LEBESGUE MEASURE Meaning and
Definition
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Lebesgue measure is a mathematical term that refers to a measure used to quantify the size or extent of sets of real numbers. Specifically, it is a measure defined on subsets of the real line, which accounts for both its length and its geometrical shape.
The Lebesgue measure was developed by the French mathematician Henri Lebesgue in the early 20th century as a supplement to the previously established Jordan measure. It improves upon the shortcomings of the Jordan measure by providing a more comprehensive and flexible system to measure sets that are irregular, non-differentiable, or even non-measurable.
The Lebesgue measure assigns a non-negative number to each set, with certain properties that make it a suitable tool for various mathematical applications, such as integration theory and probability theory. It is uniquely characterized by its key properties, including countable additivity, translation invariance, and a coherent definition of the measure for a wide range of sets.
By utilizing concepts like outer measure and measure spaces, the Lebesgue measure allows mathematicians to calculate the size and properties of complex sets that were previously challenging to quantify. Its generalization to higher dimensions resulted in the development of the Lebesgue measure in Euclidean spaces, which is utilized in multiple fields of mathematics, including analysis, geometry, and measure theory.
Etymology of LEBESGUE MEASURE
The term "Lebesgue measure" is named after the French mathematician Henri Lebesgue (1875-1941), who introduced this concept in his groundbreaking work in measure theory. Lebesgue's development of the Lebesgue measure marked a significant advance in mathematical analysis and paved the way for the development of integral calculus.
The term "measure" refers to a mathematical concept that assigns a numerical value to sets, capturing the notion of size or extent. Prior to Lebesgue's work, measures were primarily defined using the concept of length, area, or volume, which were limited to certain types of sets, such as intervals, rectangles, or polyhedra.
Lebesgue extended the notion of measure to a wide range of sets, including more complex and irregular shapes. His approach focused on defining the measure of a set based on its "outer measure", which measures the extent or size of the set from the outside.
