Combining this with (18) yields dir X ⋆ r (C) ⊊dir X ⋆(C) , and thusdim dir(X ⋆(C))>dim dir(X ⋆ r (C))

On the other hand, every u∈dir X ⋆ r (C) satisfies ur = 0, therefore v /∈dir X ⋆ r (C) · 2025

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Learning Decision-Sufficient Representations for Linear Optimization

math.OC · 2026-03-19 · unverdicted · novelty 7.0

Proves NP-hardness of computing decision-relevant dimension d* and coNP-hardness of global sufficiency in linear optimization, then gives poly-time pointwise algorithms, a cumulative compression scheme of size at most d*, and PAC bounds scaling with d* for contextual linear optimization.

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Learning Decision-Sufficient Representations for Linear Optimization math.OC · 2026-03-19 · unverdicted · none · ref 10
Proves NP-hardness of computing decision-relevant dimension d* and coNP-hardness of global sufficiency in linear optimization, then gives poly-time pointwise algorithms, a cumulative compression scheme of size at most d*, and PAC bounds scaling with d* for contextual linear optimization.

Combining this with (18) yields dir X ⋆ r (C) ⊊dir X ⋆(C) , and thusdim dir(X ⋆(C))>dim dir(X ⋆ r (C))

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