Steady state solution of NFC model with nonlinear load using PEEC

Samuel Kvasnicka (Institute of Fundamentals and Theory in Electrical Engineering, Faculty of Electrical and Information Engineering, Graz University of Technology, Graz, Austria and Silicon Austria Labs, TU-Graz SAL GEMC Lab, Graz, Austria)

Thomas Bauernfeind (Institute of Fundamentals and Theory in Electrical Engineering, Faculty of Electrical and Information Engineering, Graz University of Technology, Graz, Austria and Silicon Austria Labs, TU-Graz SAL GEMC Lab, Graz, Austria)

Paul Baumgartner (Institute of Fundamentals and Theory in Electrical Engineering,Faculty of Electrical and Information Engineering, Graz University of Technology, Graz, Austria)

Riccardo Torchio (Dipatimento di Ingegneria Industriale, Universita degli Studi di Padova, Padova, Italy)

COMPEL - The international journal for computation and mathematics in electrical and electronic engineering

ISSN: 0332-1649

Article publication date: 1 February 2022

Issue publication date: 10 May 2022

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Abstract

Purpose

The purpose of this paper is to show that the computation of time-periodic signals for coupled antenna-circuit problems can be substantially accelerated by means of the single shooting method. This allows an efficient analysis of nonlinearly loaded coupled loop antennas for near field communication (NFC) applications.

Design/methodology/approach

For the modelling of electrically small coupled field-circuit problems, the partial element equivalent circuit (PEEC) method shows to be very efficient. For analysing the circuit-like description of the coupled problem, this paper developed a generalised modified nodal analysis (MNA) and applied it to specific NFC problems.

Findings

It is shown that the periodic steady state (PSS) solution of the resulting differential-algebraic system can be computed very time efficiently by the single shooting method. A speedup of roughly 114 to conventional transient approaches can be achieved.

Practical implications

The proposed approach appears to be an efficient alternative for the computation of time PSS solutions for nonlinear circuit problems coupled with discretised conductive structures, where the homogeneous solution is not of interest.

Originality/value

The present paper explores the implementation and application of the shooting method for nonlinearly loaded coupled antenna-circuit problems based on the PEEC method and shows the efficiency of this approach.

Keywords

Citation

Kvasnicka, S., Bauernfeind, T., Baumgartner, P. and Torchio, R. (2022), "Steady state solution of NFC model with nonlinear load using PEEC", COMPEL - The international journal for computation and mathematics in electrical and electronic engineering, Vol. 41 No. 3, pp. 840-851. https://doi.org/10.1108/COMPEL-03-2021-0087

Publisher

:

Emerald Publishing Limited

License

Published by Emerald Publishing Limited. This article is published under the Creative Commons Attribution (CC BY 4.0) licence. Anyone may reproduce, distribute, translate and create derivative works of this article (for both commercial and non-commercial purposes), subject to full attribution to the original publication and authors. The full terms of this licence may be seen at http://creativecommons.org/licences/by/4.0/legalcode

1. Introduction

Before introducing a near field communication (NFC) device on the market, a rather large number of standardisation tests have to be carried out, which are time-consuming, expensive and require a prototype device. To overcome this problem, the idea is to develop a digital twin of the NFC device and carry out those tests in terms of numerical simulations, as e.g. proposed in (Bauernfeind et al., 2020, pp. 3–14), which rely on a frequency domain method. On the other hand, the NFC-IC as well as the standardised test equipment, show a strong nonlinear electric behaviour. Hence, accurate modelling of this nonlinear electric behaviour is not possible with this approach. Consequently, a strategy is needed which allows the incorporation of this behaviour. Because we are interested in the periodic steady state (PSS) solution only, we propose to apply the single shooting method, for instance, (Kundert et al., 1990, pp. 65–70) or (Kvasnicka 2020, pp. 42–45), which solves the underlying differential-algebraic equation (DAE) in terms of a boundary value problem (BVP) instead of an initial value problem (IVP) as in conventional transient solution strategies.

Like in (Bauernfeind et al., 2018), the partial element equivalent circuit (PEEC) method is applied, which is a useful method to model electromagnetic (EM) field problems in terms of a circuit-like description. Hence, it is possible to combine an EM problem with external lumped circuits which contain linear and nonlinear elements. Thus, numerical techniques, which are applicable in the electric circuit analysis, can also be applied to such hybrid EM and circuit models to compute the PSS solution.

For the discretisation of the loop structures, one-dimensional (1D) stick elements are used, which significantly simplifies the modelling of the NFC loop antennas. However, the adoption of this kind of element introduces unavoidable approximations. Indeed, skin effects are completely neglected. Moreover, only volume electric charge density is considered. This may lead to some inaccuracies when capacitive effects between close conductive surfaces are predominant (Torchio, 2019). However, the PEEC method with stick wires allows for a good trade-off between accuracy and computational costs, especially in the optimisation-based pre-design phase.

The remainder of the paper is structured as follows. In Section 2, the PEEC-based model of the coupled field-circuit problem is explained. Here, special attention is paid to the needed modification of the resulting system matrix of the PEEC formulation to enable the applicability of the modified nodal analysis (MNA) on the circuit representation of the coupled field-circuit problem. This modification allows the coupling with external nonlinear circuit elements in a standardised MNA formulation, which results in a description via DAE system. In Section 3, the solution strategies transient analysis and single shooting based on backward differentiation formula (BDF) are introduced and briefly discussed. Section 4 shows the simulation results of the test problem consisting of two close-coupled NFC loop antennas with nonlinear resistive loading. Finally, in Section 5, a conclusion of the obtained results, as well as an outlook on future work, is presented.

2. Modelling

2.1 Modelling conductive structures using PEEC method

A quasi-static PEEC method is used to model the conductive domain, whereby in the applied PEEC formulation, neither dielectric nor magnetic materials are considered, which is no major restriction regarding the NFC standardisation tests.

The conductive structure, e.g. NFC antennas, can be discretised by b_L_,peec thin wire stick elements which are modelled by b_L_,peec PEEC cells and n_C_,peec PEEC nodes. Figure 1 shows the m-th PEEC cell between the nodes i and j (Ekman, 2003, p. 32 and p. 54), whereby the PEEC cells are described by a symmetric partial potential matrix P=(pi,j)1≤i,j≤nC,peec, a partial inductance matrix L′=(L′i,j)1≤i,j≤bL,peec and a diagonal partial resistance matrix R′=diag(R′1,…,R′bL,peec). In general, the matrices P and L′ are fully populated. In the case of filamentary coils, the coefficients of the matrices P, L′ and R′ can be computed according to (Torchio et al., 2017, p. 2), which corresponds to a 1D discretisation approach.

For solving the circuit description given by the PEEC method, the MNA is used. Hence, it is useful to model the capacitive elements shown in Figure 1 in a different way. The diagonal matrix

F:=diag(1p1,1,…,1pnC,peec,nC,peec)

contains the (pseudo-) capacitances C′i regarding Figure 1. The matrices P and F are invertible, and therefore the invertible matrix S := P · F can be defined. Due to the symmetry of P, the relation F⋅S−1=P−1= (S⊤)−1⋅F is valid. With respect to Figure 1 and the definition of the PEEC node potentials eC,peec(t):=(e1(t),…,enC,peec(t))⊤, the branch voltages uC′(t)=(uC′1(t),…,uC′nC,peec(t))⊤ of the (pseudo-) capacitances can be written as

uC′(t)=S−1·eC,peec(t) .

Consequently, the matrices C_peec := (S^T)⁻¹ · F and L_peec := L′ can be defined. Figure 2 shows an equivalent representation of the m-th PEEC cell with respect to Figure 1, consisting of coupled inductances Lpeec,m⊤ and coupled capacitances Cpeec,i⊤,Cpeec,j⊤, whereby Lpeec,m⊤ and Cpeec,i⊤ denotes the m-th and i-th row vectors of the matrices L_peec and C_peec, respectively.

Regarding Figure 2, the relations between capacitive and inductive branch currents and voltages are given by

iC,peec(t)=Cpeec · duC,peec(t)dt ,uL,peec(t)=Lpeec · diL,peec(t)dt ,

which also considers the capacitive and inductive coupling between the cells.

