Condensed mathematics information

Condensed mathematics is a theory developed by Dustin Clausen [de] and Peter Scholze which aims to unify various mathematical subfields, including topology...

are at the heart of the project of condensed mathematics, which aims to replace topological spaces with "condensed sets", where a topological space X...

subject deals with condensed phases of matter: systems of many constituents with strong interactions among them. More exotic condensed phases include the...

The concept of a liquid vector space is part of condensed mathematics. Liquid vector spaces are an alternative to topological vector spaces. "liquid vector...

crystalline cohomology. Scholze and Dustin Clausen proposed a program for condensed mathematics. In 2012, he was awarded the Prix and Cours Peccot. He was awarded...

The Lucasian Chair of Mathematics (/luːˈkeɪziən/) is a mathematics professorship in the University of Cambridge, England; its holder is known as the Lucasian...

of condensed phases are solids and liquids, which arise from the bonding by way of the electromagnetic force between atoms. More exotic condensed phases...

formula is a concise way of expressing information symbolically, as in a mathematical formula or a chemical formula. The informal use of the term formula in...

the "7 series" (condensed versions), e.g. 57 Medium Condensed etc., and the "8 series" (condensed italics), e.g. 68 Bold Condensed Italics. From this...

Greek words τόπος, 'place, location', and λόγος, 'study') is the part of mathematics concerned with the properties of a geometric object that are preserved...

Sometimes a chemical formula is complicated by being written as a condensed formula (or condensed molecular formula, occasionally called a "semi-structural formula")...

mathematical physics, but focuses particularly in analysis related to condensed matter physics, statistical mechanics and quantum field theory, and in...

In the system of Greek numerals, it has a value of 200. In general mathematics, uppercase Σ is used as an operator for summation. When used at the end...

Type of topological vector space Liquid vector space – Concept in condensed mathematics Normed space – Vector space on which a distance is definedPages...

phases in condensed matter and non-supersymmetric dualities in field theories that, among other things, are of high relevance in condensed matter theory...

High Energy, Cosmology and Astroparticle Physics Condensed Matter and Statistical Physics Mathematics Earth System Physics Science, Technology and Innovation...

x-height, short descenders to allow tight linespacing and a relatively condensed appearance. (Although Hutt, and most other authors, describe Times New...

Superconductivity Josephson junction, led by Brian Pippard Theory of Condensed Matter, which is the dominant theoretical group. Electron Microscopy Group...

more recently by the notion of topological phases in condensed matter physics), and, on the mathematics side, often involve deep relations to infinite-dimensional...

cosmology, nuclear physics, and condensed matter physics, and it has stimulated a number of major developments in pure mathematics. Because string theory potentially...

of Mathematics (PoM) is a 1903 book by Bertrand Russell, in which the author presented his famous paradox and argued his thesis that mathematics and...

Grothendieck universes, whereas condensed mathematics can be developed strictly within ZFC. "Clark Barwick | School of Mathematics". www.maths.ed.ac.uk. Retrieved...

theoretical condensed matter. The 1960s and 70s saw the formulation of the Standard model of particle physics using QFT and progress in condensed matter physics...

force fields; vibrational-rotational motion; equilibrium properties of condensed-phase systems and macro-molecules. Chemical dynamics includes: bimolecular...

Some condensed matter systems contain effective (non-isolated) magnetic monopole quasi-particles, or contain phenomena that are mathematically analogous...

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