Singular Measures

  • Definition: A measure on a measurable space is said to be singular with respect to another measure (denoted ) if there exists a set such that:

    • (i.e., is concentrated on )
    • (i.e., is concentrated on )
  • Intuition: Singular measures do not share common support; one measure assigns positive measure to a set where the other measure assigns zero and vice versa.

  • Example:

    • The Lebesgue measure on and the Dirac measure at a point are singular, as and .
  • Properties:

    • If , then there exists a partition such that is supported on and on .
    • Singular measures often arise in contexts where continuous and discrete measures coexist.