Matches in DBpedia 2014 for { ?s ?p In mathematics, given a locally Lebesgue integrable function on , a point in the domain of is a Lebesgue point ifHere, is a ball centered at with radius , and is its Lebesgue measure. The Lebesgue points of are thus points where does not oscillate too much, in an average sense.The Lebesgue differentiation theorem states that, given any , almost every is a Lebesgue point.. }
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- Lebesgue_point abstract "In mathematics, given a locally Lebesgue integrable function on , a point in the domain of is a Lebesgue point ifHere, is a ball centered at with radius , and is its Lebesgue measure. The Lebesgue points of are thus points where does not oscillate too much, in an average sense.The Lebesgue differentiation theorem states that, given any , almost every is a Lebesgue point.".
- Lebesgue_point comment "In mathematics, given a locally Lebesgue integrable function on , a point in the domain of is a Lebesgue point ifHere, is a ball centered at with radius , and is its Lebesgue measure. The Lebesgue points of are thus points where does not oscillate too much, in an average sense.The Lebesgue differentiation theorem states that, given any , almost every is a Lebesgue point.".