# Category:Variational analysis

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Here is a list of articles in the Variational analysis category of the Computing portal that unifies foundations of mathematics and computations using computers.

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Following the book *Variational Analysis* by Rockafellar and Wets, the term "**variational analysis**" denotes an extension of the classic calculus of variations and convex analysis to more general problems of optimization theory, including topics in set-valued analysis, e.g. generalized derivatives.^{[1]} In the Mathematics Subject Classification scheme (MSC2010), the field of "Set-valued and variational analysis" is coded by "49J53".^{[2]}

- ↑
R. Tyrrell Rockafellar, Roger J-B Wets,
*Variational Analysis*, Springer-Verlag, 2005, ISBN:3540627723, ISBN:978-3540627722 - ↑ "49J53 Set-valued and variational analysis". 5 July 2010. http://www.ams.org/mathscinet/msc/msc2010.html?t=49Jxx&btn=Current.

## Subcategories

This category has the following 3 subcategories, out of 3 total.

### C

### G

### V

## Pages in category "Variational analysis"

The following 11 pages are in this category, out of 11 total.

- Variational analysis
*(computing)*

### C

- Convex analysis
*(computing)*

### D

- Differential inclusion
*(computing)*

### E

- Epigraph (mathematics)
*(computing)*

### F

- Functional derivative
*(computing)*

### G

- Γ-convergence
*(computing)*

### H

- Hemicontinuity
*(computing)*

### M

- Minkowski addition
*(computing)* - Mosco convergence
*(computing)*

### S

- Semi-continuity
*(computing)* - Subderivative
*(computing)*