2 results
Search Results
Now showing 1 - 2 of 2
Item Open Access Mathematics for Computer Science(Kaskelen, Suleyman demirel university - 2015, 2015) Bagisbayev K.Abstract."Mathematics for Computer Science" is a comprehensive course that explores the essential mathematical concepts and principles underpinning the field of computer science. This abstract provides an overview of the key components and objectives of the course. In the ever-evolving world of technology, computer science is at the forefront of innovation. This course seeks to bridge the gap between computer science theory and its mathematical foundations. It begins with a review of fundamental mathematical concepts, including algebra, calculus, discrete mathematics, and logic. The course then delves into more specialized topics such as linear algebra, graph theory, probability and statistics, and number theory. These mathematical tools are crucial for solving complex computational problems, analyzing algorithms, and understanding data structures. Throughout the course, students will not only gain a deep understanding of the mathematical principles but also learn to apply them to practical computer science problems. The emphasis is on hands-on problem-solving, coding, and algorithm development.Item Open Access Variety of Bicommutative Algebras defined by identity(Faculty of Engineering and Natural Science, 2022) Makhasheva A.One of the important questions in modern algebra is to study algebras satisfying certain identities. There are two questions in the theory of polynomial identities. The first is to describe an algebra by a defined identity. The second is to describe identities in algebra. The study of identities will help us in the construction of basis of free algebra, in the study of the Hilbert sequence, the Specht problem and problems of the finite basis. In this work, we used two different research methods. First, the theory of representations of symmetric groups. Second, the theory of representations of linear groups. In this research paper, we have completely described the subvariety of variety of bicommutative algebras defined by the identity α[(ab)c+(ba)c+(ca)b]+β[a(bc)+a(cb)+b(ca)]=0.