A Solution to the Time-Dependent Stress Distribution in Suborbicular Backfilled Stope Interaction with Creeping Rock

Energy School, Xi’an University of Science and Technology, Xi’an 710054, China Deep Mining Laboratory, Shandong Gold Group Co., Ltd., Yantai 264000, China Department of Civil Engineering, Geotechnical Division, Recep Tayyip Erdogan University, Fener, Rize TR53100, Turkey Center for Rock Instability and Seismicity Research, School of Resource and Civil Engineering, Northeastern University, Shenyang 110819, China


Introduction
How to dispose of the mined stope and large number of tailings produced in the mining sector is the current research hotspot [1]. e main aspects of tailings disposal are the use of tailings for construction material [2][3][4] to absorb carbon dioxide in the atmosphere, to mitigate the greenhouse effect [5], to store tailings on surface disposal areas [6], and prepare them in the cemented fill form to fill the underground mined-out stopes [7]. Among them, the preparation of tailings as cemented mine fill into underground openings is not only beneficial to the environment, regional animal, and plant protection [8] but also can reduce the mining process of ore loss depletion and heavy metal emissions. e mine fill method used can bring significant economic benefits to mines and solve the problem of mining-induced massive surface subsidence, which can be called "One waste management solving two disasters" [9].
However, the backfill mining process also faces new problems, such as how to effectively coordinate the strength requirements with the backfilling cost to achieve maximum economic benefits [10,11], how to control the barricades destabilization disaster [12,13], the self-supporting stability of the backfilling mass [14][15][16], and how to ensure the stability of the backfilling mass as an artificial pillar or sill pillar [17,18]. e core issue is the interaction mechanism between mine backfilling and the nearby rock materials [19,20]. e stress distribution within the backfill and its time dependence should not be neglected since there are significant multiphysical field and time effects in the settlement, drainage, consolidation, strength acquisition, and microstructure evolution of the backfill after it is filled into the mined-out stopes [21].
With the depletion of shallow resources, more and more mines are moving towards deeper mining. e surrounding rock mass under the influence of high temperatures and high stresses at depth will show significant rheological effects [22], which are quite different from the deformations of shallow nearby rock materials; the stress redistribution around the nearby rock material under the influence of mining activities is not instantaneous but rather a gradual development over time [23,24]. e aging of deformation resulting from this progressive development is likely to occur in weak [25] or jointed rock mass [26,27] under the effect of high ground stresses. us, the effect of the development of deformation on the internal stress distribution of backfilling is not instantaneous but rather a gradual evolution of the nearby rock material under the effects of excavation sequence, large stresses, and temperature conditions [28,29].
eoretical analyses can provide a preliminary and rapid estimation of the stress distribution inside the backfill, which is very useful for the initial assessment of filling capacity and options [30,31]. Until now, numerous works have been undertaken on the internal stress distribution of the backfill, including two-and three-dimensional analytical solutions for the backfilled stope's internal stresses, taking into account the shape and inclination of the stope [19,[32][33][34][35][36][37][38][39] and the saturated conditions of filling [33]. However, the effect of time-dependent deformation of rock on the backfill has been neglected so far. is is usually reasonable in shallow stope or in places where the creep behavior of the nearby rock material is not apparent [40]. However, for deep, high stress and temperature rock mass, many studies show that the rock' creep behavior is significant, and the stress distribution in the backfill will be largely affected by creeping rock mass [18]. is phenomenon is also seen in the field monitoring with regard to the time-dependent stress distribution in the backfill. Unfortunately, no research results regarding analytical solutions have been published to solve the problem of the backfill's time-dependent stress distribution.
In this study, the creep behavior of the mechanism between mine filling and the nearby rock material was analyzed. e theoretical solution of the interaction between the circular roadway and the filling mass was also established while a solution to the time-dependent stress distribution in suborbicular backfilled stope interaction with creeping rock was given. e accuracy of the solution is verified by the numerical simulation. Finally, the geometry and depth of the backfilled stopes and their geo-stress conditions were also analyzed while discussing the changes in the backfill's internal stresses.

