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component [[link]], ''i.e.'' a pair consisting of an oriented sphere $ S ^ {n+2} $ it is known as the Seifert manifold of the link $ L $.

$#C+1 = 149 : ~/encyclopedia/old_files/data/K055/K.0505580 Knot and link groups of links (cf. [[Link|Link]]) $ k $

there is a preferred one, which bounds a surface in the complement of $ N $. Define a framed link $ {\mathsf L} $

is called a link of multiplicity $ \mu $. A link of multiplicity $ \mu = 1 $

and $P_-$ will be the complement. ...)</td></tr><tr><td valign="top">[a3]</td> <td valign="top"> E. Mourre, "Link between the geometrical and the spectral transformation approaches in scatt

is the complement $ X $( ...lign="top"> O.Ya. Viro, "Branched coverings of manifolds with boundary and link invariants I" ''Math. USSR Izv.'' , '''7''' (1973) pp. 1239–1256 ''Izv. A

...y generalizes the concepts of a film and its boundary, while weakening the link between the two (in particular, if one considers non-parametrized films), a ...surfaces were obtained by S.-T. Yau [[#References|[20]]]. He revealed the link between the existence of complex minimal surfaces and Kohn–Rossi cohomolo

...epresented as phonemes. While phonemes are abstract description units, the link to concrete speech is made in the field of phonetics, where spoken language ...c and experimentally valid conditions. These emperical considerations thus complement the focus on formal issues of natural language analysis and synthesis, whic

...operties of a set that are determined by the topological properties of its complement. The theorem states that the $ r $- dimensional Betti number modulo 2 of the complement (cf. [[Alexander duality|Alexander duality]]).

::::* the '''complement''' of the '''union''' of $x$ and $y$ is the '''intersection''' of the '''co ::::* the '''complement''' of the '''intersection''' of $x$ and $y$ is the '''union''' of the '''co