essential infimum

Summary

essential infimum is a function^[1].

Key Facts

• essential infimum's instance of is recorded as function^[2].
• essential infimum's subclass of is recorded as element^[3].
• essential infimum's subclass of is recorded as quality^[4].
• essential infimum's part of is recorded as essential supremum and essential infimum^[5].
• essential infimum's quantity symbol is recorded as ess inf^[6].
• essential infimum's opposite of is recorded as essential supremum^[7].
• essential infimum's different from is recorded as infimum^[8].
• essential infimum's TeX string is recorded as \mathrm{ess}\inf^[9].
• essential infimum's defining formula is recorded as \mathrm{ess } \inf f=\sup {a \in \mathbb{R}: \mu({x: f(x) < a}) = 0}<sup id="cite-C10" class="cite-ref" title="essential infimum — defining formula (P2534): \mathrm{ess } \inf f=\sup {a \in \mathbb{R}: \mu({x: f(x) < a}) = 0}">[10].
• essential infimum's studied by is recorded as measure theory^[11].
• essential infimum's studied by is recorded as functional analysis^[12].
• essential infimum's maintained by WikiProject is recorded as WikiProject Mathematics^[13].
• essential infimum's characteristic of is recorded as partially ordered set^[14].