Introduction

For high voltage (HV) and extra high voltage (EHV) underground transmission lines, the main challenge, apart from the relatively high installation costs, is its limitation in energy transmission. The overall performance depends mainly on the thermal properties of the ground in which it is situated. The burial technique for the power cable installation, as well as the HV power cable cross section, is shown in Fig. 1.

Fig. 1
figure 1

Cable line burial techniques a direct burial; b 400 kV power cable cross section, according to (Nexans 2011)

The ampacity of the electricity transmission line is the maximum electrical current safely transferred through the cable conductor without exceeding its maximum operating temperature.

The decrease in the cable conductor area reduces the allowable current transmitted (Shabani and Vahidi 2019). For a high cross-sectional area, larger currents are transferred. The heat generated increases the operating temperature of the cable itself, especially in summer, which can result in cable temperature exceeding 90 °C. This limit value is, in fact, the melting temperature of the XLPE cable insulation. A prolonged increase in the cable operating temperature leads to the melting of the polyethylene insulation and the transmission line failure. The repair time for HV underground transmission lines is about ten times longer than for overhead lines. During the cable line outage time, each hour of electricity supply disruption entails substantial financial losses to the electricity provider. From the reasons mentioned above, the failure rate of HV and EHV underground transmission lines must be reduced to a minimum (Nemati et al. 2019).

The arrangement of the Underground Power Cable System (UPCS) in the ground is associated with a considerable and unpredictable variability of environmental parameters, determined by the thermal conductivity of the surrounding soil. When designing HV and EHV UPCS, it is practically abandoned to lay the cable lines directly in the ground. To enhance heat dissipation from the cable core, ensuring moisture retention in a region close to the cable line, a specially designed thermal backfill is used. The thermal backfill needs to provide stable thermal conditions for the cable line operation regardless of the type of surrounding soil. Thermal backfill application during UPCS design and installation brings extensive benefits to the energy system. First of all, cable systems ampacity is raised around 10–15% by ensuring favorable heat transfer conditions. Also, the cable conductor cross-sectional area is reduced during the design process since expected ampacity will be reached when using a smaller cable. In both cases, significant reductions in construction and operating costs can be achieved.

In Europe, a mixture of sand and Portland cement, in a 12:1 ratio, has been used for years as thermal backfill. Despite its advantages, i.e., low unit price, availability on the market, and adequate mechanical properties, it does not ensure the thermal stability of the cable line operation in the long-term period. After a few months of the thermal load caused by the line operation, its thermal conductivity drops significantly (Ahmad et al. 2019). What is more, the manufacturing of Portland cement caused a considerable environmental burden and energy efficiency issues (Habert 2013).

The Portland cement is produced at a temperature of 1400–1500 °C (Huntzinger and Eatmon 2009). During its production, large amounts of CO2 and NOx are emitted into the atmosphere, as reported by (Li et al. 2016). One of the main factors stimulating the development of inorganic polymer technology is the possibility of a real alternative to Portland cement. It is estimated that the synthesis of Portland cement is twice as energy-intensive as the production of geopolymers and causes 4 to 8 times more carbon dioxide emission (Provis and van Deventer 2009). According to several authors (Bajpai et al. 2020; Zhao et al. 2020), using geopolymers as a substitute for Portland cement reduces the environmental load significantly.

In general, geopolymer is a product of alkali activation of any aluminosilicate materials. It consists of long chains—copolymers of silicon and aluminum oxides (fly ash components), as well as stabilizing metal cations, usually sodium, potassium, lithium, or calcium. The alkali activation is performed by mixing NaOH, KOH, Na2SiO3, or K2SiO3 with fly ash. The geopolymerization occurs at low temperature, usually under 100 °C and requires no special preparation of the raw material (fly ash) before the process (Zhuang et al. 2016).

