The paper proposes a semi-relaxed IB model by relaxing the Markov chain and transition probability constraints from the original IB formulation. Based on this semi-relaxed model, the authors develop an Alternating Bregman Projection (ABP) algorithm that recovers the relaxed constraints through an alternating minimization framework.
The key highlights of the paper are:
The semi-relaxed IB model simplifies the structure of the mutual information constraints and the objective function, while proving the equivalence of the solution to the original IB model.
The ABP algorithm involves only closed-form iterations in updating the primal variables, ensuring computational efficiency. The descent of the objective function can be precisely estimated in each iteration, leading to provable convergence guarantees.
Numerical experiments on classical distributions and a real-world dataset demonstrate that the proposed ABP algorithm outperforms existing methods in terms of computational efficiency and accuracy, especially in cases with phase transition phenomena.
The convergence analysis shows that the sequence generated by the ABP algorithm converges to a local minimum of the semi-relaxed IB model.
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