Coding and information theory
On codes with the identifiable parent property
Journal of Combinatorial Theory Series A
On the Maximal Codes of Length 3 with the 2-Identifiable Parent Property
SIAM Journal on Discrete Mathematics
New Bounds on Parent-Identifying Codes: The Case of Multiple Parents
Combinatorics, Probability and Computing
Combinatorial properties of frameproof and traceability codes
IEEE Transactions on Information Theory
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Let $$\mathcal{C}$$ be a q-ary code of length n and $$X \subseteq \mathcal{C}$$ , then d is called a descendant of X if d i 驴 {x i : x 驴X} for all 1 驴 i 驴 n. $$\mathcal{C}$$ is said to be a w-identifiable parent property code (w-IPP code for short) if whenever d is a descendant of w (or fewer) codewords, one can always identify at least one of the parent codewords in $$\mathcal{C}$$ . In this paper, we give constructions for w-IPP codes of length w + 1. Furthermore, we show that F w (w + 1,q), the maximum cardinality of a w-IPP q-ary code of length w + 1, satisfies $$|\fancyscript{G}_{h(q)}| \leq F_{w}(w+1,q) \leq |\fancyscript{G}_{h(q)}|+6$$ , where $$\fancyscript{G}_{h(q)}$$ is a well-defined code graph. Finally, we give an efficient (O(q w+1)) algorithm to find the values of F w (w + 1,q).