The use of geopolymers is a viable alternative to the waste disposal from the energy, mining, and metallurgical sectors. It is possible to reuse considerable amounts of industrial by-products through geopolymerization, therefore minimizing the environmental impact of such waste (Bajpai et al. 2020). That is because geopolymerization is an effective and economically justified method of immobilization of heavy metals, such as Pb, Cd, Cr, and Zn, contained in postprocessing waste, in the form of fly ash matrix (Łach et al. 2018). Also, fly ash is considered a hazardous material since the concentrations of the toxic trace elements in fly ash could be 4–10 times higher than in coal (Boca Santa et al. 2016). Therefore, geopolymerization may be used for stabilizing and solidifying those hazardous substances that would be otherwise disposed into landfills and pollute the environment (Mohajerani et al. 2019). What may confirm the immobilizing nature of geopolymers and its environmental benefits, it is a fact that geopolymerization may be successfully used as well in disposing of medical waste ash (Tzanakos et al. 2014). The authors were able to reduce the leachate of heavy metals concentrations below the permitted limits significantly.

This paper presents the utilization possibility of fluidized bed fly ash and blast furnace slag as raw material for a geopolymer thermal backfill composition. Fluidized bed combustion (FBC) technology is gaining its popularity nowadays since it is a very attractive, efficient, and environmentally friendly coal-combustion technology. FBC enables the utilization of low-grade solid fuels, as hard coal, lignite, municipal, and industrial waste, or biomass when emitting less NOx and SO2 compared to traditional coal-combustion technology (Ohenoja et al. 2020). The chemical composition and characteristics of coal ash generated from FBC boilers significantly differ from those of pulverized boilers, as the coal is fired at a relatively lower temperature, and a large amount of limestone is used for desulfurization. Because of a high variation in the produced fly ash quality caused by changes in the fuel composition, FBC fly ash may not be treated as a substitute to the pulverized boiler fly ash. Therefore, FBC fly ash is not used for a Portland cement composition (Zhang et al. 2012). As having low popularity as raw material, fluidized bed fly ash and blast furnace slag are mainly disposed.

The main objective of this paper is to prove that the application of a geopolymer as thermal backfill instead of traditional used sand–cement backfills for cable systems is economically feasible. This study presents an economic analysis of a possible implementation of geopolymer materials for the thermal backfill of UPCS. This idea is presented for the first time. The major part of a geopolymer is a matrix that can be composed of the combustion by-products. The combustion by-product that is assumed to be utilized by using the geopolymer is fluidized bed fly-ash. Therefore, there is no need to pay the costs of those by-products utilization. The analysis is performed for three different prices of 1m3 of thermal backfill, to show the potential benefits of using geopolymers in this kind of application. In the study, the finite element method (FEM) model of UPCS is used, described in detail in the previous paper (Ocłoń et al. 2016). In the article (Ocłoń et al. 2015a), the application FEM for modeling of cable systems situated in a multilayered soil is presented. The optimization procedure, based on PSO (Ocłoń et al. 2015b) and Jaya (Ocłoń et al. 2018) algorithms, is also used to determine the cable backfill area and optimize the UPCS system costs.

A circular economy concept in the design of thermal backfills of underground power cable systems

Figure 2 shows the concept of utilizing combustion by-products in producing the thermal backfills for the HV and EHV transmission line design and installation.

Fig. 2
figure 2

A general concept for utilizing the combustion by-products in the design of thermal backfills for UPCS

Fuel combustion produces combustion by-products such as fluidized bed fly ash and blast furnace slag (Hirschi and Chugh 2019). Those materials can be used to form a geopolymer matrix. The use of fly-ash or slag for the production of geopolymers is a pro-ecological approach, as it allows for practical utilization of industrial and energy sector by-products, as fluidized bed fly ash and blast furnace slag. The mass content of combustion by-products can reach up to 50% of the thermal backfill weight. The thermal backfill material could contain, for example, silica-aluminate inorganic binders, sand, and additives that enhance the overall thermal conductivity. The obtained composite can be used to develop a thermal backfill material for the UPCS. The primary benefit of such an approach is the use of combustion by-products directly in power cable systems, which causes a limited need to utilize such a waste. Various engineering groups need to be involved in such products, for example, energy engineering, environmental engineering, material engineering, thermal engineering, and electrical engineering. The following aspects should be considered when developing thermal backfill materials, according to (Radhakrishna 1982):

