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487 results on '"Kschischang, Frank R."'

151. Tanner Graphs for Group Block Codes and Lattices: Construction and Complexity

Author

Banihashemi, Amir H. and Kschischang, Frank R.

Subjects
Coding theory -- Analysis, Lattice theory -- Analysis, Codes -- Analysis
Abstract

We develop a Tanner graph (TG) construction for an Abelian group block code L with arbitrary alphabets at different coordinates, an important application of which is the representation of the label code of a lattice. The construction is based on the modular linear constraints imposed on the code symbols by a set of generators for the dual code L*. As a necessary step toward the construction of a TG for L, we devise an efficient algorithm for finding a generating set for L*. In the process, we develop a construction for lattices based on an arbitrary Abelian group block code, called generalized Construction A (GCA), and explore relationships among a group code, its GCA lattice, and their duals. We also study the problem of finding low-complexity TGs for Abelian group block codes and lattices, and derive tight lower bounds on the label-code complexity of lattices. It is shown that for many important lattices, the minimal label codes which achieve the lower bounds cannot be supported by cycle-free Tanner graphs. Index Terms--Dual code, generalized Construction A, group codes, lattices, Tanner graphs, Tanner graph complexity, Tanner graph construction.

Published
2001

152. Factor Graphs and the Sum-Product Algorithm

Author

Kschischang, Frank R., Frey, Brendan J., and Loeliger, Hans-Andrea

Subjects
Algorithms -- Research, Functions -- Research, Graphic methods -- Research, Iterative methods (Mathematics) -- Research, Kalman filtering -- Research, Fourier transformations -- Research
Abstract

Algorithms that must deal with complicated global functions of many variables often exploit the manner in which the given functions factor as a product of "local" functions, each of which depends on a subset of the variables. Such a factorization can be visualized with a bipartite graph that we call a factor graph. In this tutorial paper, we present a generic message-passing algorithm, the sum-product algorithm, that operates in a factor graph. Following a single, simple computational rule, the sum-product algorithm computes--either exactly or approximately--various marginal functions derived from the global function. A wide variety of algorithms developed in artificial intelligence, signal processing, and digital communications can be derived as specific instances of the sum-product algorithm, including the forward/backward algorithm, the Viterbi algorithm, the iterative "turbo" decoding algorithm, Pearl's belief propagation algorithm for Bayesian networks, the Kalman filter, and certain fast Fourier transform (FFT) algorithms. Index Terms--Belief propagation, factor graphs, fast Fourier transform, forward/backward algorithm, graphical models, iterative decoding, Kalman filtering, marginalization, sum-product algorithm, Tanner graphs, Viterbi algorithm.

Published
2001

153. Gallager Codes for CDMA Applications--Part II: Implementations, Complexity, and System Capacity

Author

Sorokine, Vladislav, Kschischang, Frank R., and Pasupathy, Subbarayan

Subjects
Decoders -- Design and construction, Information measurement -- Analysis, Chaos theory -- Usage, Simulation methods -- Usage
Abstract

We focus our attention on Gallager codes with parameters compatible with the IS-95 cellular radio standard. We discuss low complexity software and hardware implementations of an iterative decoder for {N, -, 3} Gallager codes. We estimate that by using Gallager codes, a factor of five improvement in the code-division multiple-access system capacity relative to an uncoded system can be achieved, equivalent to a factor of two improvement relative to state-of-the art orthogonal convolutional codes. Simulation results demonstrate the good performance of short-frame Gallager codes in the additive white Gaussian noise and certain fading channels. Index Terms--Complexity theory, decoder architecture, information rates, low-density parity-check codes.

Published
2000

154. Gallager Codes for CDMA Applications--Part I: Generalizations, Constructions, and Performance Bounds

Author

Sorokine, Vladislav, Kschischang, Frank R., and Pasupathy, Subbarayan

Subjects
Codes -- Research, Decoders -- Research, Random noise theory -- Research, Signal processing -- Research
Abstract

We focus on applications of low-rate Gallager (low-density parity-check) codes in code-division multiple-access schemes. The codes that we present here achieve good performance with relatively short frame-lengths in additive white Gaussian noise channels and, perhaps more importantly, in fading channels. These codes can be decoded with low complexity by using iterative decoding procedures. We present a construction that yields good short frame-length Gallager codes. Bounds on the frame-error probability for a maximum-likelihood decoder are obtained. Index Terms--CDMA, iterative decoding, low-density parity-check codes.

Published
2000

161. Roadmap of optical communications

Author

Agrell, Erik, primary, Karlsson, Magnus, additional, Chraplyvy, A R, additional, Richardson, David J, additional, Krummrich, Peter M, additional, Winzer, Peter, additional, Roberts, Kim, additional, Fischer, Johannes Karl, additional, Savory, Seb J, additional, Eggleton, Benjamin J, additional, Secondini, Marco, additional, Kschischang, Frank R, additional, Lord, Andrew, additional, Prat, Josep, additional, Tomkos, Ioannis, additional, Bowers, John E, additional, Srinivasan, Sudha, additional, Brandt-Pearce, Maïté, additional, and Gisin, Nicolas, additional

Published
2016
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182. Subspace codes

Author

Parker, Matthew G., Khaleghi, Azedeh, Silva, Danilo, Kschischang, Frank R., Parker, Matthew G., Khaleghi, Azedeh, Silva, Danilo, and Kschischang, Frank R.