2.2 Applying MNA using PEEC model

Due to the circuit-like description of the EM field problem by means of the PEEC method, external lumped elements can be easily added. In the proposed MNA formulation, linear resistive, capacitive and inductive elements, nonlinear resistive elements such as diodes and independent sources can be considered.

The external circuit to be analysed, possesses b_U independent voltage sources, b_I independent current sources, b_C := n_C,_peec + b_C,ext linear capacitive elements, b_L := b_L,_peec + b_L,ext linear inductive elements and b_R := b_R,_peec + b_R,ext,lin + b_R,ext,NL resistive elements, whereby the subscripts “peec”, “ext”, “ext,lin” and “ext,NL” relates to elements of the PEEC cells, external elements, external linear and nonlinear elements, respectively. The common reference potential of the lumped circuit corresponds with the reference potential of the PEEC cells. The total number of nodes is indicated by n and n − 1 = n_C,_peec + b_L,_peec + b_L,ext + n_ext complies with the total number of nodes excluding the reference node. Here, n_C_,peec corresponds to the PEEC nodes, b_L_,peec corresponds to the added node between the inductive and resistive element of each PEEC cell (Figure 2), and n_ext corresponds to the additional nodes of the external lumped circuit.

In the MNA, the topology of the whole circuit is described by the reduced incidence matrix A, for instance (Riaza, 2008, p. 198) or (Kvasnicka, 2020, pp. 18–19), consisting of blocks for the different types of circuit elements

A:=(AR,AC,AL,AU,AI) ,

where Aℓ∈ℝ(n−1)×bℓ for ℓ ∈ {R, C, L, U, I} is introduced. Further, the resistive, capacitive and inductive reduced incidence matrices are subdivided into

AR:=(AR,peec,AR,ext,lin,AR,ext,NL),AC:=(AC,peec,AC,ext),AL:=(AL,peec,AL,ext),

relating to the appropriate elements. For example, the k-th column of A_C,ext describes the incidence between the branch of the k-th external capacitance and the connected nodes. The connection between branch voltages u(t) and node potentials e(t) is then given as

u(t)−A⊤· e(t)=0 .

The relation between the external linear resistive, capacitive and inductive elements are described by their characteristic equations using matrices Rext,lin∈ℝbR,ext,lin×bR,ext,lin, Cext∈ℝbC,ext×bC,ext and Lext∈ℝbL,ext×bL,ext. The definition of the function γR:ℝbR→ℝbR

γR(uR,peecuR,ext,linuR,ext,NL):=(Rpeec−1 · uR,peecRext,lin−1 · uR,ext,linγR,ext,NL(uR,ext,NL)) ,

describes the behaviour of resistive branch currents depending on the resistive branch voltages. Therefore, a function γR,ext,NL:ℝbR,ext,NL→ℝbR,ext,NL describes the behaviour of the nonlinear resistive elements and R_peec = R′ describes the behaviour of the PEEC of the PEEC resistance, in accordance with Section 2.1.

To avoid a MNA formulation including (S⊤)−1, the relation F⋅S−1=(S⊤)−1⋅F can be used, according to Section 2.1. Therefore, the matrices S∼,F∼ are defined as

S∼:=(S⊤00I)∈ℝ(n−1)×(n−1) ,F∼:=(F⊤000)∈ℝ(n−1)×(n−1) ,

whereby I denote the identity matrix and 0 denote the zero matrix.

Defining m := n − 1 + b_L,_peec + b_L,ext + b_U and by taking the previous preliminaries into account, the MNA formulation can be applied, for instance, (Riaza 2008, p. 215) or (Kvasnicka 2020, pp. 67–68), resulting in the DAE as follows

(1) M · d x ( t ) d t + f ( x ( t ) ) + b ( t ) = 0 m ,

Here, x(t):=(e(t)⊤,iL(t)⊤,iU(t)⊤)⊤∈ℝm is the vector of unknowns, consisting of node potentials e(t)= (eC,peec(t)⊤,eR,peec(t)⊤,eext(t)⊤)⊤, currents of independent voltage sources i_U(t) and inductive currents iL(t)=(iL,peec(t)⊤,iL,ext(t)⊤)⊤.