  1. (a)

    sufficiently high thermal conductivity to allow effective heat transfer between the power cable and the ground

  2. (b)

    resisting moisture migration and thermal drying under extreme conditions of weather and cable overloading;

  3. (c)

    mechanical strength to support other services in the area (sewers, water mains, roadways, and railway tracks, etc.);

  4. (d)

    the capability of placing in confined areas in both trench and tunnel configurations;

  5. (e)

    easy installation without empty spaces inside the ground

  6. (f)

    environmentally acceptable in terms of leachates from the backfill and corrosively to the buried cable;

  7. (g)

    erosion resistance and self-supporting for undermining,

  8. (h)

    acceptable costs of materials and installation,

  9. (i)

    backfill composition by using the materials available at the installation site

Figure 3 shows the various aspects that should be considered when designing the thermal backfills for the UPCS.

Fig. 3
figure 3

A set of multidisciplinary aspects that should be considered during the backfill design

UPCS physical model

Cable manufacturers provide values of power cable ampacity when assuming specific environmental conditions. It gives the possibility to compare similar cable performance and to select a particular model of cable for a given investment case-study. It is a common practice to determine the current ratings based on IEC 60287 using the CYMCAP software (CYME 2020). The current ratings are for the following UPCS working conditions:

  • cable line burial depth equal to 2.0 m;

  • thermal conductivity of the surrounding soil is equal to 1.0 W/(m K);

  • ambient air temperature is equal to 30 °C.

The value of soil thermal conductivity is critical for the cable core temperature and the cable ampacity. When assuming a constant value of the soil thermal conductivity, at the level of 1.0 W/(m K), according to the IEC 60287, 2014, standard, the cable line designers are forced to use a high safety margin for the calculation results. As a result, a broader cross section of the cable conductor is selected than obtained from calculations. The purpose is to ensure reliable operation of the transmission line even when the thermal conductivity of the ground drops below the assumed value. As a result, a significant increase in investment costs of the underground cable line construction is expected to avoid cable overheating.

This study presents an economic analysis of the geopolymer application in the underground transmission line design. The UPCS model is based on the test case considered in practice by the cable line designers. The following assumptions are made:

  1. (1)

    Constant thermal conductivity of soil equal to ks = 1.0 W/(m K)

  2. (2)

    Constant thermal conductivity of thermal backfill kb equal to:

    1. (a)

      kb = 0.8 W/(m K) for the SCM,

    2. (b)

      kb = 1.4 W/(m K) for the geopolymer backfill,

  3. (3)

    Maximum current load equal to I = 1,200 A

  4. (4)

    Cable burial depth is H = 2.0 m

It is assumed that the backfill layer dimensions are: l = 0.4 m, s, p, and b = 0.2 m, as it is shown in Fig. 4.

Fig. 4
figure 4

Scheme of the UPCS being considered during the computations

Heat transfer model in UPCS

The heat conduction in the UPCS is considered as a two-dimensional problem (Eq. (1)). Based on Eq. (1), the highest temperature in the system Tmax is calculated. For the present calculation, the 400 kV power cable is composed of a conductor, insulation, and an outer layer. The heat source term is only used for cable core and insulation domains. The adopted model is described in detail in the author’s previous work (Ocłoń et al. 2018) and is used for the analysis of geopolymer-based thermal backfill materials of power cables.

