- Paley-Wiener integral
In
mathematics , the Paley-Wiener integral is a simplestochastic integral . When applied to classical Wiener space, it is less general than theItō integral , but the two agree when they are both defined.The integral is named after its discoverers,
Raymond Paley andNorbert Wiener .Definition
Let "i" : "H" → "E" be an
abstract Wiener space with abstract Wiener measure "γ" on "E". Let "j" : "E"∗ → "H" be the adjoint of "i". (We have abused notation slightly: strictly speaking, "j" : "E"∗ → "H"∗, but since "H" is aHilbert space , it is isometrically isomorphic to itsdual space "H"∗, by theRiesz representation theorem .)It can be shown that "j" is an
injective function and has dense image in "H". Furthermore, it can be shown that everylinear functional "f" ∈ "E"∗ is alsosquare-integrable : in fact,:
This defines a natural
linear map from "j"("E"∗) to "L"2("E", "γ"; R), under which "j"("f") ∈ "j"("E"∗) ⊆ "H" goes to theequivalence class ["f"] of "f" in "L"2("E", "γ"; R). This is well-defined since "j" is injective. This map is anisometry , so it is continuous.However, since a continuous linear map between
Banach space s such as "H" and "L"2("E", "γ"; R) is uniquely determined by its values on any dense subspace of its domain, there is a unique continuous linear extension "I" : "H" → "L"2("E", "γ"; R) of the above natural map "j"("E"∗) → "L"2("E", "γ"; R) to the whole of "H".This isometry "I" : "H" → "L"2("E", "γ"; R) is known as the Paley-Wiener map. "I"("h"), also denoted ⟨"h", −⟩∼, is a function on "E" and is known as the Paley-Wiener integral (with respect to "h" ∈ "H").
It is important to note that the Paley-Wiener integral for a particular element "h" ∈ "H" is a function on "E". The notation ⟨"h", "x"⟩∼ does not really denote an inner product (since "h" and "x" belong to two different spaces), but is a convenient
abuse of notation in view of theCameron-Martin theorem . For this reason, many authors prefer to write ⟨"h", −⟩∼("x") or "I"("h")("x") rather than using the more compact but potentially confusing ⟨"h", "x"⟩∼ notation.ee also
Other stochastic integrals:
*Itō integral
*Skorokhod integral
*Stratonovich integral
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