International Association for Cryptologic Research

International Association
for Cryptologic Research

IACR News item: 21 March 2016

Ivica Nikolic, Yu Sasaki
ePrint Report ePrint Report
We study two open problems proposed by Wagner in his seminal work on the generalized birthday problem. First, with the use of multicollisions, we improve Wagner's $3$-tree algorithm. The new 3-tree only slightly outperforms Wagner's 3-tree, however, in some applications this suffices, and as a proof of concept, we apply the new algorithm to slightly reduce the security of two CAESAR proposals. Next, with the use of multiple collisions based on Hellman's table, we give improvements to the best known time-memory tradeoffs for the k-tree. As a result, we obtain the a new tradeoff curve T^2 \cdot M^{\lg k -1} = k \cdot N. For instance, when k=4, the tradeoff has the form T^2 M = 4 \cdot N.
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