$$\left\{ \begin{gathered} k_{c} \frac{{\partial^{2} T}}{{\partial x^{2} }} + k_{c} \frac{{\partial^{2} T}}{{\partial y^{2} }} = - q_{v,c} ,{\text{ cable core domain}} \hfill \\ k_{ins} \frac{{\partial^{2} T}}{{\partial x^{2} }} + k_{ins} \frac{{\partial^{2} T}}{{\partial y^{2} }} = - q_{ins} ,{\text{ cable insulation domain}} \hfill \\ k_{ext} \frac{{\partial^{2} T}}{{\partial x^{2} }} + k_{ext} \frac{{\partial^{2} T}}{{\partial y^{2} }} = 0,{\text{ cable outer layer domain}} \hfill \\ k_{s} \frac{{\partial^{2} T}}{{\partial x^{2} }} + k_{s} \frac{{\partial^{2} T}}{{\partial y^{2} }} = 0,{\text{ ground domain}} \hfill \\ k_{b} \frac{{\partial^{2} T}}{{\partial x^{2} }} + k_{b} \frac{{\partial^{2} T}}{{\partial y^{2} }} = 0,{\text{ cable backfill domain}} \hfill \\ \end{gathered} \right.$$
(1)

where,

x, y: x and y coordinates at a specific location,

qv: heat flux, W/m2.

k: thermal conductivity of specific layers:

  • kc = 400 W/(m K)—the domain of cable core,

  • kins = 0.285 W/(m K)—the domain of insulation,

  • kext = 0.57 W/(m K)—the domain of cable external layer,

  • ks = 1.0 W/(m K)—the domain of ground,

  • kb = 0.8 W/(m K)—the domain of sand–cement mix (SCM),

  • kb = 1.4 W/(m K)—the domain of geopolymer

The system of governing differential equations, given in Eq. (1), is subjected to boundary conditions, shown in Fig. 4. The ambient temperature Tamb is considered to be equal to 30 °C (conditions in the summertime when the air temperature is high). The air heat transfer coefficient hamb is assumed as 5.0 W/(m2 K). The right and bottom sides of the heat transfer domain are insulated, while the symmetry boundary condition is applied at the symmetry plane of the UPCS domain. The last assumption allows one to reduce the number of finite elements and decrease the computational time.

$$\begin{gathered} k_{s} \left. {\frac{\partial T}{{\partial x}}} \right|_{x = 5m} = 0, \hfill \\ k_{s} \left. {\frac{\partial T}{{\partial x}}} \right|_{x = 0} = 0, \hfill \\ k_{s} \left. {\frac{\partial T}{{\partial y}}} \right|_{y = 10m} = 0, \hfill \\ k_{s} \left. {\frac{\partial T}{{\partial y}}} \right|_{y = 0} = h_{amb} (T - T_{amb} ), \hfill \\ \end{gathered}$$
(2)

After discretization, the resulting nonlinear system of differential equations is solved, and the nodal temperatures are determined. The procedures described in IEC 60287, 2014, standard are used to calculate the cable core and insulation heat losses.

Determination of cable core and insulation heat loss

Equation (3) provides the formula for heat losses in cable core (Anders 1997; Thue 2011):

$$q_{v,c} (T(x,y)) = \frac{{\Delta Q_{c} }}{{A_{{c,cal}} }}$$
(3)

where

$$\Delta Q_{c} = \frac{{I^{2} \rho_{20} C}}{{A_{{c,cal}} }}\left[ {1 + \alpha_{ref} (T_{c} (x,y) - T_{ref} )} \right](1 + y_{s} + y_{p} )$$
(4)

and.

ρ20 = 1.7241 × 10–8 Λ m—copper electrical resistance,

C = 1.02 m—sample length,

Tref = 20 °C—reference temperature,

Tc—the average cable conductor temperature °C,

αref = 0.00393—copper conductor temperature coefficient,

Qc—cable conductor heat loss, W/m,

dc—power cable core equivalent diameter for 400 kV power cables, m,

ys and yp—skin and proximity effect factors.

