A Note on Fractional Sumudu Transform

Definition 1.1. Let f : ℜ → ℜ, t → f(t) denote a continuous (but not necessarily differentiable) function, and let h > 0 denote a constant discretization span. Define the forward operator FW(h) by the equality

Definition 1.2. Let f : ℜ → ℜ be a continuous but not necessarily differentiable function. Further, consider the following.

• (i)

  Assume that f(t) is a constant K. Then its fractional derivative of order α is

  $$ (1.6)

• (ii)

  When f(t) is not a constant, then we will set

  $$ (1.7)
  and its fractional derivative will be defined by the expression
  $$ (1.8)
  in which, for negative α, one has
  $$ (1.9)
  whilst for positive α, we will set
  $$ (1.10)
  When n ≤ α < n + 1, we will set
  $$ (1.11)

Lemma 1.3. Let f(x) denote a continuous function; then the solution y(x) with y(0) = 0, of (1.12), is defined by the equality

Definition 2.3. Let f(t) denote a function which vanishes for negative values of t. Its Laplace′s transform of order α (or its αth fractional Laplace′s transform) is defined by the following expression:

Theorem 2.4. If the Laplace transform of fractional order of a function f(t) is L_α{f(t)} = F_α(u) and the Sumudu transform of this function is S_α{f(t)} = G_α(u), then

Proof. By definition of fractional Sumudu transformation,

Proof. It can easily be proved by using Definition 2.1.

Proof. We start with the following equality by using (2.1):

Proof. We start from equality (1.13):

Proof. Using fractional Laplace-Sumudu duality and using the result of Jumarie (see [14]), we can easily obtain these results.

Now we will obtain very similar properties for the fractional double Sumudu transform. Since proofs of these properties are straight, due to this reason, we will give only statements of these properties: