Abstract
Here we extended our earlier fractional monotone approximation theory to abstract fractional monotone approximation, with applications to Prabhakar fractional calculus and non-singular kernel fractional calculi. We cover both the left and right sides of this constrained approximation. Let f∈Cp−1,1, p≥0 and let L be a linear abstract left or right fractional differential operator such that Lf≥0 over 0,1 or −1,0, respectively. We can find a sequence of polynomials Qn of degree ≤n such that LQn≥0 over 0,1 or −1,0, respectively. Additionally f is approximated quantitatively with rates uniformly by Qn with the use of first modulus of continuity of fp.
Subject
Statistics and Probability,Statistical and Nonlinear Physics,Analysis
Reference16 articles.
1. Monotone approximation
2. Monotone approximation with linear differential operators
3. Bivariate monotone approximation
4. Frontiers in Approximation Theory;Anastassiou,2015
5. The Analysis of Fractional Differential Equations;Diethelm,2010
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