Interactions between Rock and Backfill
Immediately after the formation of stope, elastic or elastoplastic behavior of the nearby rock material occurs, which is generally considered to be time-independent and can be accomplished in a very short period of time [41]. It generally takes some time for the backfill to fill the stope, depending on the filling capacity and the size of the stope. After the backfill placement into mined-out voids, it needs some time to harden [42]. us, it tends to lag behind the elastic or plastic deformation of the surrounding rock material [22]. However, the nearby rock material continues to undergo significant rheological effects due to the stresses in the surrounding rock, and the deformation converges to stope [17]. e deformation is time-sensitive. After filling the stope, the backfill material can be considered as a passive support structure without the ability to generate active support for the nearby rock material. e magnitude of the backfill's ground support is limited by the ability of the nearby rock material to squeeze the backfill. e support reaction force generated by backfilling is passive in nature; only when the nearby rock material deforms and squeezes the backfilling, the backfill will produce some support reaction force on the nearby rock material, and the effect of this support reaction force is affected by the size and nature of the mining space [43]. e support reaction of the backfill on rock will affect the development of creep (time-dependent) deformation of the nearby rock material. us, the interaction between mine fill and the nearby rock material has a temporal and spatial coupling effect. Figure 1 displays the time-dependent interface between creeping rock and filling material. It is considered that the temporal deformation that occurs after the completion of excavation is mainly the creep behavior of the nearby rock material influenced by geo-stress. e expansion and shrinkage deformation can occur when cementitious backfill is affected by drainage, consolidation, and cementation hydration processes, and this process is time-dependent, as confirmed by the results of previous research [44,45]. Shrinkage of backfill will delay the squeezing pressure from rock mass on the filling mass and thus weaken the supporting effect. e convergent deformation of the nearby rock material into the backfilled openings or stope effected by excavation and ground stresses has a competing effect with the possible shrinkage and expansion deformation of the backfill in terms of interaction forces. In addition, after the backfill is poured into the stope, a hardening process occurs in the backfill, and its strength and stiffness greatly change over time and not evenly distributed throughout the backfilled stope, resulting in differences in the supporting force on the surrounding rock mass. e squeezing force from surrounding mass on the filling mass also changes with the time-dependent creep behavior of the nearby rock material [18], which may result in an interaction time domain and a completely noninteraction time domain as shown in Figure 1.
In this study, we assume that the interaction between mine fill and the nearby rock material conforms to the deformation harmony relation; thus, the interaction force can be set as q(t). en, we consider the hardening process of the mine backfill, the creep behavior of the nearby rock material, and the shrinkage strain of filling to form a unified spatial-temporal coupling model of the interaction, as shown in Figure 2.
After the excavation, transient elastic stress self-adjustments occur, and the backfill does not contribute to the 2 Advances in Civil Engineering transient deformation of that part of the surrounding rock mass but only to the subsequent creep deformation part. ree main interaction processes are as follows: (1) e large area support of the filling material causes the stress level of the nearby rock material to change, which changes the size and rate of the time-dependent behavior of the nearby rock material. e compression force on backfill produced by the creep behavior of the nearby rock matrices can change the supporting force of backfilling on the rock material, which is a bidirectional coupling process. (2) e hardening process of the backfill is usually influenced by the cement hydration process, and the changes of elastic modulus and stiffness are timesensitive and are also governed by water-to-cement (w/c) ratio, concentration, additives, curing conditions, and other factors. e squeezing force exerted on the backfill by the surrounding rock mass puts the backfill under stress curing conditions, which in turn affects the change of elastic modulus and strength. (3) e changes in the backfill's elastic modulus and stiffness will affect the shrinkage and expansion strain, which can greatly affect the elastic modulus and stiffness performance of backfilling, mainly in the internal structural damage caused by the incongruent deformation.

Infinite Round Hole under Weak Support of Backfilling.
In this study, it is presumed that the evenly distributed supporting force generated by the backfill on the surrounding rock mass is q(t), and then At the perimeter of the round hole, ε θ � 0 and where ε r (0) is the initial strain value at the moment when the rheological behavior of the nearby rock material begins, i.e., the elastic convergence value after the excavation effect. ε r (t) is the strain at time 't' of creep of the nearby rock material. e elastic modulus E b of the backfill is time-dependent and a function of time.   Figure 2: e coupling relationship between backfill stiffness, shrinkage strain, and support force (R is the rock, B is the backfill, ε co (t) is the creep behavior of the nearby rock material, and ε sh (t) is the backfill's shrinkage deformation). e expressions of radial stress σ r [t], circumferential stress σ θ [t], and shear stress τ rθ under the influence of backfill support are as follows: e Hoek law is expressed by deviator stress and deviator strain, and creep strain is introduced e c : e following empirical formula is used for the creep constitutive equation of surrounding rock mass for its convenience for parameter acquisition and engineering application [46]: en, the strain expression is as follows: . erefore, under the effect of the interaction between mine filling and the nearby rock material, the radially viscoelastic strain ε r (t) and tangentially viscoelastic strain ε θ (t) of the nearby rock material are, respectively, as follows: Equation (6) contains the strain term on left/right sides, and the change of the support force may also have some influence on the mean effective stress σ e , so it cannot be solved explicitly but can be solved iteratively by MATLAB to obtain ε r (t). In fact, for the weak support generated by the backfill, the explicit solution by treating the variation of the effective stress σ e [t] as independent variation of the radial strain ε r (t) is almost the same as the implicit solution obtained from the numerical solution as conformed in Figure 4 (see the next section) so that the explicit expression of ε r (t) can be used in the subsequent theoretical derivation. e approximation is proved, where the initial elastic strain ε r (0) is as follows: 4 Advances in Civil Engineering

