First International Topological Conference information

The First International Topological Conference was held in Moscow, 4–10 September, 1935. With presentations by topologists from 10 different countries...

He introduced the notion of proximity spaces at the First International Topological Conference in Moscow in 1935. He was imprisoned from 1937 to 1944, and...

In computer science, a topological sort or topological ordering of a directed graph is a linear ordering of its vertices such that for every directed...

He was a student of Pavel Aleksandrov. He attended the First International Topological Conference in Moscow, 1935 as a host but made no presentation. Apushkinskaya...

of the Moscow Mathematical Society. She attended the First International Topological Conference, Moscow, 1935. Różańska, J. (1926). "Über stetige Kurven"...

between transonic and supersonic speeds. He attended the First International Topological Conference held in Moscow in 1935. In 1957 he was awarded the Leonhard...

In applied mathematics, topological data analysis (TDA) is an approach to the analysis of datasets using techniques from topology. Extraction of information...

material. But in a topological insulator, these bands are, in an informal sense, "twisted", relative to a trivial insulator. The topological insulator cannot...

higher dimensions than one, the term topological gradient is also used to name the first-order term of the topological asymptotic expansion, dealing only...

called the vertices and the edges of the topological graph. It is usually assumed that any two edges of a topological graph cross a finite number of times...

numbering is a topological order, and any topological order is a correct numbering. Thus, any algorithm that derives a correct topological order derives...

POLYVRT (Harvard University, 1976). The strategy of the topological data model is to store topological relationships (primarily adjacency) between features...

f^{k}(U)\cap V\neq \emptyset } . Topological transitivity is a weaker version of topological mixing. Intuitively, if a map is topologically transitive then given...

cellular embeddings include the ribbon graph, a topological space formed by gluing together topological disks for the vertices and edges of an embedded...

theoretical physicist known for his contributions to string theory, topological quantum field theory, and various areas of mathematics. He is a professor...

The International Conference on Low Temperature Physics (LT) is an academic conference held every three years near the month of September attracting on...

quantum double models. It is also the simplest example of topological order—Z2 topological order (first studied in the context of Z2 spin liquid in 1991). The...

models for mathematical chemistry are molecular graph and topological index. In 2005 the International Academy of Mathematical Chemistry (IAMC) was founded...

curve map is not a homeomorphism, so it does not preserve topological dimension. The topological dimension and Hausdorff dimension of the image of the Hilbert...

uniquely defined dimension of every connected topological manifold can be calculated. A connected topological manifold is locally homeomorphic to Euclidean...

A graph H is called a topological minor of a graph G if a subdivision of H is isomorphic to a subgraph of G. Every topological minor is also a minor....

heterotic string theory. GUT models generically predict the existence of topological defects such as monopoles, cosmic strings, domain walls, and others....

Research efforts are ongoing to jumpstart quantum computing through topological and photonic approaches as well. Computer engineers typically describe...

low-dimensional representations of high-dimensional data while preserving the topological structure of the data. They are trained using competitive learning. SOMs...