Abstract

The established statistical analysis, already used to treat overhead transmission power grid networks, is now implemented to examine the factors influencing modal transmission characteristics and modal statistical performance metrics of overhead and underground low-voltage/broadband over power lines (LV/BPL) and medium-voltage/broadband over power lines (MV/BPL) channels associated with power distribution in smart grid (SG) networks. The novelty of this paper is threefold. First, a refined multidimensional chain scattering matrix (TM2) method suitable for overhead and underground LV/BPL and MV/BPL modal channels is evaluated against other relative theoretical and experimental proven models. Second, applying TM2 method, the end-to-end modal channel attenuation of various LV/BPL and MV/BPL multiconductor transmission line (MTL) configurations is determined. The LV/BPL and MV/BPL transmission channels are investigated with regard to their spectral behavior and their end-to-end modal channel attenuation. It is found that the above features depend drastically on the frequency, the type of power grid, the mode considered, the MTL configuration, the physical properties of the cables used, the end-to-end distance, and the number, the electrical length, and the terminations of the branches encountered along the end-to-end BPL signal propagation. Third, the statistical properties of various overhead and underground LV/BPL and MV/BPL modal channels are investigated revealing the correlation between end-to-end modal channel attenuation and modal root-mean-square delay spread (RMS-DS). Already verified in the case of overhead high-voltage (HV) BPL systems, this fundamental property of several wireline systems is also modally validated against relevant sets of field measurements, numerical results, and recently proposed statistical channel models for various overhead and underground LV/BPL and MV/BPL channels. Based on this common inherent attribute of either transmission or distribution BPL networks, new unified regression trend line is proposed giving a further boost towards BPL system intraoperability. A consequence of this paper is that it aids in gaining a better understanding of the range and coverage that BPL solutions can achieve; a preliminary step toward the system symbiosis between BPL systems and other broadband technologies in an SG environment.

1. Introduction

The topic of this work is the use of the low-voltage (LV) and medium-voltage (MV) distribution power grids as a transmission medium for broadband communications. This kind of technology is known as broadband over power lines (BPL), and it is not only a promising solution for delivering broadband last mile access in remote and/or underdeveloped areas but also the key to developing an advanced IP-based power system, offering a plethora of potential smart grid (SG) applications [1–3].

Utilities employ either the overhead or the underground distribution power grid for new urban, suburban, and rural LV and MV installations. The choice is made according to different criteria like cost requirements, existing grid topology, and urban plan constraints [4–6].

When considered as a transmission medium for communication signals, the overhead and underground LV and MV power grids are subjected to attenuation, multipath due to various reflections, noise, and electromagnetic interference [7–14]. Each of the aforementioned adverse factors critically affects the overall performance and the design of BPL systems [15–18].

Due to the need of broadband communications through distribution power grids, the development of accurate channel models at high frequencies along the overhead and underground LV and MV distribution power lines is imperative. As usually done in BPL transmission, a hybrid model is employed to examine the behavior of BPL transmission channels installed on BPL multiconductor transmission line (MTL) structures [1, 8–11, 19–28]. Through a bottom-up approach consisting of an appropriate combination of the similarity transformation and MTL theory, the modes that may be supported by a BPL configuration are determined concerning their propagation constants and their characteristic impedances [1, 8, 22–32]. In this paper, a top-down approach, is proposed to determine the end-to-end attenuation of overhead and underground LV/BPL and MV/BPL modal channels. Based on an exact version of multidimensional chain scattering matrix or T-Matrix method, this novel extended T-Matrix (TM2) method combines the accuracy of the generic multidimensional network analysis tool presented in [22–24] and the simplicity of hybrid model of [8–11, 19–21]. The influence of factors, such as the physical properties of the cables used, the MTL configuration, the end-to-end distance, and the number, the electrical length, and the terminations of the branches encountered along the end-to-end BPL signal propagation are investigated based on numerical results concerning simulated overhead and underground LV/BPL and MV/BPL topologies.