Appraisal of Analytical/Numerical Results.
To attest the rationality of the theoretical model in the earlier section, a comparative validation analysis is performed using numerical simulations considering the same boundary conditions and input parameters according to the plane strain problem. To save calculation time, the 1/4 axisymmetric model is selected, as shown in Figure 5. e elastic model is chosen to be the constitutive model of the backfill. A monitoring point is set at P 1 to compare with the theoretical solution of equation (6). e detailed input factors of the numerical/analytical models are shown in Table 1. e comparison results are clearly shown in Figures 6 and 7. e change of the elastic modulus of backfill can change the stress distribution of surrounding rock mass. e theoretical solution is consistent with the numerical simulation, which verifies the accuracy of the approach obtained in the earlier section by considering the viscoelastic strain of the nearby rock material under the filling support effect.

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On the basis of equation (6), ε r (t) can be isolated to obtain an explicit approximate expression of the viscoelastic strain of the surrounding rock under the support of the backfill: Figure 4 shows that the coupled implicit solution and the uncoupled explicit solution are essentially the same. For the hypothesis shown above, the explicit solution can be used to examine the impact of mine backfilling on creep behavior of nearby rock material. To a certain extent, the size of backfill stiffness influences the creep behavior of the surrounding rock mass.

Effect of Delay
Backfill. Usually, after excavation, a stope backfilling requires a certain amount of preparation time and cannot be backfilled immediately. To determine the optimal support time for a specific stope and a filling mass, we need to consider the filling capacity and the condition of the nearby rock material. We need to study the support timing of filling throughout the creep behavior of the nearby rock material.
us, considering the existence of a delayed support time of t d for the backfill, where ε delay (t d ) is the amount of creep deformation that occurs in the filler body after the creep deformation of the surrounding rock has gone through t d . e specific form of ε delay (t d ) is as follows: erefore, the viscoelastic strain of the surrounding rock body when considering the delayed support time of the backfill is solved as follows:  Note. * denotes that it is important to consider the relationship of the difference between the coordinates of the unit stress and the node displacement in the numerical model when comparing with the numerical simulation. erefore, the r value here should be the coordinates of the center point of the unit in the numerical model since it is at these coordinates that the calculated data can be compared with the theoretical solution.

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en, the uncoupled solution of the radial viscoelastic strain ε r (t) of the nearby rock material can be integrated as follows:

Effect of Backfills Hardening Process.
Regardless of the type of tailings and cement, the strength of backfill will go through a rapid development phase at the beginning and a final stabilization phase (and sometimes a deterioration phase, which is not considered in this study). As shown in Figure 8, the addition of different types of binder ultimately aims to change the rate parameter κ for strength acquisition in the curve, i.e., κ 2 can be considered as the higher rate of backfills strength obtained. e evolution of the backfill strength during the hardening process as a function of curing time is as follows: where UCS ∞ is the final strength obtained by the backfill and κ is the rate of backfills strength obtained. Previous research indicated that there exists frequently a certain direct link between strength gaining of cementitious backfill and the modulus of elasticity [47,48]. is is also conformed by our own laboratory test results for cemented backfill (Figure 9). us, it is practical to presume that elastic modulus and strength of backfill during hardening process have the following relation: where K (E/UCS) can be set equal to 218 as shown in Figure 9. us, by presenting equation (15) into (13), the appearance of viscoelastic strain of the nearby rock material under the backfill support effect by considering the hardening process of mine backfilling can be well obtained. