Draft:Fractional Calculus of Sets

fractional calculus; fractional operators; set theory; group theory; fractional calculus of sets

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The Fractional Calculus of Sets (FCS), first introduced in the article titled "Sets of Fractional Operators and Numerical Estimation of the Order of Convergence of a Family of Fractional Fixed-Point Methods" ^[1], is a methodology derived from fractional calculus ^[2]. The primary concept behind FCS is the characterization of fractional calculus elements using sets due to the plethora of fractional operators available.^[3][4][5] This methodology originated from the development of the Fractional Newton-Raphson method ^[6] and subsequent related works ^[7][8][9] .

Set ${\displaystyle O_{x,\alpha }^{n}(h)}$ of Fractional Operators

Fractional calculus, a branch of mathematics dealing with derivatives of non-integer order, emerged nearly simultaneously with traditional calculus. This emergence was partly due to Leibniz's notation for derivatives of integer order: ${\displaystyle {\frac {d^{n}}{dx^{n}}}}$ . Thanks to this notation, L'Hopital was able to inquire in a letter to Leibniz about the interpretation of taking ${\displaystyle n={\frac {1}{2}}}$  in a derivative. At that moment, Leibniz couldn't provide a physical or geometric interpretation for this question, so he simply replied to L'Hopital in a letter that "... is an apparent paradox from which, one day, useful consequences will be drawn".

The name "fractional calculus" originates from a historical question, as this branch of mathematical analysis studies derivatives and integrals of a certain order ${\displaystyle \alpha \in \mathbb {R} }$ . Currently, fractional calculus lacks a unified definition of what constitutes a fractional derivative. Consequently, when the explicit form of a fractional derivative is unnecessary, it is typically denoted as follows:

${\displaystyle {\frac {d^{\alpha }}{dx^{\alpha }}}.}$ 

Fractional operators have various representations, but one of their fundamental properties is that they recover the results of traditional calculus as ${\displaystyle \alpha \to n}$ . Considering a scalar function ${\displaystyle h:\mathbb {R} ^{m}\to \mathbb {R} }$  and the canonical basis of ${\displaystyle \mathbb {R} ^{m}}$  denoted by ${\displaystyle \{{\hat {e}}_{k}\}_{k\geq 1}}$ , the following fractional operator of order ${\displaystyle \alpha }$  is defined using Einstein notation ^[10]:

${\displaystyle o_{x}^{\alpha }h(x):={\hat {e}}_{k}o_{k}^{\alpha }h(x).}$ 

Denoting ${\displaystyle \partial _{k}^{n}}$  as the partial derivative of order ${\displaystyle n}$  with respect to the ${\displaystyle k}$ -th component of the vector ${\displaystyle x}$ , the following set of fractional operators is defined:

${\displaystyle O_{x,\alpha }^{n}(h):=\left\{o_{x}^{\alpha }:\exists o_{k}^{\alpha }h(x){\text{ and }}\lim _{\alpha \to n}o_{k}^{\alpha }h(x)=\partial _{k}^{n}h(x)\ \forall k\geq 1\right\},}$ 

with its complement:

${\displaystyle O_{x,\alpha }^{n,c}(h):=\left\{o_{x}^{\alpha }:\exists o_{k}^{\alpha }h(x)\ \forall k\geq 1{\text{ and }}\lim _{\alpha \to n}o_{k}^{\alpha }h(x)\neq \partial _{k}^{n}h(x){\text{ for at least one }}k\geq 1\right\}.}$ 

Consequently, the following set is defined:

${\displaystyle O_{x,\alpha }^{n,u}(h):=O_{x,\alpha }^{n}(h)\cup O_{x,\alpha }^{n,c}(h).}$ 

Extension to Vectorial Functions

For a function ${\displaystyle h:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} ^{m}}$ , the set is defined as:

${\displaystyle {}_{m}O_{x,\alpha }^{n,u}(h):=\left\{o_{x}^{\alpha }:o_{x}^{\alpha }\in O_{x,\alpha }^{n,u}([h]_{k})\ \forall k\leq m\right\},}$ 

where ${\displaystyle [h]_{k}:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} }$  denotes the ${\displaystyle k}$ -th component of the function ${\displaystyle h}$ .

Set ${\displaystyle {}_{m}MO_{x,\alpha }^{\infty ,u}(h)}$ of Fractional Operators

The set of fractional operators considering infinite orders is defined as:

${\displaystyle {}_{m}MO_{x,\alpha }^{\infty ,u}(h):=\bigcap _{k\in \mathbb {Z} }{}_{m}O_{x,\alpha }^{k,u}(h),}$ 

where under classic Hadamard product ^[11] it holds that:

${\displaystyle o_{x}^{0}\circ h(x):=h(x)\quad \forall o_{x}^{\alpha }\in {}_{m}MO_{x,\alpha }^{\infty ,u}(h).}$ 

Fractional Matrix Operators

For each operator ${\displaystyle o_{x}^{\alpha }}$ , the fractional matrix operator is defined as:

${\displaystyle A_{\alpha }(o_{x}^{\alpha })=\left([A_{\alpha }(o_{x}^{\alpha })]_{jk}\right)=\left(o_{k}^{\alpha }\right),}$ 

and for each operator ${\displaystyle o_{x}^{\alpha }\in {}_{m}MO_{x,\alpha }^{\infty ,u}(h)}$ , the following matrix, corresponding to a generalization of the Jacobian matrix ^[12], can be defined:

${\displaystyle A_{h,\alpha }:=A_{\alpha }(o_{x}^{\alpha })\circ A_{\alpha }^{T}(h),}$ 

where ${\displaystyle A_{\alpha }(h):=\left([A_{\alpha }(h)]_{jk}\right)=\left([h]_{k}\right)}$ .

Modified Hadamard Product

Considering that, in general, ${\displaystyle o_{x}^{p\alpha }\circ o_{x}^{q\alpha }\neq o_{x}^{(p+q)\alpha }}$ , the following modified Hadamard product is defined:

${\displaystyle o_{i,x}^{p\alpha }\circ o_{j,x}^{q\alpha }:=\left\{{\begin{array}{cl}o_{i,x}^{p\alpha }\circ o_{j,x}^{q\alpha },&{\text{if }}i\neq j\ ({\text{horizontal type Hadamard product}})\\o_{i,x}^{(p+q)\alpha },&{\text{if }}i=j\ ({\text{vertical type Hadamard product}})\end{array}}\right.,}$ 

with which the following theorem is obtained:

Theorem: Abelian Group of Fractional Matrix Operators

Let ${\displaystyle o_{x}^{\alpha }}$  be a fractional operator such that ${\displaystyle o_{x}^{\alpha }\in {}_{m}MO_{x,\alpha }^{\infty ,u}(h)}$ . Considering the modified Hadamard product, the following set of fractional matrix operators is defined:

${\displaystyle {\begin{array}{c}{}_{m}G(A_{\alpha }(o_{x}^{\alpha })):=\left\{A_{\alpha }^{\circ r}=A_{\alpha }(o_{x}^{r\alpha }):r\in \mathbb {Z} \ {\text{ and }}\ A_{\alpha }^{\circ r}=\left([A_{\alpha }^{\circ r}]_{jk}\right):=\left(o_{k}^{r\alpha }\right)\right\},\end{array}}\quad (1)}$ 

which corresponds to the Abelian group ^[13] generated by the operator ${\displaystyle A_{\alpha }(o_{x}^{\alpha })}$ .

Proof

Since the set in equation (1) is defined by applying only the vertical type Hadamard product between its elements, for all ${\displaystyle A_{\alpha }^{\circ p},A_{\alpha }^{\circ q}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha }))}$  it holds that:

${\displaystyle A_{\alpha }^{\circ p}\circ A_{\alpha }^{\circ q}=\left([A_{\alpha }^{\circ p}]_{jk}\right)\circ \left([A_{\alpha }^{\circ q}]_{jk}\right)=\left(o_{k}^{(p+q)\alpha }\right)=\left([A_{\alpha }^{\circ (p+q)}]_{jk}\right)=A_{\alpha }^{\circ (p+q)},}$ 

with which it is possible to prove that the set (1) satisfies the following properties of an Abelian group:

