An Extremum Principle for Smooth Problems
We derive an extremum principle. It can be treated as an intermediate result between the celebrated smooth-convex extremum principle due to Ioffe and Tikhomirov and the Dubovitskii–Milyutin theorem. The proof of this principle is based on a simple generalization of the Fermat’s theorem, the smooth-c...
Main Authors: | Dariusz Idczak, Stanisław Walczak |
---|---|
Format: | Article |
Language: | English |
Published: |
MDPI AG
2020-11-01
|
Series: | Games |
Subjects: | |
Online Access: | https://www.mdpi.com/2073-4336/11/4/56 |
Similar Items
- The converse of Fermat's theorem
-
Multiplicative polynomials and Fermat's little theorem for non-primes
by: Paul Milnes, et al.
Published: (1997-01-01) -
The Proof of the Fermat’s Conjecture in the Correct Domain
by: Saimir A. Lolja
Published: (2018-12-01) -
The effect of the group structure of a group Q on its non-cancellation set
by: Lubisi, Elliot
Published: (2018) -
Lagrange problem for fractional ordinary elliptic system via Dubovitskii–Milyutin method
by: Dariusz Idczak, et al.
Published: (2020-03-01)