English

Maximal monotone operators are selfdual vector fields and vice-versa

Analysis of PDEs 2007-05-23 v1

Abstract

If LL is a selfdual Lagrangian LL on a reflexive phase space X×XX\times X^*, then the vector field xˉL(x):={pX;(p,x)L(x,p)}x\to \bar\partial L(x):=\{p\in X^*; (p,x)\in \partial L(x,p)\} is maximal monotone. Conversely, any maximal monotone operator TT on XX is derived from such a potential on phase space, that is there exists a selfdual Lagrangian LL on X×XX\times X^* (i.e, L(p,x)=L(x,p)L^*(p, x) =L(x, p)) such that T=ˉLT=\bar\partial L. This solution to problems raised by Fitzpatrick can be seen as an extension of a celebrated result of Rockafellar stating that maximal cyclically monotone operators are actually of the form T=ϕT=\partial \phi for some convex lower semi-continuous function on XX. This representation allows for the application of the selfdual variational theory --recently developed by the author-- to the equations driven by maximal monotone vector fields. Consequently, solutions to equations of the form ΛxTx\Lambda x\in Tx for a given map Λ:D(Λ)XX\Lambda: D(\Lambda)\subset X\to X^*, can now be obtained by minimizing functionals of the form I(x)=L(x,Λx)<x,Λx>I(x)=L(x,\Lambda x)-< x, \Lambda x>.

Keywords

Cite

@article{arxiv.math/0610494,
  title  = {Maximal monotone operators are selfdual vector fields and vice-versa},
  author = {Nassif Ghoussoub},
  journal= {arXiv preprint arXiv:math/0610494},
  year   = {2007}
}

Comments

8 pages. Updated versions --if any-- of this author's papers can be downloaded at http://www.pims.math.ca/~nassif/