Wikipedia has an article on: <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> Wikipedia <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> (uncountable) (set theory) One <span class="searchmatch">of</span> the <span class="searchmatch">axioms</span> in axiomatic set theory, equivalent...
sidelines at the <span class="searchmatch">regularity</span> with which Chelsea's defence was exposed. (countable) A particular regular occurrence irregularity <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> regular condition...
giving a definition <span class="searchmatch">of</span> equivalence classes for equivalence relations on a proper class, relying on the <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> but not on the <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> choice....
(mathematics): <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> choice, <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> infinity, <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> pairing, <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> power set, <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span>, <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> union, completeness <span class="searchmatch">axiom</span>, parallel <span class="searchmatch">axiom</span>, (logic):...
<span class="searchmatch">axiom</span> <span class="searchmatch">of</span> parallelism aksjomat regularności ― an <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> aksjomat zastępowania ― an <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> replacement aksjomat determinacji ― an <span class="searchmatch">axiom</span> of...
to accept the <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> choice indicates is that the disjunction between <span class="searchmatch">regularity</span> and randomness is as fundamental to our conception <span class="searchmatch">of</span> the world as that...
without the <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> choice), has the usual <span class="searchmatch">axioms</span> <span class="searchmatch">of</span> extensionality, pairing, union, infinity, separation and power set. The <span class="searchmatch">axiom</span> <span class="searchmatch">of</span> <span class="searchmatch">regularity</span> is stated...