Abstract

This paper is a survey of bounds and constructions for subspace codes designed for the injection metric, a distance measure that arises in the context of correcting adversarial packet insertions in linear network coding. The construction of lifted rank-metric codes is reviewed, along with improved constructions leading to codes with strictly more codewords. Algorithms for encoding and decoding are also briefly described.

Published
2009

184. Sparse Network Coding with Overlapping Classes

Author

Silva, Danilo, Zeng, Weifei, Kschischang, Frank R., Silva, Danilo, Zeng, Weifei, and Kschischang, Frank R.

Abstract

This paper presents a novel approach to network coding for distribution of large files. Instead of the usual approach of splitting packets into disjoint classes (also known as generations) we propose the use of overlapping classes. The overlapping allows the decoder to alternate between Gaussian elimination and back substitution, simultaneously boosting the performance and reducing the decoding complexity. Our approach can be seen as a combination of fountain coding and network coding. Simulation results are presented that demonstrate the promise of our approach., Comment: 15 pages, 5 figures, to be published at NetCod 2009

Published
2009
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185. Projective Space Codes for the Injection Metric

Author

Khaleghi, Azadeh, Kschischang, Frank R., Khaleghi, Azadeh, and Kschischang, Frank R.

Abstract

In the context of error control in random linear network coding, it is useful to construct codes that comprise well-separated collections of subspaces of a vector space over a finite field. In this paper, the metric used is the so-called "injection distance", introduced by Silva and Kschischang. A Gilbert-Varshamov bound for such codes is derived. Using the code-construction framework of Etzion and Silberstein, new non-constant-dimension codes are constructed; these codes contain more codewords than comparable codes designed for the subspace metric.

Published
2009

186. Fast Encoding and Decoding of Gabidulin Codes

Author

Silva, Danilo, Kschischang, Frank R., Silva, Danilo, and Kschischang, Frank R.

Abstract

Gabidulin codes are the rank-metric analogs of Reed-Solomon codes and have a major role in practical error control for network coding. This paper presents new encoding and decoding algorithms for Gabidulin codes based on low-complexity normal bases. In addition, a new decoding algorithm is proposed based on a transform-domain approach. Together, these represent the fastest known algorithms for encoding and decoding Gabidulin codes., Comment: 5 pages, 1 figure, to be published at ISIT 2009

Published
2009
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187. Robust Network Coding in the Presence of Untrusted Nodes

Author

Wang, Da, Silva, Danilo, Kschischang, Frank R., Wang, Da, Silva, Danilo, and Kschischang, Frank R.

Abstract

While network coding can be an efficient means of information dissemination in networks, it is highly susceptible to "pollution attacks," as the injection of even a single erroneous packet has the potential to corrupt each and every packet received by a given destination. Even when suitable error-control coding is applied, an adversary can, in many interesting practical situations, overwhelm the error-correcting capability of the code. To limit the power of potential adversaries, a broadcast transformation is introduced, in which nodes are limited to just a single (broadcast) transmission per generation. Under this broadcast transformation, the multicast capacity of a network is changed (in general reduced) from the number of edge-disjoint paths between source and sink to the number of internally-disjoint paths. Exploiting this fact, we propose a family of networks whose capacity is largely unaffected by a broadcast transformation. This results in a significant achievable transmission rate for such networks, even in the presence of adversaries., Comment: 7 pages, 4 figures, to be published at the IEEE Transactions on Information Theory

Published
2008
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188. Universal Secure Network Coding via Rank-Metric Codes

Author

Silva, Danilo, Kschischang, Frank R., Silva, Danilo, and Kschischang, Frank R.

Abstract

The problem of securing a network coding communication system against an eavesdropper adversary is considered. The network implements linear network coding to deliver n packets from source to each receiver, and the adversary can eavesdrop on \mu arbitrarily chosen links. The objective is to provide reliable communication to all receivers, while guaranteeing that the source information remains information-theoretically secure from the adversary. A coding scheme is proposed that can achieve the maximum possible rate of n-\mu packets. The scheme, which is based on rank-metric codes, has the distinctive property of being universal: it can be applied on top of any communication network without requiring knowledge of or any modifications on the underlying network code. The only requirement of the scheme is that the packet length be at least n, which is shown to be strictly necessary for universal communication at the maximum rate. A further scenario is considered where the adversary is allowed not only to eavesdrop but also to inject up to t erroneous packets into the network, and the network may suffer from a rank deficiency of at most \rho. In this case, the proposed scheme can be extended to achieve the rate of n-\rho-2t-\mu packets. This rate is shown to be optimal under the assumption of zero-error communication., Comment: 12 pages, 1 figure, substantially rewritten and improved. Submitted to IEEE Transactions on Information Theory

Published
2008
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189. On Metrics for Error Correction in Network Coding

Author

Silva, Danilo, Kschischang, Frank R., Silva, Danilo, and Kschischang, Frank R.

