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What (who) is combinatorial homotopy - definition
UNIVERSAL BUNDLE DEFINED ON A CLASSIFYING SPACE
Homotopy quotient; Homotopy orbit space
Combinatorial chemistry
CHEMICAL METHODS DESIGNED TO RAPIDLY SYNTHESIZE LARGE NUMBERS OF CHEMICAL COMPOUNDS
Combinatorial Chemistry; Combichem; Combinational chemistry; Combinatorial libraries; Combinatorial library; Combinatorial synthesis; High-throughput chemistry; Combinatorial chemistry techniques
Combinatorial chemistry comprises chemical synthetic methods that make it possible to prepare a large number (tens to thousands or even millions) of compounds in a single process. These compound libraries can be made as mixtures, sets of individual compounds or chemical structures generated by computer software.
Combinatorial principles
COMBINATORIAL METHODS USED IN COMBINATORICS, A BRANCH OF MATHEMATICS
Combinatorial principle; Combinatorial methods; Counting principle; Counting principles
In proving results in combinatorics several useful combinatorial rules or combinatorial principles are commonly recognized and used.
Homotopy
![isotopy]].](https://commons.wikimedia.org/wiki/Special:FilePath/Mug and Torus morph.gif?width=200 "isotopy]].")
CONTINUOUS DEFORMATION BETWEEN TWO CONTINUOUS MAPS
Homotopic; Homotopy equivalent; Homotopy equivalence; Homotopy invariant; Homotopy class; Null-homotopic; Homotopy type; Nullhomotopic; Homotopy invariance; Homotopy of maps; Homotopically equivalent; Homotopic maps; Homotopy of paths; Homotopical; Homotopy classes; Null-homotopy; Null homotopy; Nullhomotopic map; Null homotopic; Relative homotopy; Homotopy retract; Continuous deformation; Relative homotopy class; Homotopy-equivalent; Homotopy extension and lifting property; Isotopy (topology); Homotopies
In topology, a branch of mathematics, two continuous functions from one topological space to another are called homotopic (from "same, similar" and "place") if one can be "continuously deformed" into the other, such a deformation being called a homotopy (, ; , ) between the two functions. A notable use of homotopy is the definition of homotopy groups and cohomotopy groups, important invariants in algebraic topology.
Wikipedia
Universal bundle
In mathematics, the universal bundle in the theory of fiber bundles with structure group a given topological group G, is a specific bundle over a classifying space BG, such that every bundle with the given structure group G over M is a pullback by means of a continuous map M → BG.
