Transient Response & Electromagnetic Behaviour of Flexible Bow-Tie Shaped Chip-less RFID Tag for General IoT Applications

This paper is an extension of Novel Flexible Chip-less Bow-Tie RFID tag in which we presented the design, testing and fabrication of the tag and compared the results with Octagonal Chipless RFID tag. The chipless RFID tag was designed by using simulation software CST microwave studio and fabricated by using laser etching technique on a flexible polymer substrate Polyethylene Terephthalate (PET). The tag operates at frequency ranging from 8 to 18 GHz uses the Frequency Selective Surface (FSS) approach. A series of experiments are performed to measure the Radar Cross Section (RCS) in an anechoic chamber. The tag design is composed of six concentric Bow-Tie shaped loop resonators with one unitary element. In this paper, we demonstrated the Singularity Expansion Method (SEM) based circuit modelling and the transient behaviour of the RFID tag is performed. The coupling coefficients and the induced currents over the surface of Bow tie shaped rings are evaluated. The maximum read range is evaluated and the Bow-Tie RFID tag is proved to be more accurate and efficient with the variation of distance up to 1.8m at 0dBm which is extendable to 2.14m for higher input power. This range is maximum to our knowledge for such a high-frequency range of 8-18GHz. The 4-bits Bow-Tie Chipless RFID tag design is compact and can be deployed commercially for general IoT applications.


Introduction
This paper is an extension of work originally presented in the 19 th International Symposium on Communications and Information Technologies (ISCIT) 2019 [1].
The Internet of Things (IoT) relies on smart environments comprises of wireless sensor networks [2] and personal area networks [3], [4] in which one interacts with IoT infrastructure must be uniquely identified. However, one big challenge is a need to commence seamless integration of IoT solutions with surroundings and with people [5]. Flexible materials for various IoT applications require a high level of integrity of components and mechanical robustness with repeated rolling and bending capabilities. In particular, flexible smart fitness watches, RFID tags and wearable sensors are good examples of applications that use flexible material. Besides, Elasticity and stretch-ability of materials are the key properties required by electronic devices that require large and reversible deformation. These bendable devices will also need to be versatile and may require the ability to store energy, operate with low power, and integrated with other devices and Internet of Things (IoT) applications [6]- [8].
The growth of wearable technology and the success of wearable devices has been hampered by limits such as the lack of materials and manufacturing techniques for seamless integration with electronic parts [9], the robustness in washing, drying and moulding [10], [11]. To address these challenges flexible polymerbased chipless RFID tag can be a good candidate.
In recent years, the research on wearable wireless communication and flexible devices has increased rapidly due to its usability and applications in personal communication systems [12]. For examples; Flexible antennas and Radio Frequency Identification (RFID) tags are used to keep track of several dailyroutine activities, such as heartbeat and blood pressure measurement, the distance walked, the steps are taken and the calories burnt [13].
RFID Technology is growing rapidly and has significant importance in various medical, industrial and commercial applications [13], [14] such as UHF RFID tags, Chipless RFID ASTESJ ISSN: 2415-6698 tags and Near Field Magnetic Coupled tags are being in used in various commercial applications and medical applications [15]. In the traditional RFID technology, the backscattered field from the tags are used to transmit information by using time-variant loading or scatterer modulation [16]- [19] however, this technique requires the physical movement of the object which needs to be coded by using inductive coupling or the impedance modulation. Besides, the conventional RFID tags are active circuit, carrying a small near field chip including a power source and a memory at the centre of the body. Whereas the chipless RFID technology doesn't require memory or a chip to save codes, instead, it uses the physical aspects of the body such as geometry and the shape to send the data [13]. The primary principle of the chipless technology is to get the resonance from the body and to encode the backscattered signal at the receiver, without additional circuitry or communication protocols [20]. Various techniques have been proposed but generally, the chipless RFID technology can be categorised into two groups. The first one is the time domain-based also called time-domain reflectometry-based designs, Surface Acoustic Wave (SAW) is an example of this. The second group is frequency domain-based RFID tags sometimes known as spectral-based tags, Frequency Selective Surface (FSS) is an example of this technique. The SAW-based chipless RFID tags are primarily worked by piezoelectricity, in which Interdigital Transducer (IDT) on the surface of piezoelectric materials are used to convert the electromagnetic wave into the acoustic wave. The acoustic waves generate the identification code while propagating through the metallic surfaces of the tag separated by a certain distance and stored on the tag [21], [22]. The SAW RFID tags are commercially available but some important issues such as the reduction in the size, increase in the read range and the data capacity needs to address 15. Besides, the FSS based frequency domain chipless RFID technique is quite promising, in which an incident electromagnetic wave is completely or partially reflected from the surface of the resonators and matches with the resonance frequency, based on the nature and the shape of the elements. The chipless RFID tags are known as passive tags as no additional power is required to operate, which make these tags promising for general IoT applications.
Passive chipless RFID tags have gained much importance as a good candidate for IoT applications because of no additional circuitry, small size, increased lifetime and the cost-effectiveness [23]. As compared to conventional RFID tags, passive tags have many significant advantages such as they are extremely cheap and can be printed over a piece of paper simple as barcodes. Moreover, the wearable applications in which washing and heating will affect the energy source, the absence of the battery and the electrical circuits make these tags promising [24].
The general structure of a chipless RFID system is an adaptive version of the Ultra-Wide Band (UWB) frequency radar [25], in which an incident electromagnetic wave from a transmitter strikes at the surface of the tag and reflect toward the reader and decoder, see Figure 1. When an incident wave E i on the surface of the conductive element, a current is induced at the resonant frequency, 9.2GHz in the case of chipless Bow-Tie RFID tag, see Figure 1.
In this paper, a 4-bit Bow-tie shaped chipless RFID tag is designed and the transient behaviour by the application of ElectroMagnetic (EM) wave is explained. In this design, the polarization feature of non-periodic bow-tie shaped cells is taken into account to get destructive and constructive interferences. The projection of the incidents wave and reflected field and decoded in terms of bits assigned to Radar Cross Sections (RCS) [26]. The RCS is a parameter to describe the level of scattering of a target object, in this case, a tag is the target object. This paper employs a simple equivalent model of the tag by using SEM-based circuit modelling. Furthermore, the coupling coefficients and the induced currents over the rings are evaluated and transient response of the Bow-Tie RFID tag is analysed. Finally, the maximum read range is calculated which is 1.8m for 0dBm and extendable to 2.14m for higher incident power, which is maximum to our knowledge for high frequencies of the range 8 to 18GHz.
The rest of the paper is organised as follows: Section II and Section III presents the tag design and its working principle, the material characterisation and optimised designs. Section IV presents the RCS measurements, which further describes the experimental verification of codes, on body RCS measurements, bending analysis and discussion. Finally, the conclusion is presented in Section V.

