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Power System Series Resonance Studies by Modified Admittance Scan Felix O. Kalunta, MNSE, Frank N. Okafor, FNSE, Member, IEEE, Osita U. Omeje Abstract โ This paper presents a modified method of formulating the loop admittance matrix which is deployed to identify the series resonant frequencies in large electrical networks involving numerous shunt capacitances. Three matrices were assembled from the network R, L and C elements and later synthesized to obtain the network loop admittance matrix. Its application to a sample network has shown the practicability and effectiveness of this method. This paper also seeks to demonstrate the impact of certain factors like cable capacitance and skin effect on the value of resonant frequencies. Index Terms โ Harmonic Resonance, Loop Admittance Matrix, Power Quality and Series Resonance. I. INTRODUCTION The application of capacitor banks in the power industry has yielded some utility benefits such as power factor correction, voltage support and release of system capacity. However, their interaction with system inductive supply circuit [1, 2] causes power quality problems by way of amplifying high order harmonics. These could lead to overheating, failure of the capacitor banks themselves or blowing of power transformer units resulting in constant interruption in production schedules. Another concern is that the broadband spectrum emitted in the process could result in emission limits being exceeded for non-characteristic harmonics and for inter-harmonics. The challenge is how to theoretically predict the resonant frequencies based on which appropriate mitigation measures can be included at the planning stage or the magnitude of amplified currents for the power equipment to be de-rated in order to withstand this exigency. There is also the need to indicate which of the system component is under the threat of series resonance [3]. The papers [4 โ 5] describes the use of frequency scan technique to detect the possible resonant frequencies in the electrical network while [5, 6] presented a harmonic resonance mode assessment based on the analysis of eigenvalues and eigenvectors of the system bus impedance matrix. Further details of modal analysis in the study of resonance are treated in the technical literature [9-11]. _______________________________________________ Felix O. Kalunta is currently pursuing his Ph.D degree with the Department of Electrical/Electronic Engineering, University of Lagos, Nigeria. He is on study leave from Federal Institute of industrial Research Lagos, Nigeria (e-mail: [email protected]). Osita U. Omeje is currently pursuing his Ph.D degree with the Department of Electrical/Electronic Engineering, University of Lagos, Nigeria (e-mail: [email protected]) Frank N. Okafor is a professor with the Electrical/Electronic Engineering Department, University of Lagos, Nigeria. (e-mail: [email protected]). These methods are primarily suitable for parallel resonance problem with little adaptation to the analysis of series resonance. The reason lies in the close relationship between loop impedance and the occurrence of series resonance. An attempt to apply the modal analysis to series resonance problem was also made [8] but yielded an incomplete solution. A dummy branch method was later incorporated into the modal analysis but the approach seems more like a short circuit study which does not reflect the actual series resonance scenario. The loop admittance scan technique is an adaptation of frequency scan for locating the resonance peaks in a series resonance problem. Calculations are performed to determine the loop admittance matrix of the concerned network, while the driving point admittances are the determinants of the resonant frequencies. The complexities