The Lebesgue measure on \(\mathbb {R}^n\) is translation invariant. This means that the value of an integral does not change when the domain of definition is translated. More generally, the volume of a body does not change when it is moved in space. Similarly, for most finite, discrete or continuous groups, invariant measures (integrals) can be introduced.

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Invariant Integration

  • Andreas Wipf

摘要

The Lebesgue measure on \(\mathbb {R}^n\) is translation invariant. This means that the value of an integral does not change when the domain of definition is translated. More generally, the volume of a body does not change when it is moved in space. Similarly, for most finite, discrete or continuous groups, invariant measures (integrals) can be introduced.