Maximizing Entropy over Markov Processes

Fabrizio Biondi, Andrzej Wasowski, Axel Legay, Bo Friis Nielsen

Research output: Journal Article or Conference Article in JournalJournal articleResearchpeer-review

Abstract

The channel capacity of a deterministic system with confidential data is an upper bound on the amount of bits of data an attacker can learn from the system. We encode all possible attacks to a system using a probabilistic specification, an Interval Markov Chain. Then the channel capacity computation reduces to finding a model of a specification with highest entropy.

Entropy maximization for probabilistic process specifications has not been studied before, even though it is well known in Bayesian inference for discrete distributions. We give a characterization of global entropy of a process as a reward function, a polynomial algorithm to verify the existence of a system maximizing entropy among those respecting a specification, a procedure for the maximization of reward functions over Interval Markov Chains and its application to synthesize an implementation maximizing entropy.

We show how to use Interval Markov Chains to model abstractions of deterministic systems with confidential data, and use the above results to compute their channel capacity. These results are a foundation for ongoing work on computing channel capacity for abstractions of programs derived from code.
Original languageEnglish
Book seriesLecture Notes in Computer Science
Volume7810
Pages (from-to)128-140
ISSN0302-9743
Publication statusPublished - 2013

Keywords

  • Channel Capacity
  • Deterministic Systems
  • Confidential Data
  • Interval Markov Chains
  • Entropy Maximization

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