The matrix M∈ℝm×m, b:ℝ→ℝm and the relation f:ℝn−1×ℝbL×ℝbU→ℝm are defined as

M=(F∼+S∼ · AC,ext · Cext · AC,ext⊤0000Lpeec0000Lext00000),f(eiLiU)=(S∼ · (AR · γR(AR⊤ · e)+AL · iL+AU · iU)−AL⊤ · eAU⊤ · e),b(t)=(S∼ · AI · iQ(t)0−uQ(t)),

with known functions i_Q(t) and u_Q(t) of independent current and voltage sources, respectively. Finally, a DAE description of the conductive structure coupled with an external circuit is given. Based on these relations, numerical methods are applied for obtaining the PSS solution.

3. Numerical methods

For numerically computing the PSS solution of equation (1), some requirements have to be fulfilled, which in the following are briefly summarised. Firstly, the complete circuit to be analysed is supplied by T-periodic sources, i.e. i_Q(t) and u_Q(t) are T-periodic functions. Secondly, because of the presence of nonlinear elements, it is assumed that the describing DAE (1) ensures a PSS solution. Thirdly, the quasilinear DAE (1) is at most an index-1 DAE, whereby an introduction for the DAE index can be found, for instance, in (Riaza 2008, pp. 5–8) or (Schwarz and Tischendorf 2005, pp. 7–8).

The computation of the PSS solution is implemented with a single shooting based on BDF. This linear multistep method is a stable algorithm for computing the solution of an index-1 DAE (Ascher and Petzold, 1998, pp. 266–267). In the case of DAEs with a higher index, a stable functionality of BDF cannot be guaranteed, and therefore, an index reduction technique is essential.

Section 3.1 introduces a transient analysis algorithm based on BDF3, which is a part of the single shooting algorithm in Section 3.2. In both subsections, a solution strategy is provided to solve nonlinear systems of equations using the local Newton method. To achieve a better convergence behaviour, for instance, the implementation of a damped Newton method is recommended. However, the essential calculations are provided from the local Newton method.

3.1 Transient analysis using BDF3

Algorithm 1 (Kvasnicka, 2020, p. 40) is based on (Ascher and Petzold 1998, pp. 129–130 and pp. 266–267) and shows for a constant step-size h > 0 an implementation to solve the IVP of the DAE (1) regarding a consistent initial value x0=x(0)∈ℝm. Here, BDF3 is used, whereby BDF1 and BDF2 are recursively used in the initial phase. The coefficients of BDF1 to BDF3 are noted as a comment in Algorithm 1, in accordance with (Ascher and Petzold, 1998, p. 130). One possibility to find x_n_+1, which fulfils the relationship in line 6 of Algorithm 1, is the application of the local Newton method (Kvasnicka, 2020, p. 40), which is presented in the following. Firstly, in accordance with DAE (1), the Jacobian matrix Jf(x)∈ℝm×m with x:=(e⊤,iL⊤,iU⊤)⊤, is given as

(2) Jf(x)=(S∼ · AR· JγR(AR⊤· e)· AR⊤S∼ · ALS∼ · AU−AL⊤00AU⊤00).

Here, JγR(AR⊤· e) denotes the Jacobian matrix of the function γ_R, evaluated in the point AR⊤· e.

Secondly, the function F:ℝm→ℝm with

F(xn+1)=[1β0· h ·∑k=0K(αk · M · xn+1−k)]+f(xn+1)+b(tn+1) ,

is defined for K ∈ {1,2,3} and the BDF coefficients as given in Algorithm 1. It can be proven that

JF(x)=α0β0· h·M+Jf(x)

is the Jacobian matrix of F in x. Consequently, applying the local Newton method to solve F(x_n₊₁) = 0, the (ℓ + 1)-th iterated approximation of x_n₊₁, is given as

xn+1(ℓ+1)=xn+1(ℓ)−(JF(xn+1(ℓ)))−1·F(xn+1(ℓ)) .

Further, for example, the initial value xn+1(0)=xn can be chosen in the first Newton iteration, depending on the solution x_n in the previous time step.

3.2 Single shooting using BDF3

Algorithm 2 (Kvasnicka, 2020, p. 45) is based on (Kundert et al., 1990, pp. 65–70) and shows for a constant step-size h > 0 an implementation to solve the BVP of the DAE (1) with the condition x(0) = x(T), regarding a consistent initial value x0(0)∈ℝm.

Here, the implementation of a single shooting is based on BDF3 and an approximate Newton method to compute the initial value x0(ℓ) of the ℓ-th shooting iteration loop (Kvasnicka, 2020, pp. 42–45). According to (Kundert et al., 1990, pp. 65–70), the approximate sensitivity matrix S⁁(x0(ℓ)) is used in line 11 of Algorithm 2 for adaption of the initial value. Therefore, in line 10, the Jacobian matrix J_f(x_n₊₁) in accordance with equation (2) is needed. In addition, the parameter Tol_abs > 0 specifies the accuracy of the BVP solution, according to line 3.

4. Simulation and results

The proposed modelling and simulation strategy shall be tested on a NFC test problem consisting of two coupled loops which can be seen in Figure 3. The geometry parameters from the so-called Listener 1 antenna are given in (NFC Forum 2018, p. 91). On the ports of the loop antennas, matching circuits as well as source and load impedances are connected, as shown in Figure 4. Additionally, the passive receiving loop antenna is loaded with a full-wave rectifier according to the standardised Listener 1 test device (NFC Forum, 2018, p. 79). The conductive structure of the two coupled coils are modelled by b_L_,peec = 439 PEEC cells and n_C_,peec = 441 PEEC nodes applying the 1D PEEC method according to Section 2.1. The computation of the matrices P, L′ and R′ are implemented as proposed in (Torchio et al., 2017, p. 2).

The diodes D₁,…,D₄ are modelled as Schottky diodes BAR43S with the Shockley diode equation

iD(uD)=IS·(exp⁡(uDn˜·UT)−1) ,

using the parameters k_B = 1.380649 · 10⁻²³ J/K, T_abs = 300 K, qe=1.602·10−19 C, UT=kB·Tabsqe, n˜=1.4622 and I_S = 0.4345 μA.

The circuit in Figure 4 is supplied by u₀(t) = 3V·sin(2·π·f₀·t), with f₀ = 13.56 MHz and can be described by DAE (1) with m = 1326 unknowns. Moreover, equation (1) is an index-1 DAE in accordance with (Schwarz and Tischendorf 2005, p. 8) because loops contain capacitive elements only, i.e. pure C-loops (e.g. loop C_peec,1−C_p₁−C_peec,127), does not lead to a higher index. Hence, Algorithm 2 can be applied to solve the relating DAE (1). To achieve a better convergence behaviour, the implementation of Algorithm 2 was adapted on the damped Newton method like proposed in (Bank and Rose 1981, pp. 287–288). Additionally, the application of Algorithm 2 needs for uR=(uR,peec⊤,uR,ext,lin⊤,uD1,uD2,uD3,uD4)⊤ the Jacobian matrix

JγR(uR)=(Rpeec−1000Rext,lin−1000diag((diDℓ(uDℓ)duDℓ)1≤ℓ≤4)) ,

whereby diD(uD)duD=ISn˜·UT·exp⁡(uDn˜·UT) and R_ext,lin is a diagonal matrix consisting of external linear resistors.

The following computations are implemented in MATLAB^®, and the simulation was run on a Windows machine equipped with a 2-cores/4-threads processor (Intel^® Core™ i7-6500U CPU@2.50 GHz) and 16 GB RAM.

