GTJun 8

Efficiently Restructuring Sovereign Debt via Arctic Auctions with Convex Costs

Jugal Garg, Edwin Lock, Vijay V. Vazirani
arXiv:2606.09631v17.6
Predicted impact top 65% in GT · last 90 daysOriginality Incremental advance
AI Analysis

This work provides a computational foundation for market designs with sophisticated seller preferences, addressing a gap in Fisher market algorithms for sovereign debt restructuring.

The paper develops the first polynomial-time algorithm for computing competitive equilibria in Arctic product-mix auctions with separable, stepwise-increasing marginal costs, a setting relevant to sovereign debt restructuring. It proves that rational inputs yield rational-valued equilibria.

We study the problem of computing competitive equilibria in the Arctic product-mix auction, originally developed for the Icelandic government for exchanging blocked financial accounts, and more recently proposed by IMF staff for sovereign debt restructuring. From the buyers' perspective, the Arctic auction is equivalent to the quasi-linear Fisher market. However, unlike the standard Fisher model, the seller can express rich supply preferences through explicit supply-side costs and constraints. Despite extensive algorithmic literature on Fisher markets, the seller side has not received much attention, and no polynomial-time algorithm was previously known for computing competitive equilibrium when sellers face nontrivial costs. We examine the natural and expressive regime of separable, stepwise-increasing marginal costs that underlie the above-stated applications. Using polyhedral theory techniques, we first show that rational inputs lead to rational-valued competitive equilibria. Motivated by this result, we develop the first polynomial-time algorithm for this setting based on a non-trivial extension of classic primal-dual balanced-flow techniques for linear Fisher markets. Our work provides a robust computational foundation for auctions with sophisticated preferences, paving the way for flexible and institutionally feasible market designs in global finance.

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