${\displaystyle \left\{{\begin{array}{l}\forall A_{\alpha }^{\circ p},A_{\alpha }^{\circ q},A_{\alpha }^{\circ r}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha })),\ \left(A_{\alpha }^{\circ p}\circ A_{\alpha }^{\circ q}\right)\circ A_{\alpha }^{\circ r}=A_{\alpha }^{\circ p}\circ \left(A_{\alpha }^{\circ q}\circ A_{\alpha }^{\circ r}\right)\\\exists A_{\alpha }^{\circ 0}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha }))\ {\text{such that}}\ \forall A_{\alpha }^{\circ p}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha })),\ A_{\alpha }^{\circ 0}\circ A_{\alpha }^{\circ p}=A_{\alpha }^{\circ p}\\\forall A_{\alpha }^{\circ p}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha })),\ \exists A_{\alpha }^{\circ -p}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha }))\ {\text{such that}}\ A_{\alpha }^{\circ p}\circ A_{\alpha }^{\circ -p}=A_{\alpha }^{\circ 0}\\\forall A_{\alpha }^{\circ p},A_{\alpha }^{\circ q}\in {}_{m}G(A_{\alpha }(o_{x}^{\alpha })),\ A_{\alpha }^{\circ p}\circ A_{\alpha }^{\circ q}=A_{\alpha }^{\circ q}\circ A_{\alpha }^{\circ p}\end{array}}\right..}$ 

Set ${\displaystyle {}_{m}S_{x,\alpha }^{n,\gamma }(h)}$ of Fractional Operators

Let ${\displaystyle \mathbb {N} _{0}}$  be the set ${\displaystyle \mathbb {N} \cup \{0\}}$ . If ${\displaystyle \gamma \in \mathbb {N} _{0}^{m}}$  and ${\displaystyle x\in \mathbb {R} ^{m}}$ , then the following multi-index notation can be defined:

${\displaystyle \left\{{\begin{array}{c}{\begin{array}{ccc}\displaystyle \gamma !:=\prod _{k=1}^{m}[\gamma ]_{k}!,&|\gamma |:=\displaystyle \sum _{k=1}^{m}[\gamma ]_{k},&\displaystyle x^{\gamma }:=\prod _{k=1}^{m}[x]_{k}^{[\gamma ]_{k}}\end{array}}\\\displaystyle {\frac {\partial ^{\gamma }}{\partial x^{\gamma }}}:={\frac {\partial ^{[\gamma ]_{1}}}{\partial [x]_{1}}}{\frac {\partial ^{[\gamma ]_{2}}}{\partial [x]_{2}}}\cdots {\frac {\partial ^{[\gamma ]_{m}}}{\partial [x]_{m}}}\end{array}}\right..}$ 

Then, considering a function ${\displaystyle h:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} }$  and the fractional operator:

${\displaystyle s_{x}^{\alpha \gamma }\left(o_{x}^{\alpha }\right):=o_{1}^{\alpha [\gamma ]_{1}}o_{2}^{\alpha [\gamma ]_{2}}\cdots o_{m}^{\alpha [\gamma ]_{m}},}$ 

the following set of fractional operators is defined:

${\displaystyle S_{x,\alpha }^{n,\gamma }(h):=\left\{s_{x}^{\alpha \gamma }=s_{x}^{\alpha \gamma }\left(o_{x}^{\alpha }\right)\ :\ \exists s_{x}^{\alpha \gamma }h(x)\ {\text{ such that }}\ o_{x}^{\alpha }\in O_{x,\alpha }^{s}(h)\ \forall s\leq n^{2}\ {\text{ and }}\ \lim _{\alpha \to k}s_{x}^{\alpha \gamma }h(x)={\frac {\partial ^{k\gamma }}{\partial x^{k\gamma }}}h(x)\ \forall \alpha ,|\gamma |\leq n\right\}.}$ 

From which the following results are obtained:

${\displaystyle {\text{If }}s_{x}^{\alpha \gamma }\in S_{x,\alpha }^{n,\gamma }(h)\ \Rightarrow \ \left\{{\begin{array}{l}\displaystyle \lim _{\alpha \to 0}s_{x}^{\alpha \gamma }h(x)=o_{1}^{0}o_{2}^{0}\cdots o_{m}^{0}h(x)=h(x)\\\displaystyle \lim _{\alpha \to 1}s_{x}^{\alpha \gamma }h(x)=o_{1}^{[\gamma ]_{1}}o_{2}^{[\gamma ]_{2}}\cdots o_{m}^{[\gamma ]_{m}}h(x)={\frac {\partial ^{\gamma }}{\partial x^{\gamma }}}h(x)\ \forall |\gamma |\leq n\\\displaystyle \lim _{\alpha \to q}s_{x}^{\alpha \gamma }h(x)=o_{1}^{q[\gamma ]_{1}}o_{2}^{q[\gamma ]_{2}}\cdots o_{m}^{q[\gamma ]_{m}}h(x)={\frac {\partial ^{q\gamma }}{\partial x^{q\gamma }}}h(x)\ \forall q|\gamma |\leq qn\\\displaystyle \lim _{\alpha \to n}s_{x}^{\alpha \gamma }h(x)=o_{1}^{n[\gamma ]_{1}}o_{2}^{n[\gamma ]_{2}}\cdots o_{m}^{n[\gamma ]_{m}}h(x)={\frac {\partial ^{n\gamma }}{\partial x^{n\gamma }}}h(x)\ \forall n|\gamma |\leq n^{2}\end{array}}\right..}$ 

