Presents polynomial-time algorithms for 2D forecasting with Õ(√(kT)) swap regret and extensions to higher dimensions with Õ(d√(kT)) bounds, improving prior regret and runtime results.
Mathematika , author=
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
years
2026 2verdicts
UNVERDICTED 2representative citing papers
Frobenius identities for the volume map on Cohen-Macaulay rings give sufficient conditions for anisotropy and Hard Lefschetz in Gorenstein quotients and deduce the g-theorem for simplicial spheres plus the Ohsugi-Hibi conjecture.
citing papers explorer
-
Improved Multi-Dimensional Forecasting for Swap Regret
Presents polynomial-time algorithms for 2D forecasting with Õ(√(kT)) swap regret and extensions to higher dimensions with Õ(d√(kT)) bounds, improving prior regret and runtime results.
-
Frobenius identities for the volume map on Cohen--Macaulay rings
Frobenius identities for the volume map on Cohen-Macaulay rings give sufficient conditions for anisotropy and Hard Lefschetz in Gorenstein quotients and deduce the g-theorem for simplicial spheres plus the Ohsugi-Hibi conjecture.