TY - JOUR
T1 - On strict convexity and continuous differentiability of potential functions in optimal transportation
AU - Trudinger, Neil S.
AU - Wang, Xu Jia
PY - 2009/6
Y1 - 2009/6
N2 - This note concerns the relationship between conditions on cost functions and domains, the convexity properties of potentials in optimal transportation and the continuity of the associated optimal mappings. In particular, we prove that if the cost function satisfies the condition (A3), introduced in our previous work with Xinan Ma, the densities and their reciprocals are bounded and the target domain is convex with respect to the cost function, then the potential is continuously differentiable and its dual potential strictly concave with respect to the cost function. Our results extend, by different and more direct proof, similar results of Loeper proved by approximation from our earlier work on regularity.
AB - This note concerns the relationship between conditions on cost functions and domains, the convexity properties of potentials in optimal transportation and the continuity of the associated optimal mappings. In particular, we prove that if the cost function satisfies the condition (A3), introduced in our previous work with Xinan Ma, the densities and their reciprocals are bounded and the target domain is convex with respect to the cost function, then the potential is continuously differentiable and its dual potential strictly concave with respect to the cost function. Our results extend, by different and more direct proof, similar results of Loeper proved by approximation from our earlier work on regularity.
UR - http://www.scopus.com/inward/record.url?scp=66149185509&partnerID=8YFLogxK
U2 - 10.1007/s00205-008-0147-z
DO - 10.1007/s00205-008-0147-z
M3 - Article
SN - 0003-9527
VL - 192
SP - 403
EP - 418
JO - Archive for Rational Mechanics and Analysis
JF - Archive for Rational Mechanics and Analysis
IS - 3
ER -