Available in electronic format
Available in print format		 Transacrions of the American Mathematical Society
Transactions of the American Mathematical Society
ISSN 1088-6850(e) ISSN 0002-9947(p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues
Previous Article | Next Article
     

Integration of multivalued operators and cyclic submonotonicity

Author(s): Aris Daniilidis; Pando Georgiev; Jean-Paul Penot
Journal: Trans. Amer. Math. Soc. 355 (2003), 177-195.
MSC (2000): Primary 49J52, 47H05; Secondary 58C20
Posted: September 6, 2002
Retrieve article in: PDF DVI PostScript

Abstract | References | Similar articles | Additional information

Abstract: We introduce a notion of cyclic submonotonicity for multivalued operators from a Banach space $X$ to its dual. We show that if the Clarke subdifferential of a locally Lipschitz function is strictly submonotone on an open subset $U$ of $X$, then it is also maximal cyclically submonotone on $U$, and, conversely, that every maximal cyclically submonotone operator on $U$ is the Clarke subdifferential of a locally Lipschitz function, which is unique up to a constant if $U$ is connected. In finite dimensions these functions are exactly the lower C$^{1}$ functions considered by Spingarn and Rockafellar.

References:

1.
BIRGE, R. AND QI, L., Semi-regularity and generalized subdifferentials with applications to optimization, Math. Oper. Res. 18 (1993), 982-1005. MR 94h:49026

2.
BORWEIN, J. M., Minimal cuscos and subgradients of Lipschitz functions, in: Fixed Point Theory and its Applications, (J.-B. Baillon and M. Théra, eds.), Pitman Res. Notes in Math. Series, No. 252, Longman, Essex, (1991), 57-82. MR 92j:46077

3.
BORWEIN, J. AND MOORS, W., Essentially smooth Lipschitz functions, J. Funct. Anal. 149 (1997), 305-351. MR 98i:58028

4.
BORWEIN, J., MOORS, W. AND SHAO, Y., Subgradient representation of multifunctions, J. Austral. Math. Soc. (Series B) 40 (1998), 301-313. MR 2001b:49020

5.
BORWEIN, J. AND ZHU, Q., Multivalued and functional analytic techniques in nonsmooth analysis, (F. H. Clarke and R. J. Stern, eds.), Nonlinear Analysis, Differential Equations and Control (1999), 61-157. MR 2002a:49016

6.
CLARKE, F. H., Optimization and Nonsmooth Analysis, Wiley Interscience, New York (1983). MR 85m:49002

7.
CORREA, R. AND JOFRE, A., Tangentially continuous directional derivatives in nonsmooth analysis, J. Opt. Th. Appl. 61 (1989), 1-21. MR 90h:49009

8.
CORREA, R. AND THIBAULT, L., Subdifferential analysis of bivariate separately regular functions, J. Math. Anal. Appl. 148 (1990), 157-174. MR 91b:49018

9.
DANIILIDIS, A. AND HADJISAVVAS, N., On the subdifferentials of quasiconvex and pseudoconvex functions and cyclic monotonicity, J. Math. Anal. Appl. 237 (1999), 30-42. MR 2000h:49026

10.
GEORGIEV, P., Submonotone mappings in Banach spaces and differentiability of nonconvex functions, Compt. Rend. Acad. Bulg. Sci. 42 (1989), 13-16. MR 90k:58013

11.
GEORGIEV, P., Submonotone mappings in Banach spaces and applications, Set-Valued Analysis 5 (1997), 1-35. MR 98d:49021

12.
JANIN, R., Sur des multiapplications qui sont des gradients généralisés, C.R. Acad. Sci. Paris 294 (1982), 117-119. MR 83d:58013

13.
LEBOURG, G., Generic differentiability of Lipschitzian functions, Trans. Amer. Math. Soc. 256 (1979), 125-144. MR 80i:58012

14.
MIFFLIN, R., Semismooth and semiconvex functions in constrained optimization, SIAM J. Control Optim. 15 (1977), 959-972. MR 57:1541

15.
MOORS, W., A characterization of minimal subdifferential mappings of locally Lipschitz functions, Set-Valued Analysis 3 (1995), 129-141. MR 96e:58013

