Add to ORKGWe introduce a random code construction for channel coding in which the codewords are constrained to be well-separated according to a given distance function, analogously to an existing construction attaining the Gilbert-Varshamov bound. We derive an achievable error exponent for this construction, and prove its tightness with respect to the ensemble average. We show that the exponent recovers the Csiszár and Körner exponent as a special case by choosing the distance function to be the negative of the empirical mutual information. We further establish the optimality of this distance function with respect to the exponent of the random coding scheme
It is well-known that random error-correcting codes achieve the Gilbert-Varshamov bound with high pr...
Capacity formulas and random-coding exponents are derived for a generalized family of Gel’fand-Pinsk...
Abstract- The minimum probability of error achievable by random codes on the arbitrarily varying cha...
© 1963-2012 IEEE. We introduce a random coding technique for transmission over discrete memoryless c...
© 1963-2012 IEEE. We introduce a random coding technique for transmission over discrete memoryless c...
We show that a recursive cost-constrained random coding scheme attains an error exponent that is at ...
We consider transmission over a discrete memoryless channel (DMC) W(y\x) with finite alphabets X and...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
We find the exact typical error exponent of constant composition generalized random Gilbert-Varshamo...
This paper presents a random-coding upper bound on the average error probability of joint source-cha...
Abstract — This paper studies expurgated random-coding bounds and exponents for channel coding with ...
Abstract—This paper studies expurgated random-coding bounds and exponents for channels with maximum-...
Abstract — This paper concerns error exponents and the struc-ture of input distributions maximizing ...
It is well-known that random error-correcting codes achieve the Gilbert-Varshamov bound with high pr...
Capacity formulas and random-coding exponents are derived for a generalized family of Gel’fand-Pinsk...
Abstract- The minimum probability of error achievable by random codes on the arbitrarily varying cha...
© 1963-2012 IEEE. We introduce a random coding technique for transmission over discrete memoryless c...
© 1963-2012 IEEE. We introduce a random coding technique for transmission over discrete memoryless c...
We show that a recursive cost-constrained random coding scheme attains an error exponent that is at ...
We consider transmission over a discrete memoryless channel (DMC) W(y\x) with finite alphabets X and...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
This paper studies expurgated random-coding bounds and exponents for channel coding with a given (po...
We find the exact typical error exponent of constant composition generalized random Gilbert-Varshamo...
This paper presents a random-coding upper bound on the average error probability of joint source-cha...
Abstract — This paper studies expurgated random-coding bounds and exponents for channel coding with ...
Abstract—This paper studies expurgated random-coding bounds and exponents for channels with maximum-...
Abstract — This paper concerns error exponents and the struc-ture of input distributions maximizing ...
It is well-known that random error-correcting codes achieve the Gilbert-Varshamov bound with high pr...
Capacity formulas and random-coding exponents are derived for a generalized family of Gel’fand-Pinsk...
Abstract- The minimum probability of error achievable by random codes on the arbitrarily varying cha...