Analytical lower bounds for the size of elementary trapping sets of variable-regular LDPC codes with any girth and irregular ones with girth 8

Abstract

In this paper we give lower bounds on the size of (a,b) elementary trapping sets (ETSs) belonging to variable-regular LDPC codes with any girth, g, and irregular ones with girth 8, where a is the size, b is the number of degree-one check nodes and satisfy the inequality ba<1. Our proposed lower bounds are analytical, rather than exhaustive search-based, and based on graph theories. The numerical results in the literarture for g=6,8 for variable-regular LDPC codes match our results. Some of our investigations are independent of the girth and rely on the variables a, b and γ, the column weight value, only. We prove that for an ETS belonging to a variable-regular LDPC code with girth 8 we have a≥2γ-1 and b≥γ. We demonstrate that these lower bounds are tight, making use of them we provide a method to achieve the minimum size of ETSs belonging to irregular LDPC codes with girth 8 specially those whose column weight values are a subset of \2,3,4,5,6\. Moreover, we show for variable-regular LDPC codes with girth 10, a≥(γ-1)2+1. And for γ=3,4 we obtain a≥7 and a≥12, respectively. Finally, for variable-regular LDPC codes with girths g=2(2k+1) and g=2(2k+2) we obtain a≥(γ-2)k+1 and a≥2(γ-2)k+1, respectively.