XLPE HV power cable equivalent cross-sectional area Ac,cal is given by:

$$A_{{c,cal}} = \left( {\sum\limits_{i = 0}^{3} {p_{i,c} A_{c}^{i} } } \right)$$
(5)

with p0,i to p3,i coefficients equal to p0,i = 0.0007955, p1,i = 0.3697, p2,i = -−6.04, p3,i = 1.673 × 105.

The skin and proximity factors, ys and yp, are obtained based on IEC 60287, 2014, standard.

When defining xs, the following formula is used:

$$x_{s} = \frac{8\pi f}{{R^{\prime}}} \cdot 10^{ - 7} K_{s} ,$$
(6)

where

$$R^{\prime} = \frac{{I^{2} \rho_{20} C}}{{A_{{c,cal}} }}\left[ {1 + \alpha_{ref} (T_{c} (x,y) - T_{ref} } \right]$$
(7)

skin effect factor ys is calculated as follows:

$$y_{s} = \frac{{x_{s}^{4} }}{{192 + 0.8x_{s}^{4} }},\quad {\text{for }}\quad0 < x_{s} \le 2.8,$$
(8)
$$y_{s} = - 0.136 - 0.0177x_{s} + 0.0563x_{s}^{2} ,\quad {\text{for}} \quad 2.8 < x_{s} \le 3.8,$$
(9)

and

$$y_{s} = 0.354x_{s} - 0.733,\quad {\text{for }}\quad x_{s} > 3.8.$$
(10)

For a given value of xp:

$$x_{p} = \frac{8\pi f}{{R^{\prime}}} \cdot 10^{ - 7} K_{p^{\prime}} ,$$
(11)

the proximity effect factor yp is calculated as:

$$y_{p} = \frac{{x_{p}^{2} }}{{192 + 0.8x_{p}^{2} }}\left( {\frac{{d_{c} }}{l}} \right)^{2} \left[ {0.312\left( {\frac{{d_{c} }}{l}} \right)^{2} + \frac{1.18}{{\frac{{x_{p}^{2} }}{{192 + 0.8x_{p}^{2} + 0.27}}}}} \right]$$
(12)

In Eqs. (6)–(12), l is a distance between cables, and f is an alternating current frequency, equal to 50 Hz. The value of Ks and Kp, is equal to 0.37 and 0.8, according to ICE 60287, 2014. The Round Milliken bare bi-directional wires are considered.

The value of qv,ins, referred to the insulation cross-sectional area Ains, cal, is determined by:

$$q_{{v,{ins}}} = \frac{{\Delta Q_{ins} }}{{A_{ins,cal} }}$$
(13)

where

$$\Delta Q_{ins} = 2\pi fC_{ins} \frac{{U^{2} }}{3t}\tan \delta$$

when the given parameters are:

Cins—capacitance calculated according to Nexans (2011), F/m,

tanδ—insulation loss factor equal to tanδ = 0.005,

U—the maximum AC voltage, V.

The value of Ains,cal is determined as:

$$A_{ins,cal} = \left( {\sum\limits_{i = 0}^{3} {p_{{i,{ins}}} A_{c}^{i} } } \right)$$
(15)

with p0,ins to p3,ins coefficients equal to: p0,ins = 0.002695, p1,ins = 4.725, p2,ins =−1590, p3,ins = 2.72 × 105.

Calculation of UPCS costs (thermal backfill and cables costs)

The material costs of the UPCS can be calculated as:

$$C_{sys} = C_{cable} + C_{back} \cdot A_{b} - w_{cbp} C_{ut} A_{b}$$
(16)

where Ccable is the cost of cables in the UPCS in $/km, Cback is a unit cost of cable backfill material with 1 m2 cross-sectional area and 1 km length, wcbp is a fraction of combustion by-products in geopolymer thermal backfill (assumed as equal to 0.5), and Cut is the cost of the utilization of 1 t of combustion-by-products (assumed to be equal 100 $/t).