Firstly, the functionality of the single shooting method regarding Section 3.2 is verified by transient analysis regarding Section 3.1 (Kvasnicka, 2020, pp. 73–78). Further, the proposed formulation of the coupled field-circuit problem in terms of DAE system solved by a single shooting method is verified on a linear circuit with a time-harmonic PEEC solver. Therefore, the full-wave rectifier circuit connected between nodes 128 and 441, as shown in Figure 4, is replaced by a linear load resistance R_lin = 400 Ω. Hence, the load for the passive NFC test antenna is given by C_p₂ and R_lin, only. This linearised circuit was computed by single shooting and by a harmonic solver using the admittance method similar to (Ekman 2003, pp. 54–56). Figure 5(a) shows that the numerical computation of both methods was highly concordant for selected signals. The runtime of the harmonic solver was 0.198 s, and the single shooting method needed 121.5 s, whereby two shooting iteration loops were necessary.

Finally, the signals presented in Figure 5(b) give some selected results for the original nonlinear test problem shown in Figure 4. The runtime was 550.1 s for nine necessary shooting iteration loops. In both cases, a single shooting was configured with the initial value x0(0)=0. Due to the different time constants in the system, the transient analysis needed more than 3400 cycle durations to compute the PSS solution. For example, for N = 30 grid points per period duration, this resulted in a speedup with a shooting of about 114 (Kvasnicka, 2020, pp. 74–76).

5. Conclusion and outlook

Based on the quasi-static PEEC method for conductive structures, the NFC problem directly coupled with a nonlinear electrical circuit could be modelled. The proposed MNA formulation is able to handle independent sources, linear elements and nonlinear resistive elements. Finally, the entire circuit is described by means of a DAE, and the computation of the PSS solution is implemented by a single shooting. The proper functionality of the single shooting method was verified on a linear test problem, and an efficient calculation of a test problem containing nonlinear resistive elements could be shown.

Further investigations could inspect the behaviour of applications using general periodic sources. Moreover, the introduced theory can be adapted by using PEEC for dielectric or magnetic structures. With regard to higher frequencies and applications in the far-field further developments, including time retardation, become necessary.

Figures

Figure 1.

Circuit representation of the m-th PEEC cell. The voltage sources in the cell represent the capacitive and inductive coupling to other PEEC cells

Figure 2.

Equivalent circuit representation of the m-th PEEC cell used in the MNA approach

Figure 3.

Geometry of NFC test problem

Equivalent circuit of two coupled coils using PEEC method, matching network Cs1, Cs2, Cp1, Cp2, Rp and nonlinear load containing a full-wave rectifier

Figure 4.

Equivalent circuit of two coupled coils using PEEC method, matching network C_s₁, C_s₂, C_p₁, C_p₂, R_p and nonlinear load containing a full-wave rectifier

Figure 5.

(a) Comparison between harmonic solver and single shooting for linear circuit, (b) Computation of nonlinear circuit using single shooting. Shooting was computed for N = 50 grid points per period duration and Tol_abs = 10⁻⁵

References

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Bauernfeind, T., Baumgartner, P., Bíró, O., Hackl, A., Magele, C., Renhart, W. and Torchio, R. (2018), “Multi-objective synthesis of NFC-transponder systems based on PEEC method”, IEEE Transactions on Magnetics, Vol. 54 No. 3, pp. 1-4.

Bauernfeind, T., Baumgartner, P., Mušeljić, E. and Torchio, R. (2020), “Challenges in the synthesis of NFC transponders”, International Compumag Society (ICS) Newsletter, Vol. 27 No. 3, pp. 3-14.

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Kvasnicka, S. (2020), “Berechnung des periodisch eingeschwungenen Zustands von nichtlinearen Netzwerken unter Anwendung der partial element equivalent circuit Methode”, Master Thesis, Graz University of Technology.

NFC Forum (2018), “NFC forum: NFC analog technical specification”, Version 2.1, August 2018, available at: www.nfc-forum.org

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Schwarz, D.E. and Tischendorf, C. (2005), Structural Analysis for Electric Circuits and Consequences for MNA, Humboldt University of Berlin.

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Torchio, R. (2019), “Extending the unstructured PEEC method to magnetic, transient, and stochastic electromagnetic problems”, PhD thesis, Universitá degli Studi di Padova and Université Grenoble Alpes.

Corresponding author

Samuel Kvasnicka can be contacted at: samuel.kvasnicka@tugraz.at

Steady state solution of NFC model with nonlinear load using PEEC