involved in the calculation of the loop admittance matrix for large power networks especially when cable capacitance is involved have necessitated the need for a modified admittance scan. In such cases, matrix of network elements R, L and C are easily assembled by computer programming and later synthesized to form a loop impedance matrix. This is the approach adopted in this paper. The formation of dummy loops in the calculation of the network matrices is applied in order to account for the shunt capacitances without altering the network topology. Other factors that affect resonance characteristics like skin effect of cables are also investigated in this paper. This study will account for skin effect by calculating the resistance R of the cable at various discrete frequencies using an equation that varies according to cable type [11]. ๐ = ๐ 1 ( 0.187 + 0.532โโ ), where hโฅ2.35 ----------- (1) where ๐ 1 is the resistance of the cable at the fundamental frequency and h is the harmonic order. II. MODAL ANALYSIS APPLIED TO SERIES RESONANCE The determination of series resonant frequencies is based on mesh analysis at each harmonic frequency h in per unit. Resonance mode analysis in this case is based on the fact that the loop impedance matrix of a power network becomes singular at resonant frequencies. This requires the calculation of the eigenvalues of the system as well as their sensitivities to changes in system parameters. Imagine that a system experiences resonance at frequency h according to the frequency scan analysis. It implies that some elements of the loop current vector have large values at h. This in turn implies that the inverse of the [๐โ ] matrix has large elements. This phenomenon is primarily caused by the fact that one of the eigen-values of the Z โ matrix is close to zero. In fact, if the system had no damping, the Z โ matrix would become singular due to one of its eigenvalues becoming zero. The above reasoning leads us to believe that the characteristics of the smallest eigenvalue of the [๐โ ] matrix could contain useful information about the cause of the harmonic resonance. The above analysis can be formally stated as follows: [๐]โ = [๐๐๐๐๐ ]โ [๐ผ๐๐๐๐ ]โ The current vector for each harmonic order is as follows [๐ผ๐๐๐๐ ]โ = [๐๐๐๐๐ ]โ1 โ [๐]โ , h = 1, 2, 3โฆ n ---------- (2) Where[๐๐๐๐๐ ]โ , is the loop impedance matrix [๐]โ is the harmonic loop voltage vector. As usual, the loop impedance matrix can be decomposed into the following form: [๐] = [L][D][T] is the eigen-decomposition of the [๐] matrix at frequency h. [L] and [T] are the left and right eigenvector matrices of [Z] [D] - diagonal eigenvalue matrix of Z. ๐= ๐ฟโ1 is due to the fact that ๐ is symmetric. Equation (2) now becomes [๐ผ]=[๐ฟ][๐ท]โ1 [๐] [๐] ------------------------ (3) If [๐][๐] and [๐][๐ผ] are defined as the modal voltage and current vectors respectively. It can be seen that admittance scan equation has been transformed into the following form: ฮป1โ1 0 ๐ฝ1 0 0 ๐๐1 โ1 ๐ฝ2 0 ฮป2 0 0 [๐๐2 ] ------------- (4) [ ]= โฎ โฎ 0 0 โฑ 0 โ1 ๐ ๐ฝ๐ [ 0 0 0 ฮป๐ ] ๐๐ This can be abbreviated as, โด [๐ฝ๐ ]โ = [ฮปโ1 ๐ ]โ [๐๐๐ ]โ -------------------- (5) The inverse of the eigen value, ฮป๐โ1 , has the unit of admittance and is named modal admittance. One can easily see that if ๐1 = 0 or is very small, a small applied mode 1 voltage will lead to a large mode 1 current. On the other hand, the other modal currents will not be affected since they have no 'coupling' with mode 1 voltage. In other words, one can easily identify the 'locations' of resonance frequencies in the modal domain. After identifying the critical mode of resonance, it is possible to find the 'participation' of each loop in the resonance. This can be done using the well-known participation factor theory described in [10]. III. FORMULATION OF LOOP ADMITTANCE SCAN The admittance scan is a series resonance counterpart of the bus impedance scan. The scan is performed in one network mesh at a time. A sinusoidal voltage of unit amplitude โ๐ = 1, and of certain harmonic frequency is inserted into this mesh and the corresponding loop current is calculated. The process is repeated for other harmonic frequencies in per unit. For the purpose of illustration, consider a radial network in fig. 1 containing capacitor banks with a non-linear load connected to bus J through a transformer and a long cable. The network is partitioned along the point of common coupling between the consumer distribution network and public utility supply as in fig. 2. The consumer side of the network is modeled at each harmonic frequency h, and the system supply side is reduced to its Thevenin equivalent also at each harmonic frequency. There are two buses where voltage amplification could be excited by parallel resonance and also three meshes or loops where current amplification can occur by series resonance. Fig. 1: A simple consumer premises supplied from the public utility network Fig. 2: The equivalent circuit model of the 2 โ bus consumer network The application of loop analysis to fig. 2 produces the following equation, [๐]โ = [๐๐๐๐๐ ]โ [๐ผ๐๐๐๐ ]โ The current vector at each harmonic frequency, h is as follows [๐ผ๐๐๐๐ ]โ = [๐๐๐๐๐ ]โ1 โ [๐]โ , h = 1, 2, 3 โฆ n ------------- (6) The matrix [๐๐๐๐๐ ]โ is known as the loop impedance matrix. The inverse of the loop impedance matrix is known as loop admittance matrix, ๐๐๐๐๐ ๐๐๐๐๐ = [๐๐๐๐๐ ]โ1 ---------------------------- (7) This matrix is the counterpart of bus impedance matrix and is therefore useful in the determination of the frequencies at which harmonic series resonance occurs. Equation (6) can now be written as ๐ผ1 ๐๐๐๐ ๐11 [๐ผ2 ] = [๐21 ๐ผ3 ๐31 ๐13 ๐๐๐๐ ๐1 ๐23 ] [๐2 ] ------------------ (8) ๐3 ๐33 ๐12 ๐22 ๐32 For the purpose of resonance analysis, only the driving point ๐ admittances ๐๐๐ are required. ๐ผ ๐ Therefore ๐๐๐ = [๐๐ ] ๐ ๐๐ =0 , โ๐ โ ๐ [๐ผ๐๐๐๐ ]โ๐ = [๐๐๐๐๐ ]โ๐๐ [๐๐๐๐๐ ]โ๐ , ๐๐ = 0 โ ๐ โ ๐ ---- (9) Suppose ๐๐ = 1๐. ๐ข for all h =1, 2, 3 โฆ n [๐ผ๐๐๐๐ ]โ๐ = [๐๐๐๐๐ ]โ๐๐ ------------------------ (10) A graph of [๐ผ๐๐๐๐ ]๐ against h is equivalent to a graph of [๐๐๐๐๐ ]๐๐ against h. Therefore, driving point admittance versus frequency plot is obtained for each mesh in the network. Therefore, driving point admittance versus frequency plot is obtained for each mesh in the network. This technique when applied for the determination of series resonant frequencies in power networks can be referred to as admittance scan. The off โ diagonal or transfer admittances could be considered in the admittance scan when dealing with many harmonic sources applied simultaneously at different network meshes. The current change in the k-th mesh due to the insertion of unit harmonic voltages in meshes k, i and j is stated as ๐ถ๐โ1 = the inverse shunt capacitance at p-th dummy loop. ๐ผ๐ = ๐๐๐ + ๐๐๐ + ๐๐๐ ------------------ (11) IV. MODIFICATION OF NETWORK MATRICES TO ACCOUNT FOR THE SHUNT CAPACITANCES Procedure: 1. The three (๐ × ๐) network matrices are assembled as usual in the absence of the shunt capacitances. These are designated as ๐ ๐๐๐ , ๐ฟ๐๐๐ and ๐บ๐๐๐ respectively. Fig 3: Equivalent circuit diagram showing two dummy loops for shunt capacitors C1 and C2 2. All parallel connection of capacitances can be combined together by summation. 