Temat: Ramsey's problem - Katalog OPAC zbiorów

Skocz do pozycji: 1.

Tytuł:: Hamiltonian trajectories and saddle points in mathematical economics
Autorzy:: Rockafellar, R. T.
Powiązania:: https://bibliotekanauki.pl/articles/970735.pdf
Data publikacji:: 2009
Wydawca:: Polska Akademia Nauk. Instytut Badań Systemowych PAN
Tematy:: infinite horizon optimal control
convex Lagrange problems
Hamiltonian saddle points
overtaking criteria
Ramsey's problem
economic growth
Opis:: Infinite-horizon problems of kinds that arise in macroeconomic applications present a challenge in optimal control which has only partially been met. Results from the theory of convex problems of Lagrange can be utilized, to some extent, the most interesting feature being that in these problems the analysis revolves about a rest point of the Hamiltonian, which is at the same time a saddle point of the Hamiltonian in the minimax sense. The prospect is that in this situation the Hamiltonian dynamical system exhibits saddle point behavior in the differential equation sense as well. Some results are provided in this direction and coordinated with notions of asymptotic optimization, which mathematical economists have worked with.
Źródło:: Control and Cybernetics; 2009, 38, 4B; 1575-1588
0324-8569
Pojawia się w:: Control and Cybernetics
Dostawca treści:: Biblioteka Nauki

Artykuł

Skocz do pozycji: 2.

Tytuł:: Almost-Rainbow Edge-Colorings of Some Small Subgraphs
Autorzy:: Krop, Elliot
Krop, Irina
Powiązania:: https://bibliotekanauki.pl/articles/30097998.pdf
Data publikacji:: 2013-09-01
Wydawca:: Uniwersytet Zielonogórski. Wydział Matematyki, Informatyki i Ekonometrii
Tematy:: Ramsey theory
generalized Ramsey theory
rainbow-coloring
edge-coloring
Erdös problem
Opis:: Let $ f(n, p, q) $ be the minimum number of colors necessary to color the edges of $ K_n $ so that every $ K_p $ is at least $ q $-colored. We improve current bounds on these nearly “anti-Ramsey” numbers, first studied by Erdös and Gyárfás. We show that $ f(n, 5, 0) \ge \frac{7}{4} n - 3 $, slightly improving the bound of Axenovich. We make small improvements on bounds of Erdös and Gyárfás by showing $ \frac{5}{6} n + 1 \leq f(n,4,5) $ and for all even $ n ≢ 1(\text{mod } 3) $, $ f(n, 4, 5) \leq n−1 $. For a complete bipartite graph $ G= K_{n,n}$, we show an $n$-color construction to color the edges of $ G $ so that every $ C_4 ⊆ G $ is colored by at least three colors. This improves the best known upper bound of Axenovich, Füredi, and Mubayi.
Źródło:: Discussiones Mathematicae Graph Theory; 2013, 33, 4; 771-784
2083-5892
Pojawia się w:: Discussiones Mathematicae Graph Theory
Dostawca treści:: Biblioteka Nauki

Artykuł

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