Results and discussion

The calculations were performed using the own FEM code written in MATLAB. Figure 5 shows the temperature fields obtained for sand–cement mix thermal backfill and geopolymer thermal backfill. It is possible to observe that the application of geopolymer thermal backfill reduces the temperature in the region close to cable core, due to the higher thermal conductivity than of the sand–cement mixture.

Fig. 5
figure 5

Temperature (in °C) distribution in the system for sand–cement mix and geopolymer

The economic benefits of the application of a geopolymer are observed for different prices of the 1 m3 of thermal backfill (Fig. 6). The overall costs of the cable system are calculated for the considered price of thermal backfill equal to 100 $, 150 $, and 200 $. The SCM thermal backfill costs are assumed to be equal to 30 $/m3. Figure 6c shows the variation of a single power cable cost concerning the cable cross section. Figure 6a shows the scenario when the prices of a geopolymer thermal backfill are equal to 100 $. Due to the significant savings of the company on utilizing of the combustion by-products, the overall costs of the cable system Csys are only slightly higher for the same cable conductor cross section Ac, than the costs when the sand–cement mixture is applied. What is essential is a fact that when the geopolymer thermal backfill with thermal conductivity of kb = 1.4 W/(m K) is used, then the temperature of the cable core is less than 90 °C, the maximum temperature of cable operation, if one applied cables with Ac = 1400 mm2. When the sand–cement mixture is used as thermal backfill, the cable core temperature is significantly higher than 90 °C (Fig. 6d). The cables with a larger cross-sectional area of 1600 mm2 shall be used. The potential saving arising from the application of a geopolymer thermal backfill can reach over 60,000 $/km of cable line for this case study.

Fig. 6
figure 6

Material costs of the UPCS installation, when the geopolymer price is set as a 100 $/km; b 150$/km; c 200 $/km; d cable conductor maximum temperature; e cost of the single power cable in 103 $/km; f area of thermal backfill applied

In case, when the geopolymer thermal backfill price is set as 150 $/ m3 (Fig. 6b), the potential savings are smaller, but still remunerative with over 30,000 $/km of the cable line. In a case when the geopolymer thermal backfill costs are 200 $/m3 (Fig. 6c), then the potential economic benefits of replacement of the sand–cement mixture with geopolymer are limited to 10,000 $/km of the cable line. Based on the performed calculations, it is evident that applying the dedicated backfill materials like geopolymers reduces the overall costs of the UPCS compared to the traditional sand–cement mixture.

Eco-environmental analysis

Application of the geopolymer thermal backfill for HV and EHV underground transmission line installation can be considered in technical, economical, and environmental aspects.

As presented in Fig. 6, 0.448 m2 cross-sectional area of the geopolymer backfill may be applied for the case-study since the Ab value is calculated for half of the system considered (Fig. 4). Therefore, around 448 m3/km of backfill needs to be applied for each km of the designed cable line length. On the contrary, in engineering calculations and during the UPSC design, the rectangular shape of SCM backfill with 1.4 m width and 0.4 m height is commonly applied. Thus, approximately 522 m3/km of the SCM is needed. Consequently, the presented approach and detailed thermal analysis of UPCS operation result in decreasing in backfill use for about 74 m3/km (more than 14%). That significant reduction in backfill area may be reached by replacing SCM (kb = 0.8 W/(m K)), with the geopolymer backfill (kb = 1.4 W/(m K)). When considering backfill prices, SCM for the transmission line installation costs 15,660 $/km and 44,800 $/km for the geopolymer backfill.

