What is the exact condition for fractional integrals and derivatives of Besicovitch functions to have exact box dimension?

Let 10 with λk→∞ satisfy the Hadamard condition λk+1/λk⩾λ>1. For a class of Besicovich functions B(t)=∑k=1∞λks-2sin(λkt), the present paper investigates the intrinsic relationship between box dimension of graphs of their vth fractional integrals g(t) and uth fractional derivatives g˜(t) and the asymptotic behavior of {λk}. We show that: if 01+v, then for sufficiently large λ, dim¯BΓ(g)=dim̲BΓ(g)=s-v holds if and only if limn→∞logλn+1logλn=1; if 0 Suggested Citation He, G.L. & Zhou, S.P., 2005. "What is the exact condition for fractional integrals and derivatives of Besicovitch functions to have exact box dimension?," Chaos, Solitons & Fractals, Elsevier, vol. 26(3), pages 867-879. Handle: RePEc:eee:chsofr:v:26:y:2005:i:3:p:867-879 DOI: 10.1016/j.chaos.2005.01.041 as HTML HTML with abstract plain text plain text with abstract BibTeX RIS (EndNote, RefMan, ProCite) ReDIF JSON