TY - JOUR
T1 - Rearrangements and polar factorisation of countably degenerate functions
AU - Burton, G. R.
AU - Douglas, R. J.
N1 - Funding Information:
The authors are grateful for the hospitality and support of the Isaac Newton Institute for Mathematical Sciences, where this research was conducted during the programme Mathematics of Atmosphere and Ocean Dynamics. The second author's research was supported by EPSRC Research Fellow Grant no. 21409 MTA S08.
Copyright:
Copyright 2017 Elsevier B.V., All rights reserved.
PY - 1998
Y1 - 1998
N2 - This paper proves some extensions of Brenier's theorem that an integrable vector-valued function u, satisfying a nondegeneracy condition, admits a unique polar factorisation u = u# ° s. Here u# is the monotone rearrangement of u, equal to the gradient of a convex function almost everywhere on a bounded connected open set Y with smooth boundary, and s is a measure-preserving mapping. We show that two weaker alternative hypotheses are sufficient for the existence of the factorisation; that u# be almost injective (in which case s is unique), or that u be countably degenerate (which allows u to have level sets of positive measure). We allow Y to be any set of finite positive Lebesgue measure. Our construction of the measure-preserving map s is especially simple.
AB - This paper proves some extensions of Brenier's theorem that an integrable vector-valued function u, satisfying a nondegeneracy condition, admits a unique polar factorisation u = u# ° s. Here u# is the monotone rearrangement of u, equal to the gradient of a convex function almost everywhere on a bounded connected open set Y with smooth boundary, and s is a measure-preserving mapping. We show that two weaker alternative hypotheses are sufficient for the existence of the factorisation; that u# be almost injective (in which case s is unique), or that u be countably degenerate (which allows u to have level sets of positive measure). We allow Y to be any set of finite positive Lebesgue measure. Our construction of the measure-preserving map s is especially simple.
UR - http://www.scopus.com/inward/record.url?scp=22044456113&partnerID=8YFLogxK
U2 - 10.1017/S0308210500021703
DO - 10.1017/S0308210500021703
M3 - Article
AN - SCOPUS:22044456113
SN - 0308-2105
VL - 128
SP - 671
EP - 681
JO - Royal Society of Edinburgh - Proceedings A
JF - Royal Society of Edinburgh - Proceedings A
IS - 4
ER -