As a consequence, considering a function ${\displaystyle h:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} ^{m}}$ , the following set of fractional operators is defined:

${\displaystyle {}_{m}S_{x,\alpha }^{n,\gamma }(h):=\left\{s_{x}^{\alpha \gamma }\ :\ s_{x}^{\alpha \gamma }\in S_{x,\alpha }^{n,\gamma }\left([h]_{k}\right)\ \forall k\leq m\right\}.}$ 

Set ${\displaystyle {}_{m}T_{x,\alpha }^{\infty ,\gamma }(a,h)}$ of Fractional Operators

Considering a function ${\displaystyle h:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} ^{m}}$  and the following set of fractional operators:

${\displaystyle {}_{m}S_{x,\alpha }^{\infty ,\gamma }(h):=\lim _{n\to \infty }{}_{m}S_{x,\alpha }^{n,\gamma }(h).}$ 

Then, taking a ball ${\displaystyle B(a;\delta )\subset \Omega }$ , it is possible to define the following set of fractional operators:

${\displaystyle {}_{m}T_{x,\alpha }^{\infty ,\gamma }(a,h):=\left\{t_{x}^{\alpha ,\infty }=t_{x}^{\alpha ,\infty }\left(s_{x}^{\alpha \gamma }\right)\ :\ s_{x}^{\alpha \gamma }\in {}_{m}S_{x,\alpha }^{\infty ,\gamma }(h)\ {\text{ and }}\ t_{x}^{\alpha ,\infty }h(x):=\sum _{|\gamma |=0}^{\infty }{\frac {1}{\gamma !}}{\hat {e}}_{j}s_{x}^{\alpha \gamma }[h]_{j}(a)(x-a)^{\gamma }\right\},}$ 

which allows generalizing the expansion in Taylor series of a vector-valued function in multi-index notation. As a consequence, the following result can be obtained:

${\displaystyle {\text{If }}t_{x}^{\alpha ,\infty }\in {}_{m}T_{x,\alpha }^{\infty ,\gamma }(a,h)\Rightarrow \left\{{\begin{array}{rl}t_{x}^{\alpha ,\infty }h(x)=&\displaystyle {\hat {e}}_{j}[h]_{j}(a)+\sum _{|\gamma |=1}{\frac {1}{\gamma !}}{\hat {e}}_{j}s_{x}^{\alpha \gamma }[h]_{j}(a)(x-a)^{\gamma }+\sum _{|\gamma |=2}^{\infty }{\frac {1}{\gamma !}}{\hat {e}}_{j}s_{x}^{\alpha \gamma }[h]_{j}(a)(x-a)^{\gamma }\\=&\displaystyle h(a)+\sum _{k=1}^{n}{\hat {e}}_{j}o_{k}^{\alpha }[h]_{j}(a)\left[(x-a)\right]_{k}+\sum _{|\gamma |=2}^{\infty }{\frac {1}{\gamma !}}{\hat {e}}_{j}s_{x}^{\alpha \gamma }[h]_{j}(a)(x-a)^{\gamma }\end{array}}\right..}$ 

Fractional Newton-Raphson Method

Let ${\displaystyle f:\Omega \subset \mathbb {R} ^{m}\to \mathbb {R} ^{m}}$  be a function with a point ${\displaystyle \xi \in \Omega }$  such that ${\displaystyle \|f(\xi )\|=0}$ . Then, for some ${\displaystyle x_{i}\in B(\xi ;\delta )\subset \Omega }$  and a fractional operator ${\displaystyle t_{x}^{\alpha ,\infty }\in {}_{m}T_{x,\alpha }^{\infty ,\gamma }(x_{i},f)}$ , it is possible to define a type of linear approximation of the function ${\displaystyle f}$  around ${\displaystyle x_{i}}$  as follows:

