on: <span class="searchmatch">Borel</span> <span class="searchmatch">measure</span> Wikipedia After Emile <span class="searchmatch">Borel</span> <span class="searchmatch">Borel</span> <span class="searchmatch">measure</span> (plural <span class="searchmatch">Borel</span> <span class="searchmatch">measures</span>) (mathematical analysis) A <span class="searchmatch">measure</span> whose domain is the <span class="searchmatch">Borel</span> σ-algebra...
<span class="searchmatch">Borel</span> <span class="searchmatch">measures</span> plural of <span class="searchmatch">Borel</span> <span class="searchmatch">measure</span>...
Émile <span class="searchmatch">Borel</span> (1871–1956), who pioneered <span class="searchmatch">measure</span> theory. English Wikipedia has an article on: <span class="searchmatch">Borel</span> σ-algebra Wikipedia <span class="searchmatch">Borel</span> σ-algebra (plural <span class="searchmatch">Borel</span> σ-algebras)...
area and volume. <span class="searchmatch">Borel</span> <span class="searchmatch">measure</span> complex <span class="searchmatch">measure</span> Haar <span class="searchmatch">measure</span> Jordan <span class="searchmatch">measure</span> Lebesgue integral Lebesgue <span class="searchmatch">measure</span> probability <span class="searchmatch">measure</span> Riemann integration...
article on: <span class="searchmatch">Borel</span> set Wikipedia Named after Émile <span class="searchmatch">Borel</span>. <span class="searchmatch">Borel</span> set (plural <span class="searchmatch">Borel</span> sets) (mathematical analysis) Any of the members of a <span class="searchmatch">Borel</span> σ-algebra....
After Johann Radon. Radon <span class="searchmatch">measure</span> (plural Radon <span class="searchmatch">measures</span>) (mathematics) A <span class="searchmatch">measure</span> on the σ-algebra of <span class="searchmatch">Borel</span> sets of a Hausdorff space that is locally...
<span class="searchmatch">Borel</span> function (plural <span class="searchmatch">Borel</span> functions) (mathematical analysis) A function which is <span class="searchmatch">Borel</span> measurable. function...
<span class="searchmatch">Borel</span> measurable (not comparable) (mathematical analysis, of a function) Such that the inverse image of any open set in its codomain is a <span class="searchmatch">Borel</span> set of...
comparable) (mathematical analysis) (of a <span class="searchmatch">Borel</span> set) That its <span class="searchmatch">measure</span> is equal to the infimum of the <span class="searchmatch">measures</span> of all open sets which contain it. inner...
comparable) (mathematical analysis, of a <span class="searchmatch">Borel</span> set) Whose <span class="searchmatch">measure</span> is equal to the supremum of the <span class="searchmatch">measures</span> of all compact sets which are contained by...