The Dual Space consists of all continuous linear functionals on , where .

  • For , the dual space is isometrically isomorphic to , where . Specifically, for , the corresponding functional is defined by:

  • For , the dual space is , with the same type of pairing:

  • Properties:

    • The functional is bounded and linear.
    • The norm in the dual space satisfies , establishing an isometric isomorphism.
  • Intuition:

    • The dual pairing connects the function spaces and , where they act as ‘partners’ under the Hölder’s Inequality, which ensures that such pairings are finite.