A new constrained optimal transport duality is established and used to prove equilibrium existence in large indivisible-goods markets while correcting a flaw in Azevedo et al. (2013).
Princeton University Press, Princeton, NJ
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
citation-role summary
background 1
citation-polarity summary
years
2026 3verdicts
UNVERDICTED 3roles
background 1polarities
unclear 1representative citing papers
Using optimality conditions from the second-service rule and a structural model on tennis data, the paper shows players value process utility positively and systematically trade off outcome probabilities for it.
Quaternion Hankel matrices have equal left and right ranks and correspond to linear recurrence relations with quaternion coefficients.
citing papers explorer
-
Constrained optimal transport with an application to large markets with indivisible goods
A new constrained optimal transport duality is established and used to prove equilibrium existence in large indivisible-goods markets while correcting a flaw in Azevedo et al. (2013).
-
Process Utility in High-Stakes Competition
Using optimality conditions from the second-service rule and a structural model on tennis data, the paper shows players value process utility positively and systematically trade off outcome probabilities for it.
-
On the rank of quaternion Hankel matrices
Quaternion Hankel matrices have equal left and right ranks and correspond to linear recurrence relations with quaternion coefficients.