3. Dummy loops m in number are created at each node where the shunt capacitances exist such that the total number of loops becomes(๐ + ๐), see fig 3. The dummy loops are assigned loop numbers ๐ + 1, ๐ + 2 , โฆ ๐ + ๐ 4. Extra rows and columns corresponding to the number of the created dummy loops are added to each of the three network matrices to form a partitioned matrix as shown, ๐ ๐๐๐ค = [ ๐ ๐๐๐ ๐ดโฒ ๐ฟ๐๐๐ ๐ตโฒ ๐ต ] ---------------------- (13) ๐ป ๐บ๐๐๐ ๐โฒ ๐ ] ----------------------- (14) ๐ ๐ฟ๐๐๐ค = [ ๐บ๐๐๐ค = [ ๐ด ] ------------------- (12) ๐ 5. The dummy loops are eliminated using the kron โ reduction formular, ๐ ๐๐๐ค = ๐ ๐๐๐ โ ๐ด๐๐ด๐ , ๐ฟ๐๐๐ค = ๐ฟ๐๐๐ โ ๐ต๐ป๐ต๐ and ๐บ๐๐๐ค = ๐บ๐๐๐ โ ๐๐๐ ๐ Fig. 4: The sequential process of carrying out an admittance scan based on the creation of dummy loops 6. The matrix of network elements R, L and G are finally synthesized according to equation (15) to obtain the loop impedance matrix. This is repeated for each harmonic frequency, h. The updated matrices obtained from application of the above procedure to fig. 3 are, [๐๐๐๐๐ ] = [๐ ๐๐๐ค ] + ๐๐1 โ[๐ฟ๐๐๐ค ] โ ๐[๐บ๐๐๐ค ]/๐1 โ - (15) Where L โ ๐ × ๐ loop inductance matrix R โ ๐ × ๐ loop resistance matrix G โ ๐ × ๐ loop inverse capacitance matrix ๐1 โ fundamental frequency in rad/s For a dummy loop p created between two actual loops ๐ and ๐ ๐ด๐๐ = ๐ด๐๐ = โ๐ ๐ ๐ , ๐ด๐๐ = ๐ด๐๐ = ๐ ๐ ๐ , ๐๐๐ = ๐ ๐ ๐ , elsewhere the entries are zero. Similarly, ๐ต๐๐ = ๐ต๐๐ = โ๐ฟ๐ ๐ , ๐ต๐๐ = ๐ต๐๐ = ๐ฟ๐ ๐ , ๐ป๐๐ = ๐ฟ๐ ๐ and ๐๐๐ = ๐ถ๐โ1 , elsewhere the entries are zero. Where R sp = the total resistance in the branch common to loops i, j and p Lsp = the total inductance in the branch common to loops i, j and p ๐ ๐ฟ๐๐๐ ๐ 11 ๐ 21 = ๐ 31 โ๐ ๐ 1 [ 0 ๐ 12 ๐ 22 ๐ 32 ๐ ๐ 1 0 ๐ฟ๐ฟ๐๐๐ ๐ฟ11 ๐ฟ21 = ๐ฟ31 โ๐ฟ๐ 1 [ 0 ๐ฟ12 ๐ฟ22 ๐ฟ32 ๐ฟ๐ 1 โ๐ฟ๐ 1 ๐บ๐ฟ๐๐๐ ๐บ11 ๐บ21 = ๐บ31 0 [ 0 ๐บ12 ๐บ22 ๐บ32 0 0 ๐ 11 ๐ 23 ๐ 33 0 0 ๐ฟ11 ๐ฟ23 ๐ฟ33 0 ๐ฟ๐ 1 ๐บ11 ๐บ23 ๐บ33 0 0 โ๐ ๐ 1 ๐ ๐ 1 0 ๐ ๐ 1 0 0 0 0 --------------- (16) 0 0] โ๐ฟ๐ 1 ๐ฟ๐ 1 0 ๐ฟ๐ 1 0 0 โ๐ฟ๐ 2 ๐ฟ๐ 2 --------- (17) 0 ๐ฟ๐ 2 ] 0 0 0 ๐ถ1โ1 0 0 0 0 ------------ (18) 0 ๐ถ2โ1 ] Equation (15) is then applied after the process of eliminating the dummy loops, 12 ๐๐๐๐๐ = [๐๐๐๐๐ ]๐๐๐ค โ1 ------------------ (19) The entire process of carrying out an admittance scan based on the creation of dummy loops is described in the flow chart in fig. 4. The modified admittance scan and modal loop analysis has been applied to the equivalent circuit shown in fig.2, and the results are displayed in Fig. 7 and 8 respectively. With the circuit, series resonance result could be compared to that of parallel resonance solved by frequency scan and Resonance Mode Analysis (see fig. 5 and 6). Modal Admittance (pu) 10 [๐๐๐๐๐ ] = [๐ ๐๐๐ค ] + ๐๐1 โ[๐ฟ๐๐๐ค ] โ ๐[๐บ๐๐๐ค ]/๐1 โ 8 6 4 2 0 0 10 20 30 40 50 60 Frequency (p.u) Fig. 7: Results of modal Loop analysis on test system 4.5 45 bus1 bus2 bus3 40 Loop1 Loop2 Loop3 4 35 3.5 30 Admittance (pu) Impedance (pu) Loop1 Loop2 Loop3 25 20 15 10 3 2.5 2 1.5 5 1 0 0.5 0 10 20 30 40 50 60 Frequency (p.u) 0 0 10 20 30 40 50 Frequency (p.u) Fig 5: Bus Impedance Scan Results of the test system Fig. 8: Loop Admittance Scan results of the test system. 70 bus1 bus2 bus3 Modal Impedance (pu) 60 V. APPLICATION TO A DISTRIBUTION NETWORK 50 The network diagram in fig.9 represents an 11kV underground radial distribution network which feeds nine load centers containing two major harmonic sources and four capacitor banks. It is an expansion of the distribution network used as case study in Reference [7]. The load centers are connected by 35mm2 x 3, 11kV underground cables whose parameters are as follows, 40 30 20 10 0 0 10 20 30 40 50 60 Frequency (p.u) Fig. 6: Results of bus Resonance mode analysis (RMA) The results indicate that the modified loop admittance scan compares favourably to its counterparts: modal-loop analysis and bus impedance scan. The key resonance modes according to the results displayed in Fig. 5 โ 8 occur at frequencies (pu) = 4, 17 and 27. The modal admittance scan (fig.7) produces only one resonance peak for each mesh whereas about three peaks are captured in each mesh in the results of modified loop admittance scan. This achievement is because the network topological structure was not altered in the process of applying the proposed technique in localizing the series resonant frequencies. Resistance/ph/km = 0.243โฆ, Inductance/ph/km = 5.023 x 10 - 4 H Capacitance/ph/km = 2.456 x 10-8 F The frequency response characteristics resulting from application of modified loop admittance scan across the entire distribution network are shown in fig. 10 โ 13. 