Design and Operation of Bow-Tie Chipless RFID Tag
The Bow-Tie shaped chipless RFID tag proposed in [1] is based on conventional Bow-tie shape which is opted as it has the most intense current flow on the edges of the resonating elements [27], hence cause a more intense backscattered signal. Another reason to opt this design is the fact that it provides more flexibility in designing at higher frequencies unlike octagonal [26], square [28], circular [29] and triangular [30] designs. Moreover, in Bowtie chipless RFID tag the asymmetrical shape of the tag in which the distance between the resonators is not constant, it diminished the mutual coupling as compared to the symmetrical surfaces, placed very close to each other [31]. In this paper, a 4-bit Bow-tie chipless RFID tag is proposed and the transient behaviour of the tag is presented. The robust tag is comprised of a periodic pattern of six Bow-tie shaped cells applicable for general IoT and wearable applications.

Working Principle
The resonant frequency of the tag depends on the inductance and the capacitance between the concentric metallic bow-tie shaped elements [32]. Therefore, when an EM wave strikes at the surface of the tag it induces currents and the corresponding capacitance and the inductances are changed. The extent of the reflected or transmitted wave after falling on the surface, depends upon the placement and the geometry of the rings. Aa results, surface currents (Jin) and (Jout) are induced on the inner and outer bow-tie shaped rings, respectively, as shown in Figure 2.
In this case, the whole structure including all the surrounding bow-tie rings, interact with each other and cause the creation of the standing waves. The standing waves produced the same polarization with an odd multiple of the difference of π phase by these surface currents which are approximately equal but opposite in phase. Hence, destructive interference results in backscatter wave (Es) and create a specific frequency response.

Electromagnetic Behaviour of the Bow-Tie RFID Tag
The circuit model of the Bow-Tie chipless RFID tag provides insight into the electromagnetic response of the circuit when an incident EM wave strike at the tag and the induced current reradiate the scattered fields. The current induced on the tag can be evaluated in different ways. One method is based on Singularity Expansion Method (SEM) in which the current induced on the tag is expanded in terms of the singularity poles of the tag. The concept of SEM has been widely used in circuit theory for a long time. Later on, this technique was used in evaluating EM response and designing of chipless RFID tags [33], [34], [35].

