. We therefore consider in this paper the quantum decoding problem, where we are given a superposition of noisy versions of a codeword and we want to recover the corresponding codeword. When we mea...
Lattice-based cryptography is one of the most competitive candidates for protecting privacy, both in...
Quantum error correction is an important building block for reliable quantum information processing....
We present a garbling scheme for quantum circuits, thus achieving a decomposable randomized encoding...
One of the founding results of lattice based cryptography is a quantum reduction from the Short Inte...
We give a quantum reduction from finding short codewords in a random linear code to decoding for the...
Quantum error correction codes (QECCs) play a central role both in quantum communications and in qua...
Our task of quantum list decoding for a classical block code is to recover from a given quantumly co...
We present a number of results related to quantum algorithms with small error probability and quantu...
We consider the problem of optimally decoding a quantum error correction code -- that is to find the...
We establish the first general connection between the design of quantum algorithms and circuit lower...
We consider the problem of implementing two-party interactive quantum communication over noisy chann...
In this paper, we present a theory of quantum serial turbo codes, describe their iterative decoding ...
We present a number of results related to quantum algorithms with small error probability and quantu...
Although the theory of quantum error correction is intimately related to classical coding theory and...
We work out a theory on approximate quantum error correction, building on an earlier result of Schum...
Lattice-based cryptography is one of the most competitive candidates for protecting privacy, both in...
Quantum error correction is an important building block for reliable quantum information processing....
We present a garbling scheme for quantum circuits, thus achieving a decomposable randomized encoding...
One of the founding results of lattice based cryptography is a quantum reduction from the Short Inte...
We give a quantum reduction from finding short codewords in a random linear code to decoding for the...
Quantum error correction codes (QECCs) play a central role both in quantum communications and in qua...
Our task of quantum list decoding for a classical block code is to recover from a given quantumly co...
We present a number of results related to quantum algorithms with small error probability and quantu...
We consider the problem of optimally decoding a quantum error correction code -- that is to find the...
We establish the first general connection between the design of quantum algorithms and circuit lower...
We consider the problem of implementing two-party interactive quantum communication over noisy chann...
In this paper, we present a theory of quantum serial turbo codes, describe their iterative decoding ...
We present a number of results related to quantum algorithms with small error probability and quantu...
Although the theory of quantum error correction is intimately related to classical coding theory and...
We work out a theory on approximate quantum error correction, building on an earlier result of Schum...
Lattice-based cryptography is one of the most competitive candidates for protecting privacy, both in...
Quantum error correction is an important building block for reliable quantum information processing....
We present a garbling scheme for quantum circuits, thus achieving a decomposable randomized encoding...