60 Fig. 12: Frequency response considering the effect of cable capacitance Fig. 9: Diagram showing the 11kV radial distribution network in a consumer premises Fig.13: Frequency response considering cable capacitance and skin effect The results indicate the occurrence of series resonance peaks at the various meshes M1 โ M9 as indicated. Fig 10: Frequency response neglecting the effect of cable capacitance and skin effect In figure 10 where the effects of cable capacitance and skin effect are neglected, the resonant frequencies in per unit are h = 6, 7, 14 and 15. In figure 11 where the effect of aggregate harmonic sources is considered, the resonant frequencies are the same as in fig. 10. In figure 12 where only the effect of cable capacitance is considered, the resonance frequencies in per unit are h = 6, 7 and 14. In figure 13 where the effects of cable capacitance and skin effect are considered, the resonance frequencies in per unit are h = 6, 7 and 14. Fig 11: Frequency response for aggregate sources neglecting the effect of cable capacitance and skin effect Comparison between figures 10 - 13 indicates that cable capacitance contributes immensely to the shifting of the resonant frequencies in M3 โ M6 while the skin effect only reduces the magnitude of loop admittance and widens the frequency curve. Since resistance instead of inductance or capacitance (that is the main contributors to system resonance) varies according to the skin effect, consequently, considering the skin effect in the calculations does not shift the resonant frequencies. However, the increased resistance could dampen the admittance peaks at resonance points thereby decreasing the branch currents. Skin effect also increases the bandwidth of resonance. This implies the greater chance of current amplification occurring within the neighbourhood of the resonant peaks. Comparison between fig. 10 and 11 indicates that the application of many harmonic frequency sources only impacts on the magnitude of the driving point admittances and therefore is of no consequence to this study which is focused on the resonant frequencies. VI. CONCLUSION The modified loop admittance scan proves to be an acceptable method for capturing all the dominant frequencies involved in series resonance without any restriction to the utilized frequency step. The application of a single unit voltage is sufficient in the definition of admittance scan. Specific achievements are recorded in this study: the determination of series resonant frequencies by the application of loop admittance matrix, the use of matrix partitioning to treat independently the connection of shunt capacitors and the contribution of skin effect as well as cable capacitance on these results. It is noted that skin effect does not contribute to the shifting of resonant frequencies but only cable capacitance. Hence, in the calculation of the resonance peaks, the contribution of skin effect can be neglected. However, skin effect makes a significant contribution to the value of branch currents which necessitates its consideration. VII. REFERENCES [1] Z. Huang, Y. Cui and W. Xu, "Application of Modal Sensitivity for Power System Harmonic Resonance Analysis", IEEE Transactions on Power Systems, vol. 22, 2007, pp. 222โ231. [2] J. Li, N. Samaan and S. 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