The manuscript extends previous work on the boundedness and continuity properties of the Riemann-Liouville (RL) fractional integral of order α > 0 in Bochner-Lebesgue spaces. The key highlights and insights are:
For p ∈ (1, ∞) and α ∈ (1/p, ∞), the RL fractional integral Jα
t0,t is a bounded linear operator from Lp(t0, t1; X) to C([t0, t1]; X).
For p ∈ (1, ∞) and α ∈ (n + 1/p, n + 1 + 1/p), n ∈ N, the RL fractional integral Jα
t0,t is a bounded linear operator from Lp(t0, t1; X) to the Hölder continuous space Hn,q([t0, t1]; X), where q = α - (n + 1/p).
For p ∈ (1, ∞) and α = n + 1/p, n ∈ N*, the RL fractional integral Jα
t0,t is a bounded linear operator from Lp(t0, t1; X) to the Banach space BKn,p
γ (t0, t1; X), which is a subspace of the Bochner-Sobolev space W n,p(t0, t1; X) with additional regularity conditions.
The case p = 1 and α ≥ 1 is addressed, showing that Jα
t0,t is a bounded linear operator from L1(t0, t1; X) to the RL fractional Bochner-Sobolev space W γ,1
RL(t0, t1; X), for γ ∈ (0, α].
For p = ∞ and α ∈ (0, 1), the RL fractional integral Jα
t0,t is a bounded linear operator from L∞(t0, t1; X) to the Hölder continuous space H0,α([t0, t1]; X).
The results provide a comprehensive understanding of the boundedness and continuity properties of the Riemann-Liouville fractional integral in various function spaces.
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