${\displaystyle t_{x}^{\alpha ,\infty }f(x)\approx f(x_{i})+\sum _{k=1}^{m}{\hat {e}}_{j}o_{k}^{\alpha }[f]_{j}(x_{i})\left[(x-x_{i})\right]_{k},}$ 

which can be expressed more compactly as:

${\displaystyle t_{x}^{\alpha ,\infty }f(x)\approx f(x_{i})+\left(o_{k}^{\alpha }[f]_{j}(x_{i})\right)(x-x_{i}),}$ 

where ${\displaystyle \left(o_{k}^{\alpha }[f]_{j}(x_{i})\right)}$  denotes a square matrix. On the other hand, as ${\displaystyle x\to \xi }$  and given that ${\displaystyle \|f(\xi )\|=0}$ , the following is inferred:

${\displaystyle 0\approx f(x_{i})+\left(o_{k}^{\alpha }[f]_{j}(x_{i})\right)(\xi -x_{i})\quad \Rightarrow \quad \xi \approx x_{i}-\left(o_{k}^{\alpha }[f]_{j}(x_{i})\right)^{-1}f(x_{i}).}$ 

As a consequence, defining the matrix:

${\displaystyle A_{f,\alpha }(x)=\left([A_{f,\alpha }]_{jk}(x)\right):=\left(o_{k}^{\alpha }[f]_{j}(x)\right)^{-1},}$ 

the following fractional iterative method can be defined:

${\displaystyle x_{i+1}:=\Phi (\alpha ,x_{i})=x_{i}-A_{f,\alpha }(x_{i})f(x_{i}),\quad i=0,1,2,\cdots ,}$ 

which corresponds to the most general case of the fractional Newton-Raphson method.

References

1. Torres-Hernandez, A.; Brambila-Paz, F. (December 29, 2021). "Sets of Fractional Operators and Numerical Estimation of the Order of Convergence of a Family of Fractional Fixed-Point Methods". Fractal and Fractional. 5 (4): 240. doi:10.3390/fractalfract5040240.
2. Applications of fractional calculus in physics
3. de Oliveira, Edmundo Capelas; Tenreiro Machado, José António (June 10, 2014). "A Review of Definitions for Fractional Derivatives and Integral". Mathematical Problems in Engineering. 2014: e238459. doi:10.1155/2014/238459.
4. Sales Teodoro, G.; Tenreiro Machado, J.A.; Capelas de Oliveira, E. (July 29, 2019). "A review of definitions of fractional derivatives and other operators". Journal of Computational Physics. 388: 195–208. Bibcode:2019JCoPh.388..195S. doi:10.1016/j.jcp.2019.03.008.
5. Valério, Duarte; Ortigueira, Manuel D.; Lopes, António M. (January 29, 2022). "How Many Fractional Derivatives Are There?". Mathematics. 10 (5): 737. doi:10.3390/math10050737.
6. Torres-Hernandez, A.; Brambila-Paz, F. (2021). "Fractional Newton-Raphson Method". Applied Mathematics and Sciences an International Journal (Mathsj). 8: 1–13. doi:10.5121/mathsj.2021.8101.
7. Torres-Hernandez, A.; Brambila-Paz, F.; Montufar-Chaveznava, R. (September 29, 2022). "Acceleration of the order of convergence of a family of fractional fixed-point methods and its implementation in the solution of a nonlinear algebraic system related to hybrid solar receivers". Applied Mathematics and Computation. 429: 127231. arXiv:2109.03152. doi:10.1016/j.amc.2022.127231.
8. Torres-Hernandez, A. (2022). "Code of a multidimensional fractional quasi-Newton method with an order of convergence at least quadratic using recursive programming". Applied Mathematics and Sciences an International Journal (MathSJ). 9: 17–24. doi:10.5121/mathsj.2022.9103.
9. Torres-Hernandez, A.; Brambila-Paz, F.; Ramirez-Melendez, R. (2022). "Sets of Fractional Operators and Some of Their Applications". Operator Theory - Recent Advances, New Perspectives and Applications.
10. Einstein summation for multidimensional arrays
11. The hadamard product
12. Jacobians of matrix transformation and functions of matrix arguments
13. Abelian groups

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