As mentioned earlier in the text, the mass content of combustion by-products in a geopolymer matrix can reach up to 50% of the backfill weight. When assuming the dry density of thermal backfill approximately 1.850 t/m3 (Radhakrishna 1982), it gives around 414.4 t/km of combustion by-products utilized per each km of HV and EHV transmission line built. As reported by (American Coal Ash Association 2018), disposal costs of coal by-products depend on multiple factors, as the specific type of combustion waste, location, transportation methods, climate and terrain, regulatory requirements, and potential for its future use. For the most unfavorable conditions, the price may reach 20 to 40$/t of coal combustion waste disposed. When a disposal site is located near the power plant and the material being disposed can be easily handled, the price may decrease to 3–5 $/t. When taking into account the costs of the combustion waste disposal around 10 $/t, benefits from its utilization in the form of the geopolymer backfill may give about 4144 $/km savings for the transmission line length. On the contrary, Portland cement prices have reached a level of 123.5 $/t, according to (Statista 2020), which gives approximately 9.51 $/t of the SCM.

The detailed carbon footprint analysis for geopolymer and Portland cement concrete is performed by (Turner and Collins 2013). According to (Turner and Collins 2013), equivalent CO2 emission during the Portland cement manufacturing reaches 820 kg CO2-e/t. The fly ash and other coal by-products are considered zero or minimal CO2-e contribution. For the fly ash, it is 27 kg CO2-e/t. What is important, geopolymer backfill composition also requires the alkali activator (sodium hydroxide) as well as sodium silicate, which along with fly ash and NaOH, creates the geopolymer binder. According to (Turner and Collins 2013), the total equivalent CO2 emission reaches 108.56 kg CO2-e/t for a mixture of fly ash, sodium hydroxide, and sodium silicate for the geopolymer concrete composition. As the investigation of the proper geopolymer backfill composition is still in progress, it is impossible to evaluate its environmental footprint properly. After rough estimation environmental costs for the SCM application may reach around 60,974 kg CO2-e/km, and for the geopolymer backfill should be lower than 90,048 kg CO2-e/km. What should be stressed, the final composition of the geopolymer backfill is not known yet. Therefore, it is impossible to assess its total carbon footprint.

Conclusions

The HV and EHV underground transmission lines are widely used nowadays. To allow the proper operation of the system, not to exceed the maximum allowable conductor temperature equal to 90 °C is needed. Thermal backfill materials are used to improve the heat transfer from power cables. The commonly used sand–cement mixture has low thermal conductivity, which in the dry state is equal to 0.8 W/(m K). There is a need to develop a novel and not expensive thermal backfill materials with higher thermal conductivity. The option here could be geopolymers with a matrix based on fluidized boilers fly-ash, which is challenging to utilize. This study shows the potential economic benefits of the application of this kind of fuel combustion by-products as thermal backfill. For a flat-formation of the UPCS, with the maximum current of 1,200 A, the computations were carried out. It was assumed that the costs of fluidized bed combustion by-products utilization are of 100 $/t. A reasonable value of geopolymer thermal conductivity equal to 1.4 W/(m K), and three cost levels of 100 $/m3, 150 $/m3, and 200 $/m3 of thermal backfill were assumed.

The computations showed that in a case when the costs of geopolymer thermal backfill are of 100 $/m3 of thermal backfill, the potential saving in cable system design can lead up to 60,000 $/km savings of cable system material cost. The reason is the possible use of a cable with a smaller cross-sectional area, i.e., 1400 mm2 (when geopolymer thermal backfill is used), compared to the one applied for sand–cement mix thermal backfill, i.e., 1600 mm2. Therefore, the utilization of fluidized-bed combustion by-products can create potential economic benefits for the energy distribution industry.

Summing up, geopolymers application in backfilling technology for the HV and EHV underground transmission seems to be promising. By using industrial waste and turning it into a full-value product may surely bring many benefits. Nevertheless, extensive and multidisciplinary studies must be performed to investigate the preferable composition of the backfill. Also, the material test should be conducted to check if the backfill does not interfere with the power cable sheath, causing its corrosion, among others.