In this paper we consider the per-node run-time complexity of network multicast codes. We show that the randomized algebraic network code design algorithms described extensively in the literature result in codes that on average require a number of operations that scales quadratically with the blocklength m of the codes. We then propose an alternative type of linear network code whose complexity scales linearly in m and still enjoys the attractive properties of random algebraic network codes. We also show that these codes are optimal in the sense that any rate-optimal linear network code must have at least a linear scaling in run-time complexity
Random linear network codes can be designed and implemented in a distributed manner, with low comput...
The problem of finding network codes for general connections is inherently difficult. Resource minim...
Random coding arguments are the backbone of most channel capacity achievability proofs. In this pape...
Abstract—In this paper we consider the per-node run-time complexity of network multicast codes. We s...
We present a low complexity algorithm for designing algebraic codes that achieve the info mation ...
The famous max-flow min-cut theorem states that a source node s can send information through a netwo...
In the multicast network coding problem, a source s needs to deliver h packets to a set of k termina...
In this work, we study the computational perspective of network coding, focusing on two issues. Firs...
In the multicast network coding problem, a source s needs to deliver h packets to a set of k termina...
Thesis (M. Eng. and S.B.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering an...
The encoding complexity of network coding for single multicast networks has been intensively studied...
We present a distributed random linear network coding approach for transmission and compression of i...
Network Coding is a technique which looks beyond traditional store-and-forward approach followed by ...
The min-cut value towards a single receiver in a network with unit capacity edges can be achieved by...
In this paper, some novel results on the encoding complexity of network coding and its relation with...
Random linear network codes can be designed and implemented in a distributed manner, with low comput...
The problem of finding network codes for general connections is inherently difficult. Resource minim...
Random coding arguments are the backbone of most channel capacity achievability proofs. In this pape...
Abstract—In this paper we consider the per-node run-time complexity of network multicast codes. We s...
We present a low complexity algorithm for designing algebraic codes that achieve the info mation ...
The famous max-flow min-cut theorem states that a source node s can send information through a netwo...
In the multicast network coding problem, a source s needs to deliver h packets to a set of k termina...
In this work, we study the computational perspective of network coding, focusing on two issues. Firs...
In the multicast network coding problem, a source s needs to deliver h packets to a set of k termina...
Thesis (M. Eng. and S.B.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering an...
The encoding complexity of network coding for single multicast networks has been intensively studied...
We present a distributed random linear network coding approach for transmission and compression of i...
Network Coding is a technique which looks beyond traditional store-and-forward approach followed by ...
The min-cut value towards a single receiver in a network with unit capacity edges can be achieved by...
In this paper, some novel results on the encoding complexity of network coding and its relation with...
Random linear network codes can be designed and implemented in a distributed manner, with low comput...
The problem of finding network codes for general connections is inherently difficult. Resource minim...
Random coding arguments are the backbone of most channel capacity achievability proofs. In this pape...