Name
Titov Georgy Nikolaevich
Scholastic degree
•
Academic rank
associated professor
Honorary rank
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Organization, job position
Kuban State University
Web site url
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Articles count: 3
The article considers one of the approaches to organizing and conducting remote online Olympiads for schoolchildren with the use of information and communication technologies. A detailed description of the network resource of the municipal Internet Olympiad for schoolchildren conducted among the pupils of the secondary schools of the city of Krasnodar is given, the structure of the main content, the scheme of interaction with the user is shown, and also the created tools of the Internet designer of the Olympiads are described. The article describes the results of the implementation of this project in the educational system of Krasnodar and gives a quantitative analysis
Partially ordered set is a basic concept of modern settheoretic
mathematics. The problem of linear set
ordering with given binary relations is well-known.
Every partial order over a finite set can be linearly
ordered, but not every binary relation over this set can
be linearly ordered as well. Up to now, there is no
known formula for calculating the number of partial
orders over a given finite set. It appears that there is a
formula for calculating linearly ordered binary
relations over a finite set. This article is concerned
with derivation of this formula. The fact from work of
G.N. Titov [9] that a binary relation over a finite set is
linearly ordered if and only if any diagonal block,
derived from the binary relation matrix as a result of
setting main diagonal elements to zero, contains at
least one zero row (diagonal block of matrix means
any matrix composed of elements at the crossings of
rows and columns of a given matrix with the same
numbers), plays a key role in process of corroboration.
The main conclusion of the article is a theorem that
allows to find the number of linearly ordered binary
relations over a set of n elements using the formula. A
recurrence formula for the number of linearly ordered
(irreflexive) binary relations over a finite set of n
elements, provided in the lemma, was derived as well
There is a widely known problem regarding the
ordering of the partially ordered sets (Linear Ordering
Problem). It boils down to finding the numerations of
such sets. The main result of this article is a
generalization of one of the known S. S. Kislitsyn's
results about finding the number of numerations of
finite partially ordered sets