SEM-Based Equivalent Circuit of Chipless RFID Tag
In this paper, the SEM-based equivalent circuit of the octagonal chipless RFID tag is presented where the solution is evaluated as a collection of poles (Sn), coupling coefficient (Rn) and the entire function (Fe) in the complex frequency domain. The scattering analysis is performed by representing the chipless RFID tag with an equivalent circuit representation, see Fig. For electromagnetic response, the RFID scatterer assumed to be Perfectly Electric Conductor (PEC) in free space. Let's N be a total number of scatterers and an incident electric field E i strike at the surface of the tag and E s are scattered electric field with polarization vectors âi and âs, respectively. The E i causes an induced current (Jn) on the surface and the global resonances are demonstrated in the time domain as damped sinusoidal analogous to the Complex Natural Response (CNR) of the scatterer with some weighting residue as coupling coefficients (RN). The distance between the two scatterers is optimised in such a way that the coupling between one and the alternative scatterer is very small to be negligible. Hence, the coupling between the two scatterers only at a time and ignored the effects of the others on them.
The SEM-based circuit equivalent model of the octagonal chipless RFID tag is presented in Figure 3. where, R1, R2…..RN, L1, L2,…..LN define the resistances and the inductances and C1, C2,… CN is the inductance between two consecutive scatterers for N number of resonators.

Transient Response of Bow-Tie Chipless RFID Tag
The E i coupled to CNR's by coupling coefficients R i 1, R i 2,….. R i n which depends on the direction and the polarization of incident electric filed, whereas R i 1, R i 2,….. R i n denotes the coupling coefficients corresponding to E s . The CNR of the model is presented by a parallel RLC circuit in series with delay line (TL) which designate the turn-on time of CNR, and Fe shows the early time response of the tag. Whereas, the input Vi and output voltages Vs are defined at the transmitting and receiving antennas ports, respectively. where Q represents quality factor which is kept below 0.5 and the RFID first resonator resonates at f1=ω/2π.

Evaluation of Surface Current Distribution (Jn) and the Coupling Coefficients (Rn).
The current distribution over the first resonator, the outermost octagonal ring is I1 and V1 is the induced voltage due to incident fields corresponding to the impedance Z1 of the resonator then the current distribution over the octagonal scatterers can be evaluated by discretizing the length of the ring into N number of segments [15] as The CNR's for the first resonator is obtained by expending ∆1(sn) in complex Taylor series. ∆1(sn)= ∆1(s0) + ∆1 ʹ (s0) (s -s0) + … = 0 (7) By keeping the first two terms of the equation and ignoring the rest of values the CNR, sn, is obtained from sn=s0 - where s0 is the initial guess of resonant frequency, by repeating this procedure more accurate values can be evaluated for the first scatterer. For Bow-Tie design, the first resonance was calculated at approximately 9.2 GHz.
The equation (5) is modified to get current distribution for the first resonator of octagonal chipless RFID tag as     n n n n R I J ss = −  (9) where Rn the residue of nth pole and Jn is the surface current distribution over the surface of the scatterer, which is evaluated in the next section. Also, The time-domain response can be obtained by applying inverse Laplace transform to (9).
To study the mechanism of scattering by a 4-bit octagonal chipless RFID tag, the surrounding medium is supposed as a free space with permittivity ε0 and permittivity μ0, the scatterer is PEC and the thickness of the tag is very small hence considered to be zero. Consider an incident field E i strikes and the induced current over the surface of the tag is (Jn) then the scattered field E s from the tag is either obtained from Electric Field Integral Equation (EFIE) or Magnetic Field Integral Equation (MFIE) [36]. The EFIE is used which is represented in Laplace form [37].  The evaluation of coupling coefficients (R1 to R4) was not easy in the case of chipless Bow-tie RFID. This is because the distance between the two consecutive bow-tie shaped rings is not constant and hence mutual coupling varies, see Figure 6. Therefore, coupling coefficients are evaluated for the values of the maximum and the minimum distances between two consecutive rings at corresponding resonance, see Table 1. The values of coupling coefficients between the first two consecutive rings are -0.010 and -0.021 calculated for the maximum and the minimum spacing of 1.2mm and 0.23mm, respectively for 9.2GHz frequency, see Table  1. Similarly, all values are calculated for corresponding resonant frequencies of 11.3, 14 and 16.9 GHz. The maximum value of Rn from the table is -0.021 which is a sufficiently low value that assures reliable reading of the coded information. To reduce the mutual coupling the average spacing between the resonators can be increased, therefore the size of the tag would be significantly increased.

