Subdifferential
of a convex function 
at a point 
, defined on a space 
that is in duality with a space 
The set in 
defined by:
 |
For example, the subdifferential of the norm 
in a normed space 
with dual space 
takes the form
 |
The subdifferential of a convex function 
at a point 
is a convex set. If 
is continuous at this point, then the subdifferential is non-empty and compact in the topology 
.
The role of the subdifferential of a convex function is similar to that of the derivative in classical analysis. Theorems for subdifferentials that are analogous to theorems for derivatives are valid. For example, if 
and 
are convex functions and if, at a point 
, at least one of the functions is continuous, then
 |
for all 
(the Moreau–Rockafellar theorem).
At the origin, the subdifferential of the support function of a convex set 
in 
that is compact in the topology 
coincides with the set 
itself. This expresses the duality between convex compact sets and convex closed homogeneous functions (see also Support function; Supergraph; Convex analysis).
References
| [1] | R.T. Rockafellar, "Convex analysis" , Princeton Univ. Press (1970) MR0274683 Zbl 0193.18401 |
Comments
The 
-topology is the weak topology on 
defined by the family of semi-norms 
, 
; this is the weakest topology which makes all the functionals 
continuous.
The elements 
are called subgradients of 
at 
.
References
| [a1] | R. Schneider, "Boundary structure and curvature of convex bodies" J. Tölke (ed.) J.M. Wills (ed.) , Contributions to geometry , Birkhäuser (1979) pp. 13–59 MR0568493 Zbl 0427.52003 |
| [a2] | V. Barbu, Th. Precupanu, "Convexity and optimization in Banach spaces" , Reidel (1986) pp. 101ff MR0860772 Zbl 0594.49001 |
Subdifferential. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Subdifferential&oldid=49456