An improvement of the asymptotic Elias bound for non-binary codes
نویسنده
چکیده
For non-binary codes the Elias bound is a good upper bound for the asymptotic information rate at low relative minimum distance, where as the Plotkin bound is better at high relative minimum distance. In this work, we obtain a hybrid of these bounds which improves both. This in turn is based on the anticode bound which is a hybrid of the Hamming and Singleton bounds and improves both bounds. The question of convexity of the asymptotic rate function is an important open question. We conjecture a much weaker form of the convexity, and we show that our bounds follow immediately if we assume the conjecture. Index Terms information rate, size of a code, anticode.
منابع مشابه
On Asymptotic Elias Bound for Euclidean Space Codes over Distance-Uniform Signal Sets
The asymptotic Elias upper bound of codes designed for Hamming distance is well known. Piret [3] and Ericsson [4] have extended this bound for codes over symmetric PSK signal sets with Euclidean distance and for codes over signal sets that form a group, with a general distance function respectively. The tightness of these bounds depend on a choice of a probability distribution, and finding the ...
متن کاملElias Upper Bound for Euclidean Space Codes and Codes Close to the Singleton Bound
A typical communication system consists of a channel code to transmit signals reliably over a noisy channel. In general the channel code is a set of codewords which are used to carry information over the channel. This thesis deals with Elias upper bound on the normalized rate for Euclidean space codes and on codes which are close to the generalized Singleton bound, like MaximumDistance Separabl...
متن کاملOn Upper Bounds for Minimum Distances and Covering Radius of Non-binary Codes
We consider upper bounds on two fundamental parameters of a code; minimum distance and covering radius. New upper bounds on the covering radius of non-binary linear codes are derived by generalizing a method due to S. Litsyn and A. Tiett avv ainen 10] and combining it with a new upper bound on the asymptotic information rate of non-binary codes. The new upper bound on the information rate is an...
متن کاملAsymptotic improvement of the Gilbert-Varshamov bound for linear codes
The Gilbert-Varshamov bound states that the maximum size A2(n, d) of a binary code of length n and minimum distance d satisfies A2(n, d) ≥ 2/V (n, d−1) where V (n, d) = ∑ d i=0 ( n i ) stands for the volume of a Hamming ball of radius d. Recently Jiang and Vardy showed that for binary non-linear codes this bound can be improved to A2(n, d) ≥ cn 2 V (n, d− 1) for c a constant and d/n ≤ 0.499. In...
متن کاملOn the Minimum Distance of Non Binary LDPC Codes
Minimum distance is an important parameter of a linear error correcting code. For improved performance of binary Low Density Parity Check (LDPC) codes, we need to have the minimum distance grow fast with n, the codelength. However, the best we can hope for is a linear growth in dmin with n. For binary LDPC codes, the necessary and sufficient conditions on the LDPC ensemble parameters, to ensure...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- CoRR
دوره abs/1705.07785 شماره
صفحات -
تاریخ انتشار 2017