Flexibility and Bending Analysis
The Bow-Tie tag is designed on 13.44×11.56mm2 PET substrate of 70µm thickness with conductive gold rings varied in thickness [1].

Experimental Setup and RCS Results
The chipless Bow-tie RFID tag is printed on a PET substrate by using Universal Laser Systems (ULS). The measurements of To conduct the measurement, the testing is performed in the FRANKONIA anechoic chamber, having a frequency range of 30 MHz to 40 GHz. The compact Bow-Tie RFID tag design is highly flexible and the bit codes are successfully obtained up to the bending radius of 14mm [38]. The Bow-Tie RFID tag undergoes bending for the following cases of curvatures, flat, 14mm and 27mm, see Figure 7 (b).
The Passive Bow-tie RFID tag is placed in the horizontal (H) position to perform the bending analysis for the following cases flat, 14mm and 27mm. All the testing was performed in the Frankonia anechoic chamber. One of the impacts of bending is the signal strength degradation of the backscattered waves and the significant shift in the resonant frequency. In other words |RCS| is lowered while tag undergoes bending. In this case, since the distance of the tag from the reader, is kept very small about 12cm from the transmitter, so a very small reduction in the signal strength is obtained at 0dBm power. However, the percentage shift in the resonant frequency is quite prominent especially at a higher level of bending at 14mm, see Figure 8. Figure 8. depicts the impact of bending on the RCS obtained in the chamber. A shift of 4% from the resonant frequency is obtained, when a PET substrate-based chipless Bow-tie RFID tag undergoes bending curvature 27mm for the lower range of the frequencies 8-14 GHz, whereas, more than 10% shift is observed for higher range of frequency up to 18GHz. Hereafter, there is no noticeable reduction of the signal strength is observed because of the small distance of tag from the reader. Hence, the experimental results depict that the RCS obtained and encode in frequency signature, from the bent chip-less RFID tag fabricated on the flexible PET substrate.

Maximum Read Range Estimation
This section provides the maximum read range of Bow-Tie Chipless RFID tag. The complex RCS feature ( ) of octagonal chipless RFID designs can be obtained by the following equations which are described in [39].
Where 21 − is associated with the measurement taken in the empty chamber, 21 corresponds to reference value taken from define setup which could be any conductive surface, In this case, a copper square of 50mm x 50mm is taken.
is associated with the simulation results for the same reference. The results achieved for all the tags show a good agreement between the measured and simulated designs.
The radar equation is used [40] to evaluate the maximum read range of the RFID tag. For this, numerically calculated RCS are considered by using the equation is follows: Where and are the gains of the transmitting and receiving horn antennas, is the power transmitted by VNA to measure RCS, λ is the wavelength.
is the minimum power receive by receiving antenna and is the experimental values of RCS obtained from (14). For maximum read range calculations is taken for 1111bit codes, see Figure 8. flat case. The average RCS is obtained from a series of experiments [1] is around 0.02 m 2 . The maximum read range is evaluated for -10, -3 and 0dBm transmitted power from VNA and the maximum range observed is 1.80m and extendable to 2.15m for 3dBm power. Hence, a robust Bow-tie chipless RFID tag with transient analysis is successfully designed fabricated and tested, which is applicable for the IoT applications and the read range of the tag and bit capacity can be increased in future by using the asymmetrical property of the tag.

Conclusion
This paper is an extension of Novel Bow-Tie Chipless RFID tag which studies SEM-based circuit modelling of the bow-tieshaped tag. The electromagnetic response of the tag is presented and coupling coefficients are obtained by transient analysis. The behaviour of the RFID tag is completely studied and experimentally verified for different patterns of bitstreams measured in terms of RCS. The coupling coefficients measured in this analysis evaluated for the values of the maximum and the minimum distances between two consecutive rings at corresponding resonance of 9.2, 11.3, 14 and 16.9 GHz. The maximum value of Rn from the table is -0.021 which is a adequately low value that would not impact the reliable coding of the information. Furthermore, the bending on Flexible Chip-less Bow-Tie RFID tag operating within the range of 8-18GHz are described up to the maximum bend of 14mm and the information stored on a bent chip-less RFID tag made of PET is successfully recovered. Finally, the maximum read range for the RFID tag is evaluated which is 1.8m for 0dBm power but extendable to 2.15m for higher powers. This range is maximum to our knowledge for such a high-frequency range of 8-18GHz.