On the basis of these numerical results, statistical properties of BPL modal channels are reported. The common nature of overhead and underground LV/BPL and MV/BPL transmission lines is mirrored on important statistical performance metrics, such as the attenuation exceedance probability, the average end-to-end attenuation, and the root-mean-square delay spread (RMS-DS) of BPL modal channels. Specifically, it is confirmed that average end-to-end channel attenuation and RMS-DS in overhead and underground LV/BPL and MV/BPL modal channels are positively correlated lognormal random variables being in agreement with: (i) relevant sets of measurements and relevant distributions of recently proposed statistical BPL channel models [33–41]; (ii) recent simulation results regarding various overhead HV/BPL channels [19]. Since this inherent statistical characteristic is validated in the cases of overhead and underground LV/BPL, MV/BPL, and HV/BPL power grids, a suitable unified approximation is proposed—UNI¹ regression trend line—that commonly describes either BPL distribution or transmission power grids enhancing the common handling of BPL networks in an SG landscape.

The rest of this paper is organized as follows. In Section 2, the modal behavior of BPL propagation is discussed along with the necessary assumptions concerning overhead and underground LV/BPL and MV/BPL transmission. Section 3 deals with signal transmission via power lines by the TM2 method which is applied for the evaluation of the end-to-end modal transfer functions. Section 4 provides a description of the modal statistical performance metrics considered. In Section 5, numerical results are provided, aiming at marking out how the various features of the overhead and underground LV and MV distribution power grids influence BPL transmission and statistical performance metrics. Section 6 concludes the paper.

2. The Physical BPL Layer

The overhead and underground LV and MV distribution power grids differ considerably from signal transmission via twisted-pair, coaxial or fiber-optic cables due to the significant differences of the network structure and the physical properties of the power cables used [1, 5–8, 10, 15, 42].

2.1. Overhead LV and MV Power Distribution Networks

A typical case of overhead LV distribution line is depicted in Figure 1(a). Four parallel noninsulated conductors are suspended one above the other spaced by in the range from 0.3 m to 0.5 m and located at heights ranging from 6 m to 10 m above ground for the lowest conductor. The upper conductor is the neutral, while the lower three conductors are the three phases. This three-phase four-conductor overhead LV distribution line configuration is considered in the present work consisting of ASTER  mm²   mm² conductors [4, 5, 30, 31, 43, 44].

Figure 1 

Typical multiconductor structures. (a) Overhead LV. (b) Overhead MV. (c) Underground LV. (d) Underground MV [8, 10, 22, 45].

Overhead MV distribution lines hang at typical heights ranging from 8 m to 10 m above ground. Typically, three parallel noninsulated phase conductors spaced by in the range from 0.3 m to 1 m are used above lossy ground. This three-phase overhead MV distribution line configuration is considered in the present work consisting of ACSR  mm² conductors, see Figure 1(b)—[1, 4, 5, 8, 9, 42, 46].

The ground is considered as the reference conductor. The conductivity of the ground is assumed  mS/m and its relative permittivity , which is a realistic scenario [1, 8–10, 42].

The impact of imperfect ground on signal propagation over power lines was analyzed in [1, 8, 9, 42, 47–50]. This formulation has the advantage that, contrary to other available models for overhead power lines [44, 51–53], it is suitable for transmission at high frequencies above lossy ground and for broadband applications of overhead LV/BPL, MV/BPL, and HV/BPL systems.

2.2. Underground LV and LV Power Distribution Networks

The underground LV distribution line that will be examined in the simulations is the three-phase HN33S33 underground LV distribution cable ( mm² mm² Al, PVC, Steel-Pb shield). The layout of this cable is depicted in Figure 1(c). The cable arrangement consists of the three-phase three-sector-type conductors, one core-type neutral conductor, and one shield conductor grounded at both ends. The neutral conductor is in galvanic contact with the shield. Hence, the shield is obtained by its concatenation with the neutral conductor [4, 5, 22–24, 26, 43].

The underground MV distribution line that will be examined is the three-phase sector-type PILC distribution-class cable (8/10 kV,  mm² Cu, PILC). The cable arrangement consists of the three-phase three-sector-type conductors, one shield conductor, and one armor conductor, see Figure 1(d). The shield and the armor are grounded at both ends [10, 54–57].

Due to the common practice of grounding at both ends, the shield acts as a ground return path and as a reference conductor and separates the inner conductors electrostatically and magnetostatically from the remaining set. Hence, the analysis may be focused only on the remaining four-conductor transmission line (TL) of interest consisting of the three phases and the shield. This is the common procedure either in theoretical analyses or in measurements [4–6, 10, 22–24, 26, 45, 54–60].

This paper focuses on broadband propagation via HN33S33 underground LV distribution cable and the PILC underground MV distribution cable because: (i) in many countries, these types of cable are dominant in urban and suburban underground LV and MV power distribution installations, respectively [54, 55, 61–63]; (ii) the theoretical results obtained concerning the propagation characteristics of the modes supported are found to be in excellent agreement with the experimental results obtained from the cable measurements [22–24, 26, 43, 54, 57]; (iii) the above LV and MV underground distribution cables—rather than other LV and MV underground cables which present lower attenuation—are studied because these types of cable behaves closer to the line-of-sight (LOS) transmission behavior (corresponding to “LOS” transmission in wireless channels) in the majority of existing underground LV and MV distribution grids. Thus, an indicative picture of the real world situation will be obtained [4, 6, 55].

Signal transmission via three-phase underground power lines has been analyzed in [10, 22–24, 26, 45, 64–67]. This formulation considers high frequency BPL transmission in the general case of underground power lines consisting of three-phase conductors with common shield and armor. It is suitable for transmission at high frequencies for broadband applications of underground LV/BPL and MV/BPL systems.

2.3. Modal Analysis of Overhead and Underground LV/BPL and MV/BPL Systems

Through a matrix approach, the standard TL analysis can be extended to the MTL case which involves more than two conductors. Compared to a two-conductor line supporting one forward- and one backward-traveling wave, an MTL structure with conductors parallel to the axis as depicted in Figures 1(a), 1(b), 1(c), and 1(d) may support n pairs of forward- and backward-traveling waves with corresponding propagation constants. These waves may be described by a coupled set of 2n first-order partial differential equations relating the line voltages , to the line currents , . Each pair of forward- and backward-traveling waves is referred to as a mode [1, 8, 10, 19–21, 29–31, 42].

By extending the modal analysis to examine signal transmission via overhead and underground LV and MV distribution power cables, it was found out that n modes may be supported, namely: (i) the common mode (CM) which propagates via the n conductors and returns via the ground or the shield for overhead or underground BPL systems, respectively; (ii) the differential modes (, ) which propagate and return via the n conductors. In the overhead case, , , , and ,   constitute the propagation constants of overhead LV/BPL CM (), overhead LV/BPL DMs (), overhead MV/BPL CM (), and overhead MV/BPL DMs (), respectively [1, 4, 5, 8, 22–24, 26, 30, 31, 42, 43, 47–50]. Similarly, in the underground case, ,  , , and   constitute the propagation constants of underground LV/BPL CM (), underground LV/BPL DMs (), underground MV/BPL CM (), and underground MV/BPL DMs (), respectively [8–11, 22–24, 26, 30, 31, 43, 54–57, 68].

The attenuation coefficients ,  , , and   of the , the three , the , and the two are plotted versus frequency in Figure 2(a) for the overhead and underground LV/BPL configurations depicted in Figures 1(a) and 1(c), respectively. In Figure 2(b), the attenuation coefficients ,  , , and    of , the two , , and the two DMs are plotted with respect to frequency for the overhead and underground MV/BPL configurations depicted in Figures 1(b) and 1(d), respectively. The phase delays ,   , ,  , ,   , , and    of the , the three , the , the two , , the two , , and the two , respectively, (not plotted in this paper) are linear functions of frequency [1, 8, 9, 19–21, 42, 47–50, 54, 56, 57, 68].

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Figure 2 

Frequency spectra of attenuation coefficients of BPL power distribution networks (the subchannel frequency span is equal to 0.1 MHz and logarithmic scale is used for the -axes). (a) Overhead and underground LV. (b) Overhead and underground MV.

As it has already been presented in [8–11, 19–21], the modal voltages and the modal currents may be related to the respective line quantities and via the similarity transformations [8, 10, 19–22, 30, 31] where denotes the transpose of a matrix, and are matrices depending on the frequency, the physical properties of the cables, and the geometry of the MTL configuration [8, 10, 19–22, 30, 31]. Through the aforementioned equations, the line voltages and currents are expressed as appropriate superpositions of the respective modal quantities. From (1)

The TM2 method—considered in Section 3—models the spectral relationship between , and , proposing operators , so that where is a matrix operator whose elements , with are the modal cochannel (CC) transfer functions, while those , with are the modal cross-channel (XC) transfer functions and denotes the element of matrix in row of column . From (1), the matrix channel transfer function relating with through is determined from Based on (6), the matrix transfer function of the BPL distribution networks is determined.

3. Evaluation of the End-to-End Modal Transfer Functions

So far, several methods with converging results have been used to determine the modal transfer functions of BPL transmission channels [8–11, 19–24, 43, 69, 70]. In this paper, based on the well-established hybrid model of [8–11, 19–21] and the generic multidimensional network analysis of [22–24], the TM2 method is demonstrated. TM2 method constitutes a refined exact version of scattering matrix (SM) and TM methods—analyzed in [8–11, 19–21]—and is validated in overhead and underground LV/BPL and MV/BPL networks.

More specifically, similarly to TM method, in order to apply the TM2 method, an end-to-end BPL connection is separated into segments—network modules—, each of them comprising the successive branches encountered—see Figure 3(a). Signal transmission through the various network modules is taken into account based on the concatenation of respective chain scattering or T-matrices. A typical overhead or underground LV/BPL or MV/BPL end-to-end connection comprises branch-type network modules, as depicted in Figure 3(b), while A and B are assumed matched [1, 6, 8–11, 16, 19–21, 42, 48].

Figure 3 

(a)End-to-end BPL connection with N branches. (b) Network module. (c) An indicative BPL topology considered as a cascade of modules corresponding to N branches [8–11, 19–21].

These “branch” modules may be considered as a cascade of two submodules. The multidimensional scattering characteristics of these two submodules—detailed in [22–24]—may be determined as follows.(i)A “transmission” submodule representing a transmission line of length with the scattering matrix where is the corresponding × diagonal transmission matrix, is an × matrix with zero elements, and , , , are the matrix elements of the as evaluated from (7). , , and are the set with elements the propagation constant of the modes, the eigenbase, and the number of conductors, respectively, characterizing this “transmission” submodule MTL configuration. Since one type of overhead and underground LV/BPL and MV/BPL configuration is used across the end-to-end BPL connection it is assumed that and are the reference eigenbase and the reference number of conductors, respectively.(i)A “shunt” submodule representing the cascade of: (a) an reflection matrix associated with the branch terminations; (b) an 2 scattering matrix —similar expression to (7)—representing the branch transmission line of length ; (c) an connection matrix defining the interconnections between the transmission and branch conductors; with 2 scattering matrix where is the branch termination matrix, , , , are the matrix elements of the matrix as determined from (8), and and are the set with elements the propagation constant of the modes and the number of conductors, respectively, related to this “shunt” submodule MTL configuration [22–24]. Note that the number of conductors may vary from “transmission” to “shunt” submodules. Through the eigenbase change procedure—presented analytically in [22–24]—and by taking under consideration the reference eigenbase and reference number of conductors , scattering matrices , , and may be grouped together through their cascading. Hence, the “shunt” scattering matrix of (8) may be evaluated.

Based on the specialized algebra for handling multidimensional scattering matrices presented in [71, 72] and by using (7) and (8), the “transmission” submodule chain scattering matrix and the “shunt” submodule chain scattering matrix are determined by where , , , are the matrix elements of the as determined by (9) and , , , are the matrix elements of the as evaluated from (10). Taking into consideration (9) and (10), the chain scattering matrix of a “branch” module, , is determined in the appropriate cascade rule order through the following multiplication rule [27, 28, 71, 72]:

The last module of the BPL connection is the “load” module. Similarly to “transmission” submodule characteristics of (9), the chain scattering matrix of the “load” module is given by

Having determined the chain scattering matrices of the various network modules encountered along the end-to-end connection, as it has already been detailed in [71, 72], the 2 overall end-to-end chain scattering matrix is evaluated through the multiplication rule of (11) from and the overall end-to-end scattering matrix is obtained from

where , , , are the matrix elements of the as evaluated from (13) and , , , are the elements of the matrix as defined from (14).

Combining (4) and (14), the × modal transfer function matrix is given by the element of the matrix, that is,

The proposed TM2 method is extremely flexible since it is also able to calculate modal transfer functions associated with any type of BPL distribution network including various types of overhead and underground LV/BPL and MV/BPL configurations, any type of interconnection at the branches, and any type of branch termination. This permits the direct application of TM2 method in contrast with legacy SM and TM methods where the assumption of specific transmission assumptions were necessary, thus limiting their general application [1, 8–11, 22, 28, 73]. Finally, contrary to SM and TM methods, the problem of mode mixture now can be fully investigated through the definition of the modal XC transfer functions, as given in (15).

4. Statistical Performance Metrics of the Modal Channels

Extending the statistical performance metrics of overhead HV/BPL coupling scheme channels presented in [19], based on the end-to-end modal transfer functions of the independent modal BPL transmission channels, as given by (15), several useful modal metrics are first presented concerning the statistical properties of the BPL modal channels existing in overhead and underground LV and MV configurations, as follows.(a)The modal discrete impulse response. Once the end-to-end modal transfer function is known from (15), modal discrete impulse response , , is obtained as the power of two J-point inverse discrete Fourier transform (IDFT) of the discrete end-to-end modal transfer function: where is the imaginary unit, is the Nyquist sampling rate, is the flat-fading subchannel frequency span, is the number of subchannels in the BPL signal frequency range of interest, and and are the amplitude response and the phase response of the discrete end-to-end modal transfer function, respectively [19, 33–35].(b)The average end-to-end modal channel gain. As the BPL channel is frequency selective, the average end-to-end modal channel gain can be calculated by averaging over frequency where , is the average end-to-end modal channel gain. The lognormality (normality) of the average end-to-end modal channel gain may be justified by the multipath nature of BPL signal propagation and the TL modeling using on cascaded two-port network modules [19, 33–35, 38–41].(c)The modal RMS-DS. It is a measure of the multipath richness of a BPL modal channel. The modal RMS-DS is determined from [19, 33–35, 38–41]: where (d)The relationship between end-to-end modal channel attenuation and modal RMS-DS. Recently, several statistical channel models have investigated the correlation between end-to-end BPL channel attenuation and RMS-DS which appears to be a universal property of wireline channels (e.g., overhead HV/BPL, DSL, coaxial, and phone link channels) [19, 33–41]. In this paper, the already proposed approaches for coupling scheme channels are extended so as to describe modal channels, say these approximations aim at identifying the distribution of the end-to-end modal channel attenuation and modal RMS-DS. Their main advantage is that they summarize statistical results carried out on a variety of BPL system data sets proposing suitable trend lines for overhead and underground LV/BPL and MV/BPL modal channels of the following form: where is the average end-to-end channel attenuation in dB, is the RMS-DS in μs, and is the average end-to-end channel gain in dB of the BPL modal channel examined. Parameters and constitute the robust regression parameters and are calculated using appropriate robust regression techniques depending on the modal channel considered and the technique adopted.(e)The attenuation exceedance probability. It is the probability that the end-to-end modal channel attenuation , exceeds a certain level. The distribution of the attenuation exceedance probability may be determined for any overhead or underground LV/BPL or MV/BPL channel. It provides a qualitative macroscopic estimate of how steep is the end-to-end attenuation of BPL channels and may help to determine: (i) the positions where the installation of signal repeaters is necessary in SG networks; (ii) the thresholds related to the application of orthogonal frequency-division multiplexing (OFDM) systems, discrete multitone modulation (DMT) systems, and of various resource allocation schemes [8, 9, 11, 17, 19, 74–76].

5. Numerical Results and Discussion

The simulations of various types of overhead and underground LV/BPL and MV/BPL transmission modal channels aim at investigating (a) their broadband transmission characteristics; (b) how their spectral behavior is affected by several factors, such as the type and the topology of the distribution power grid; (c) statistical remarks obtained on the basis of simulated and measured BPL topologies.

For the numerical computations, the overhead and underground LV and MV distribution line configurations depicted in Figures 1(a)–1(d), respectively, have been considered. As already mentioned in Section 2 and analyzed in Section 3, since the modal channels supported by the overhead and underground LV/BPL and MV/BPL configurations may be examined separately, it is assumed for simplicity that the BPL signal is injected directly into the modal channels [1, 8–11, 19, 22–24, 26, 27, 30, 31, 42, 73]; thus, the complicated modal analysis of [30, 31], briefly described in Sections 2 and 3, is avoided. In addition, since the mode mixing is not among the scopes and contributions of this paper, the following analysis is concentrated only on the investigation of modal CC transfer functions rather than XC ones.

As it concerns the system specifications, the sampling rate and flat-fading subchannel frequency spacing are assumed MHz and MHz, respectively. Thus, the number of subchannels K in the BPL signal frequency range of interest and the J-point IDFT are assumed equal to 496 and 1024, respectively.

As usually done to simplify the analysis [1, 8–11, 19–21, 42, 48, 54, 57, 62, 68], only one mode for each BPL system will be examined, hereafter. This assumption does not affect the generality of the analysis concerning the transmission characteristics of the examined BPL systems in the range from 1 MHz to 100 MHz and is adopted for the sake of terseness, economy, and simplicity. Hence, the transmission characteristics of only one mode for each BPL system, say that of , will be examined, hereafter. Consequently, only the CC transmission characteristics of , , , and , for overhead LV/BPL, overhead MV/BPL, underground LV/BPL, and underground MV/BPL systems, respectively, will be examined in the rest of the paper.

The simple BPL topology of Figure 3(a), having branches, has been considered. In order to validate the accuracy of TM2 method and simplify the following analysis without affecting its generality, the branching TLs are assumed identical to the distribution TLs and the interconnections between the distribution and branch conductors are fully activated. With reference to Figure 3(c), the transmitting and the receiving ends are assumed matched to the characteristic impedance of the mode considered, whereas the branch terminations , are assumed open circuit, that is, , where is the identity matrix—[1, 4, 8–11, 19–22, 42].

In urban areas, about 45%–75% of the underground grids exhibit path lengths shorter than 200 m and only 1%–9% longer than 500 m. The latter case constitutes the worst-case scenario with regard to underground BPL transmission [4, 5, 55]. Hence, path lengths of the order of 200 m to 250 m are encountered in underground BPL transmission. These path lengths are quite shorter compared to the overhead BPL case where path lengths up to 1000 m may be encountered [1, 4, 5, 9, 11–13, 22, 23, 42, 44, 48, 55, 64, 77, 78].

With reference to Figure 3(c), five indicative overhead topologies, which are common for both overhead LV/BPL and MV/BPL systems, concerning end-to-end connections of average lengths equal to 1000 m have been examined, as follows.(1)A typical overhead urban topology (overhead urban case A) with branches ( 500 m, 200 m, 100 m, 200 m,   8 m, 13 m, 10 m).(2)An aggravated overhead urban topology (overhead urban case B) with branches ( 200 m, 50 m, 100 m, 200 m, 300 m, 150 m, , , 28 m, 41 m, 17 m).(3)A typical overhead suburban topology (overhead suburban case) with branches ( 500 m, 400 m, 100 m, 50 m, 10 m).(4)A typical overhead rural topology (overhead rural case) with only 1 branch ( 600 m, 400 m, 300 m).(5)The overhead “LOS” transmission along the same end-to-end distance 1000 m when no branches are encountered.

The respective indicative underground topologies, which are common for both underground LV/BPL and MV/BPL systems, concern 200 m long end-to-end connections. These topologies are as follows.(1)A typical underground urban topology (underground urban case A) with 3 branches ( 70 m, 55 m, 45 m, 30 m, 12 m, 7 m, 21 m).(2)An aggravated underground urban topology (underground urban case B) with 5 branches ( 40 m, 10 m, 20 m, 40 m, 60 m, 30 m, 22 m, 12 m, 8 m, 2 m, 17 m).(3)A typical underground suburban topology (underground suburban case) with branches ( 50 m, 100 m, 50 m, 60 m, 30 m).(4)A typical underground rural topology (rural case) with only branch ( 50 m, 150 m, 100 m).(5)The underground “LOS” transmission along the same end-to-end distance 200 m when no branches are encountered.

5.1. TM2 Method Verification and Effect of Grid Topology on Overhead and Underground LV/BPL and MV/BPL Transmission

To compare the proposed TM2 method with other established methods [11, 16, 19–21, 32, 79] and simultaneously examine the end-to-end modal channel attenuation behavior for different LV/BPL and MV/BPL types and topologies, in Figures 4(a)–4(e), the end-to-end channel attenuation from A to B for the propagation of is plotted with respect to frequency for the aforementioned five indicative overhead LV topologies, respectively, applying the proposed TM2 method, the TM method [11, 19–21], and the multipath echo-based (MEB) method [6, 16, 79]. In Figures 4(f)–4(t), similar plots are drawn in the case of overhead MV, underground LV, and underground MV indicative topologies, respectively. Observations based on Figures 4(a)–4(t) were made as follows.(i)As it concerns the validity of TM2 method, it is observed that the three methods coincide in all the BPL types and topologies examined yielding excellent results of convergence regardless of the overhead/underground power grid type and topology. Moreover, since in a realistic BPL distribution network, due to reflections and multipath propagation caused by branches, spectral notches are observed in the end-to-end modal channel attenuation, the accurate description of the number and the behavior of these spectral notches consist a crucial and defining element in order to obtain a representative image of their real behavior. Actually, The TM2 method describes the spectral notches accurately either in depth or in spectral extent in any multipath environment. Thus, the TM2 method offers an accurate representation of the attenuation discontinuities caused by branching. It is also easily adapted to various network topologies resulting from various kinds of branches or transformers [8, 19, 55, 64, 77, 78]. Due to the unique combination of generality and modular simplicity, the TM2 method will be adopted in the following simulations concerning the behavior of overhead and underground LV/BPL and MV/BPL modal channels.(ii)In a realistic BPL network, the spectral behavior of the end-to-end channel attenuation depends drastically on the frequency, the type of grid, the physical properties of the cables used, the end-to-end—“LOS”—distance, and the number, the electrical length, and the terminations of the branches encountered along the end-to-end BPL signal transmission path [6, 8, 9, 11, 16, 19, 55, 64, 68, 77]. As it has been pointed out from the above figures, due to reflections and multipath propagation caused by branches, spectral notches are observed in the end-to-end channel attenuation. The number and the behavior of these spectral notches significantly depend on the number of branches encountered along the end-to-end transmission path as well as on the branch electrical length. These spectral notches are superimposed on the exponential “LOS” attenuation [8, 19, 55, 64, 77, 78].

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Figure 4 

Application of the coinciding proposed TM2 method, TM method, and MEB method to determine the end-to-end channel attenuation for the propagation of DM1 versus frequency for different overhead and underground LV/BPL and MV/BPL types and topologies (the subchannel frequency spacing is equal to 1 MHz). (a) Urban case A/overhead LV. (b) Urban case B/overhead LV. (c) Suburban case/overhead LV. (d) Rural case/overhead LV. (e) “LOS” case/overhead LV. (f) Urban case A/overhead MV. (g) Urban case B/overhead MV. (h) Suburban case/overhead MV. (i) Rural case/overhead MV. (j) “LOS” case/overhead MV. (k) Urban case A/underground LV. (l) Urban case B/underground LV. (m) Suburban case/underground LV. (n) Rural case/underground LV. (o) “LOS” case/underground LV. (p) Urban case A/underground MV. (q) Urban case B/overhead MV. (r) Suburban case/overhead MV. (s) Rural case/overhead MV. (t) “LOS” case/underground MV.

In Figures 5(a) and 5(b), the attenuation exceedance probability of is plotted versus end-to-end channel attenuation for the aforementioned indicative LV and MV topologies, respectively. As readily verified observing the respective attenuation distributions, the attenuation exhibited by underground channels is dramatically worse than the attenuation of overhead ones. This explains why in most underground channels distance rather than multipath is identified as the dominant factor affecting signal transmission. The opposite is observed in overhead channels, where the effect of multipath is significantly more severe and is recognized as the primary attenuation factor. Therefore, in urban and suburban environments denser BPL networks are preferable [4, 5, 8–11, 55].

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Figure 5 

Attenuation exceedance probability of DM1 versus frequency for urban case A, urban case B, suburban case, rural case, and “LOS” transmission case. (a) Overhead and underground LV. (b) Overhead and underground MV.

Based on the picture of the spectral behavior obtained from Figures 4(a)–4(t) and Figures 5(a) and 5(b), as it has already been mentioned in the case of overhead HV/BPL systems, the taxonomy of BPL distribution grids remains the same; the BPL modal channels may be classified into the following three channel classes [8–11, 19, 41, 75, 80].

(i)“LOS” channels, representing end-to-end transmission when no intermediate branches exist. No spectral notches are observed. This case corresponds to the best possible BPL transmission conditions, encountered sometimes in rural or suburban and rarely in urban areas.(ii)Good channels, when a small number of relatively long branches are encountered along the end-to-end connection. Shallow spectral notches are observed. BPL transmission in rural, suburban, and several urban areas belongs to this channel class.(iii)Bad channels, when the number of branches is large and their electrical length is small. Deep spectral notches are observed. BPL transmission in many urban areas belongs to this channel class.The spectral behavior of the above BPL modal channel classes critically affects the transmission characteristics of BPL modal channels.

5.2. On the Statistical Relationship between End-to-End Modal Channel Attenuation and Modal RMS-DS

Based on the statistical performance metrics presented in Section 4 and the notion already acquired from overhead HV/BPL coupling scheme channels in [19], a physically meaningful statistical characterization of the BPL modal channels is obtained permitting important properties of the overhead and underground LV/BPL and MV/BPL to come to light. Table 1 summarizes the metrics of average end-to-end modal channel attenuation and modal RMS-DS for the aforementioned indicative overhead and underground LV/BPL and MV/BPL topologies for the propagation of DM₁.

Similarly to [19], the spectral behavior of overhead and underground LV/BPL and MV/BPL modal channels is reflected on the corresponding statistical performance metrics. Indeed, though determined for 1000 m long connections, compared to the 200 m long connections of the underground cases, the metric of average end-to-end modal channel attenuation of overhead transmission is significantly better than the underground one. Furthermore, an indicative picture of the above channel classification can be obtained studying the metric of modal RMS-DS. Since, in bad channel class, superimposed multipath critically affects signal transmission, bad channel class—primarily urban case B and secondarily urban case A—tends to exhibit higher values of modal RMS-DS in comparison with the good channel class, either suburban or rural cases. “LOS” channels are characterized by the best possible modal RMS-DS values, as these channels represent end-to-end transmission when no multipath exists.

Recently, several statistical approaches investigating the relationship of end-to-end attenuation and RMS-DS have been proposed [19, 33–41, 55]. Various measurements for different BPL topologies have been also performed in the frequency range from 1 MHz to 100 MHz focusing on the evaluation of distribution function between average end-to-end channel attenuation and RMS-DS. These measurements may be classified into the following set:(i)field trial measurements in real in-home LV/BPL suburban and urban networks [36, 37];(ii)field trial measurements in underground MV/BPL power network [33–35].The correlation between average end-to-end channel attenuation and RMS-DS can be easily verified observing the scatter plot presented in Figure 6 where the above set of measurements and the set of numerical results of DM₁ for the aforementioned indicative overhead and underground LV/BPL and MV/BPL topologies, presented analytically in Table 1 and denoted as overhead LV/BPL power networks, overhead MV/BPL power networks, underground LV/BPL power networks, and underground MV/BPL power networks, are plotted. In the same figure, regression lines, as given by (20), are also plotted, namely, (i) GAL approach, as proposed in [33–35], with robust regression parameters assumed  μs/dB and = 0.183 μs; (ii) TON approach, as given by [39], with robust regression parameters and assumed equal to 0.0197 μs/dB and 0 μs, respectively; (iii) the proposed UNI¹ approach, as defined in [19], with regression parameters  μs/dB and  μs.