Zobrazeno 1 - 10
of 25
pro vyhledávání: '"Michael Zarichnyi"'
Autor:
Michael Zarichnyi, N. Mazurenko
Publikováno v:
Karpatsʹkì Matematičnì Publìkacìï, Vol 10, Iss 1, Pp 172-178 (2018)
The idempotent mathematics is a part of mathematics in which arithmetic operations in the reals are replaced by idempotent operations. In the idempotent mathematics, the notion of idempotent measure (Maslov measure) is a counterpart of the notion of
Publikováno v:
Topology and its Applications. 227:102-110
In their previous paper [7] , the authors introduced the straight (non-game-theoretic) counterpart of the finite decomposition complexity defined by E. Guentner, R. Tessera, G. Yu. In the present paper, we correct a proof of a statement from [7] that
Autor:
Michael Zarichnyi, O. R. Nykyforchyn
Publikováno v:
Fundamenta Mathematicae. 211:1-13
Autor:
Michael Zarichnyi, A. Savchenko
Publikováno v:
Topology and its Applications. 157:724-729
We consider ultrametrizations of free topological groups of ultrametric spaces. A construction is defined that determines a functor in the category UMET 1 of ultrametric spaces of diameter ⩽1 and nonexpanding maps. This functor is the functorial pa
Publikováno v:
Topology and its Applications. 157(1):136-144
We investigate certain geometric properties of the spaces of idempotent measures. In particular, we prove that the space of idempotent measures on an infinite compact metric space is homeomorphic to the Hilbert cube.
Publikováno v:
Topology. 48:186-196
Given an ordinal α and a pointed topological space X , we endow X α = ∪ { X β : β α } with the strongest topology that coincides with the product topology on every subset X β of X α , β α . It turns out that many important model spaces of
Autor:
O. R. Nykyforchyn, Michael Zarichnyi
Publikováno v:
Sbornik: Mathematics. 199:159-184
Spaces of upper-semicontinuous capacities on compacta are studied. It is proved that the capacity functor defines a monad in the category of compacta containing the monad of inclusion hyperspaces as a submonad. In addition, a metrization of the space
Autor:
Michael Zarichnyi, Roman Kozhan
Publikováno v:
Economic Theory. 35:321-331
This paper provides a formal generalization of Nash equilibrium for games under Knightian uncertainty. The paper is devoted to counterparts of the results of Glycopantis and Muir (Econ Theory 13:743–751, l999, Econ Theory 16:239–244, 2000) for ca
Autor:
Michael Zarichnyi
Publikováno v:
Journal of Physical Studies. 11:34-40
Autor:
A. Savchenko, Michael Zarichnyi
Publikováno v:
Matematychni Studii. 43