Abstract

The problem of error correction in both coherent and noncoherent network coding is considered under an adversarial model. For coherent network coding, where knowledge of the network topology and network code is assumed at the source and destination nodes, the error correction capability of an (outer) code is succinctly described by the rank metric; as a consequence, it is shown that universal network error correcting codes achieving the Singleton bound can be easily constructed and efficiently decoded. For noncoherent network coding, where knowledge of the network topology and network code is not assumed, the error correction capability of a (subspace) code is given exactly by a new metric, called the injection metric, which is closely related to, but different than, the subspace metric of K\"otter and Kschischang. In particular, in the case of a non-constant-dimension code, the decoder associated with the injection metric is shown to correct more errors then a minimum-subspace-distance decoder. All of these results are based on a general approach to adversarial error correction, which could be useful for other adversarial channels beyond network coding., Comment: 28 pages, 1 figure, to be published at IEEE Transactions on Information Theory

Published
2008
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190. Communication over Finite-Field Matrix Channels

Author

Silva, Danilo, Kschischang, Frank R., Kötter, Ralf, Silva, Danilo, Kschischang, Frank R., and Kötter, Ralf

Abstract

This paper is motivated by the problem of error control in network coding when errors are introduced in a random fashion (rather than chosen by an adversary). An additive-multiplicative matrix channel is considered as a model for random network coding. The model assumes that n packets of length m are transmitted over the network, and up to t erroneous packets are randomly chosen and injected into the network. Upper and lower bounds on capacity are obtained for any channel parameters, and asymptotic expressions are provided in the limit of large field or matrix size. A simple coding scheme is presented that achieves capacity in both limiting cases. The scheme has decoding complexity O(n^2 m) and a probability of error that decreases exponentially both in the packet length and in the field size in bits. Extensions of these results for coherent network coding are also presented., Comment: 24 pages, to be published at the IEEE Transactions on Information Theory

Published
2008
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197. Security for Wiretap Networks via Rank-Metric Codes

Author

Silva, Danilo, Kschischang, Frank R., Silva, Danilo, and Kschischang, Frank R.

Abstract

The problem of securing a network coding communication system against a wiretapper adversary is considered. The network implements linear network coding to deliver $n$ packets from source to each receiver, and the wiretapper can eavesdrop on $\mu$ arbitrarily chosen links. A coding scheme is proposed that can achieve the maximum possible rate of $k=n-\mu$ packets that are information-theoretically secure from the adversary. A distinctive feature of our scheme is that it is universal: it can be applied on top of any communication network without requiring knowledge of or any modifications on the underlying network code. In fact, even a randomized network code can be used. Our approach is based on Rouayheb-Soljanin's formulation of a wiretap network as a generalization of the Ozarow-Wyner wiretap channel of type II. Essentially, the linear MDS code in Ozarow-Wyner's coset coding scheme is replaced by a maximum-rank-distance code over an extension of the field in which linear network coding operations are performed., Comment: 5 pages, to be published at the 2008 IEEE International Symposium on Information Theory

Published
2007
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198. A Rank-Metric Approach to Error Control in Random Network Coding

Author

Silva, Danilo, Kschischang, Frank R., Kötter, Ralf, Silva, Danilo, Kschischang, Frank R., and Kötter, Ralf

Abstract

The problem of error control in random linear network coding is addressed from a matrix perspective that is closely related to the subspace perspective of K\"otter and Kschischang. A large class of constant-dimension subspace codes is investigated. It is shown that codes in this class can be easily constructed from rank-metric codes, while preserving their distance properties. Moreover, it is shown that minimum distance decoding of such subspace codes can be reformulated as a generalized decoding problem for rank-metric codes where partial information about the error is available. This partial information may be in the form of erasures (knowledge of an error location but not its value) and deviations (knowledge of an error value but not its location). Taking erasures and deviations into account (when they occur) strictly increases the error correction capability of a code: if $\mu$ erasures and $\delta$ deviations occur, then errors of rank $t$ can always be corrected provided that $2t \leq d - 1 + \mu + \delta$, where $d$ is the minimum rank distance of the code. For Gabidulin codes, an important family of maximum rank distance codes, an efficient decoding algorithm is proposed that can properly exploit erasures and deviations. In a network coding application where $n$ packets of length $M$ over $F_q$ are transmitted, the complexity of the decoding algorithm is given by $O(dM)$ operations in an extension field $F_{q^n}$., Comment: Minor corrections; 42 pages, to be published at the IEEE Transactions on Information Theory

Published
2007
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