<span class="searchmatch">Cauchy</span> <span class="searchmatch">spaces</span> plural of <span class="searchmatch">Cauchy</span> <span class="searchmatch">space</span>...
<span class="searchmatch">Cauchy</span> <span class="searchmatch">space</span> (plural <span class="searchmatch">Cauchy</span> <span class="searchmatch">spaces</span>) (topology) A <span class="searchmatch">space</span> for which notions of a <span class="searchmatch">Cauchy</span> sequence and completeness exist. Hypernym: topological <span class="searchmatch">space</span> Hyponyms:...
horizon <span class="searchmatch">Cauchy</span> momentum equation <span class="searchmatch">Cauchy</span> problem <span class="searchmatch">Cauchy</span>-Riemann equation <span class="searchmatch">Cauchy</span>-Schwarz inequality <span class="searchmatch">Cauchy</span> sequence <span class="searchmatch">Cauchy</span> <span class="searchmatch">space</span> <span class="searchmatch">Cauchy</span> stress tensor <span class="searchmatch">Cauchy</span> surface...
the <span class="searchmatch">spaces</span> of most interest to analysis are those, called complete, in which such limits do exist within the <span class="searchmatch">space</span>. <span class="searchmatch">Cauchy</span> (adjective) <span class="searchmatch">Cauchy</span> convergence...
continuity and uniform convergence can be formulated. <span class="searchmatch">Cauchy</span> <span class="searchmatch">space</span> topological <span class="searchmatch">space</span> metric <span class="searchmatch">space</span> a <span class="searchmatch">space</span> for which uniform continuity can be formulated...
after Augustin-Louis <span class="searchmatch">Cauchy</span> <span class="searchmatch">Cauchy</span> horizon (plural <span class="searchmatch">Cauchy</span> horizons) (physics) A lightlike boundary of the domain of validity of a <span class="searchmatch">Cauchy</span> problem, in which...
convergent sequences) (mathematical analysis) a sequence which converges Hyponym: (in metric <span class="searchmatch">spaces</span>) <span class="searchmatch">Cauchy</span> sequence convergent sequence convergent series...
Strum, Topological <span class="searchmatch">Spaces</span>, Academic Press, page 165: In order to obtain "intuitive insight" into special classes of topological <span class="searchmatch">spaces</span> we can proceed in...
analysis) Banach <span class="searchmatch">space</span> - a normed vector <span class="searchmatch">space</span> which is complete, in the sense that <span class="searchmatch">Cauchy</span> sequences converge ヒルベルト空間(くうかん) (Hiruberuto kūkan): Hilbert <span class="searchmatch">space</span>...
vector <span class="searchmatch">space</span> which is complete with respect to the norm, meaning that <span class="searchmatch">Cauchy</span> sequences have well-defined limits that are points in the <span class="searchmatch">space</span>. 1962 [Prentice-Hall]...