16.
PENOT, J.-P., Favorable classes of mappings and multimappings in nonlinear analysis and optimization, J. Convex Analysis 3 (1996), 97-116. MR 97i:90110

17.
POLIQUIN, R., Integration of subdifferentials of nonconvex functions, Nonlinear Analysis TMA 17 (1991), 385-398. MR 92i:49008

18.
PREISS, D., Differentiability of Lipschitz functions on Banach spaces, J. Functional Analysis 91 (1990), 312-345. MR 91g:46051

19.
QI, L., The maximal normal operator space and integration of subdifferentials of nonconvex functions, Nonlinear Analysis TMA 13 (1989), 1003-1011. MR 91a:90150

20.
ROCKAFELLAR, R. T., On the maximal monotonicity of subdifferential mappings, Pacific J. Math. 33 (1970), 209-216. MR 41:7432

21.
ROCKAFELLAR, R. T., ``Favorable classes of Lipschitz continuous functions in subgradient optimization'' in Nondifferentiable Optimization (1982), Nurminski E. (ed.), Pergamon Press, New York. MR 85e:90069

22.
ROCKAFELLAR, R. T. AND WETS, J.-B., Variational Analysis, Springer, New York (1998). MR 98m:49001

23.
PREISS, D., PHELPS, R. AND NAMIOKA, I., Smooth Banach spaces, weak Asplund spaces and monotone or USCO mappings, Israel J. Math. 72 (1990), 257-279. MR 92h:46021

24.
SPINGARN, J. E., Submonotone subdifferentials of Lipschitz functions, Trans. Amer. Math. Soc. 264 (1981), 77-89. MR 82g:26016

25.
THIBAULT, L. AND ZAGRODNY, D., Integration of subdifferentials of lower semi-continuous functions on Banach spaces, J. Math. Anal. Appl. 189 (1995), 33-58. MR 95i:49032

26.
WANG, X., Fine and pathological properties of subdifferentials, Ph.D. Dissertation (1999), Simon Fraser University, Vancouver, Canada.

27.
WU, Z. AND YE, J., Some results on integration of subdifferentials, Nonlinear Analysis TMA 39 (2000), 955-976. MR 2000k:49022

Similar Articles:

Retrieve articles in Transactions of the American Mathematical Society with MSC (2000): 49J52, 47H05, 58C20

Retrieve articles in all Journals with MSC (2000): 49J52, 47H05, 58C20

Additional Information:

Aris Daniilidis
Affiliation: Laboratoire de Mathématiques Appliquées, CNRS ERS 2055, Université de Pau et des Pays de l'Adour, avenue de l'Université, 64000 Pau, France
Address at time of publication: CODE - Edifici B, Universitat Autonoma de Barcelona, 08193 Bellaterra, Spain
Email: aris.daniilidis@univ-pau.fr

Pando Georgiev
Affiliation: Sofia University ``St. Kl. Ohridski'', Faculty of Mathematics and Informatics, 5 J. Bourchier Blvd., 1126 Sofia, Bulgaria
Address at time of publication: Laboratory for Advanced Brain Signal Processing, Brain Science Institute, The Institute of Physical and Chemical Research (RIKEN), 2-1, Hirosawa, Wako-shi, Saitama, 351-0198, Japan
Email: georgiev@bsp.brain.riken.go.jp

Jean-Paul Penot
Affiliation: Laboratoire de Mathématiques Appliquées, CNRS ERS 2055, Université de Pau et des Pays de l'Adour, avenue de l'Université, 64000 Pau, France
Email: jean-paul.penot@univ-pau.fr

DOI: 10.1090/S0002-9947-02-03118-5
PII: S 0002-9947(02)03118-5
Keywords: Integration, subdifferential, submonotone operator, subsmooth function
Received by editor(s): May 4, 2000
Posted: September 6, 2002
Additional Notes: The research of the first author was supported by the TMR grant ERBFMBI CT 983381
A major part of this work was accomplished while the second author was visiting the University of Pau under the NATO grant CB/JB SC105 N$^{0}$ 44/96165
Copyright of article: Copyright 2002, American Mathematical Society

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2008, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google