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What (who) is loop homotopy - definition
UNIVERSAL BUNDLE DEFINED ON A CLASSIFYING SPACE
Homotopy quotient; Homotopy orbit space
Loop, Indiana County, Pennsylvania
HUMAN SETTLEMENT IN WEST MAHONING TOWNSHIP, PENNSYLVANIA, UNITED STATES OF AMERICA
Sesha loop, pa; Sesha Loop, Pennsylvania; Loop, Pennsylvania
Loop was an unincorporated community in West Mahoning Township, Indiana County, Pennsylvania. Retrieved 1 July 2017.
Loop fission and fusion
COMPILER OPTIMIZATION
Loop fusion; Loop jamming; Loop distribution; Loop fission
In computer science, loop fission (or loop distribution) is a compiler optimization in which a loop is broken into multiple loops over the same index range with each taking only a part of the original loop's body. The goal is to break down a large loop body into smaller ones to achieve better utilization of locality of reference.
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.
