Numerical computation of fractional Bloch equation by using Jacobi operational matrix

1 Introduction

Bloch model is a system of differential equations. It is most useful for studying costly biological materials like nucleic acids, proteins, DNA and RNA. Petrochemical plants, liquid media, process control and process optimization in oil refineries are just a few of the real-world applications of the Bloch equation. Based on the NMR concept, surface magnetic resonance allows for measurements that can be used to infer the saturated and unsaturated zone's water content. The classical system of Bloch equations can be written as

Here ${\mathrm{P}}_{\mathrm{x}}\left(\mathrm{\xi }\right),{\mathrm{P}}_{\mathrm{y}}\left(\mathrm{\xi }\right)$ and ${\mathrm{P}}_{\mathrm{z}}\left(\mathrm{\xi }\right)$ are indicting system magnetization in x, y in addition z components respectively, ${\mathrm{\mu }}_0$ indicates the resonant frequency provided by the relation ${\mathrm{\mu }}_0=\mathrm{\gamma }{\mathrm{M}}_0$ , where ${\mathrm{M}}_0$ represents static magnetic field in z-component, ${\mathrm{P}}_0$ stands for equilibrium magnetization, ${\mathrm{T}}_2$ and ${\mathrm{T}}_1$ are the spin–spin relaxation and spin–lattice time respectively, ${\mathrm{b}}_1$ , ${\mathrm{b}}_2$ and ${\mathrm{b}}_3$ are real constants.

For the mathematical model given in Eq. (1), the exact solution is expressed as

Researchers, such as Mahariq et al. (2014), Mahariq and Kurt (2015), Mahariq et al. (2016), have explored various models using the spectral element method due to its efficacy in accurately and efficiently solving differential equations. Dubey et al., 2022a, b studied an analytic computational scheme for solving the fractional Bloch equation appearing in NMR flows. Singh et al., 2021a, b solved the system of the Bloch equation using Sumudu transform. Kumar et al. (2014) analyzed fractional Bloch equation analytically. Bharwy et al. (2014) provided a Jacobi operational matrix of Riemann-Liouville integration. Singh (2016) solved fractional Bloch equation numerically by using an operational matrix with Legendre polynomial. Some recent work on fractional calculus can be seen (Hashmi et al., 2022; Dubey et al., 2022a, b; Singh et al., 2022).

In the present article, we describe a numerical technique for the approximate solution of FBE based on an operational matrix of Caputo-Fabrizio fractional order integration. The unique aspect of our research is centred on developing an operational matrix that harnesses the power of Jacobi polynomials specifically for Caputo-Fabrizio fractional integration. This pioneer method significantly demonstrates the effectiveness of the operational matrix technique. This method is a more resilient and adaptable solution for tackling fractional differential equations. Introducing Jacobi polynomials into the operational matrix broadens its utility across various applications and elevates the precision of approximations. Consequently, our work contributes to the progression of fractional calculus and facilitates its real-world applications by providing enhanced computational tools. By applying this method, we find some different unknown coefficients for approximate parameters. With the aid of the determined coefficient, we attain an approximate solution of the given system of arbitrary order Bloch model pertaining to Caputo-Fabrizio non-integer order derivatives.

2 Preliminaries

In this paper, fractional order differentiation and integration is Caputo-Fabrizio (CF) sense derivative.

Let $\mathrm{a},\mathrm{b},\mathrm{\beta }\in \mathbb{R}$ s.t $0<\beta \le 1$ .

The CF non-integer derivative of order $\mathrm{\beta }$ (Nchama, 2020) of a function $\mathrm{u}\in {\mathrm{H}}^{\prime }\left[\mathrm{a},\mathrm{b}\right]$ is given as

3 Operational matrix for Caputo-Fabrizio fractional integration

4 Computational procedure of the method

Here, we discuss a computational scheme to obtain the approximate solutions of FBE. By utilizing it we can find magnetisation in each direction.

First of all, we take the subsequent approximation

From Eqs. (23)–(25), we have

On solving Eqs. (26)–(28)

5 Results and discussions

We will numerically simulate our outcomes in this section. To compute numerical results, we take ${\mathrm{P}}_{\mathrm{x}}\left(0\right)=0$ , ${\mathrm{P}}_{\mathrm{y}}\left(0\right)=100$ and ${\mathrm{P}}_{\mathrm{z}}\left(0\right)=0$ . The behaviour of the solutions of ${\mathrm{P}}_{\mathrm{x}}\left(\mathrm{\xi }\right)$ , ${\mathrm{P}}_{\mathrm{y}}\left(\mathrm{\xi }\right)$ and ${\mathrm{P}}_{\mathrm{z}}\left(\mathrm{\xi }\right)$ shown in Figs. 1-3 at distinct values $\mathrm{\alpha },\mathrm{\beta }$ and $\mathrm{\gamma }$ , respectively.

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Fig. 1

Response of the solution of ${\mathrm{P}}_{\mathrm{x}}\left(\mathrm{\xi }\right)$ at $\mathrm{\alpha }=0.98,0.99$ and $1$ , with parameter: ${\mathrm{\mu }}_0=1,{\mathrm{T}}_1=1,{\mathrm{T}}_2=20,\mathrm{c}=1,\mathrm{d}=1$ .

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Fig. 2

Response of the solution of ${\mathrm{P}}_{\mathrm{y}}\left(\mathrm{\xi }\right)$ at $\mathrm{\beta }=0.98,0.99$ and $1$ , with parameter: ${\mathrm{\mu }}_0=1,{\mathrm{T}}_1=1,{\mathrm{T}}_2=20,\mathrm{c}=1,\mathrm{d}=1$ .

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Fig. 3

Response of the solution of ${\mathrm{P}}_{\mathrm{z}}\left(\mathrm{\xi }\right)$ at $\mathrm{\gamma }=0.98,0.99$ and $1$ , with parameter: ${\mathrm{\mu }}_0=1,{\mathrm{T}}_1=1,{\mathrm{T}}_2=20,\mathrm{c}=1,\mathrm{d}=1$ .

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It is evident from these outcomes of the study that the obtained solution regularly changes from fractional order to integer order. From Fig. 1, we observe that the value of ${\mathrm{P}}_{\mathrm{x}}\left(\mathrm{\xi }\right)$ increases with increasing time $\xi$ . Decreasing the order of non-integer order derivatives leads to increase in the value of ${\mathrm{P}}_{\mathrm{x}}\left(\mathrm{\xi }\right)$ initially, after some time its nature is opposite. From Fig. 2, we notice that the value of ${\mathrm{P}}_{\mathrm{y}}\left(\mathrm{\xi }\right)$ decrease with increasing time on $\xi$ . Decreasing the order of arbitrary order derivatives leads to diminution in the value of ${\mathrm{P}}_{\mathrm{y}}\left(\mathrm{\xi }\right)$ initially, after some time its nature is opposite. From Fig. 3 we inspect that value of ${\mathrm{P}}_{\mathrm{z}}\left(\mathrm{\xi }\right)$ increase with increasing time $\xi$ . On decreasing the order of fractional derivatives leads to an enhancement in the value of ${\mathrm{P}}_{\mathrm{z}}\left(\mathrm{\xi }\right)$ initially, after some time its nature is opposite.

It is evident that the results vary continuously from arbitrary order to classical order. Both the exact solution as well as the approximate solutions obtained by using our proposed scheme is presented in the Table 1. We have compared outcomes obtained by Jacobi polynomial, exact solution and method (Singh, 2017; Kumar et al., 2014). Table 1 reveals that the results of the described technique are faithful for practical implementations of FBE.

6 Conclusions

In this study, we have suggested a computational scheme for arbitrary order Bloch equation pertaining to the Caputo −Fabrizio operator. The proposed method offers notable advantages in terms of simplicity and user-friendliness compared to alternative techniques, primarily due to the straightforward construction of the operational matrix for differential equations. Specifically, we develop an operational matrix for Caputo-Fabrizio integration by utilizing the Jacobi polynomial. When $\alpha ,\beta ,\gamma =1$ , we observe strong agreement between the solution obtained through operational matrix techniques and the exact solution of the Bloch equation of arbitrary order. These findings underscore the suitability and accuracy of our proposed approach for analyzing fractional order models employing the Caputo-Fabrizio operator. Future endeavors will delve into the utilization of various special functions such as Bernstein and Vieta Lucas, alongside the operational matrix method, while also exploring the impacts of arbitrary orders on the dynamics of the Bloch equation.

CRediT authorship contribution statement

Jagdev Singh: Writing – review & editing, Supervision, Software, Conceptualization. Jitendra Kumar: Writing – original draft, Software, Methodology, Conceptualization. Dumitru Baleanu: Visualization, Validation, Investigation, Formal analysis.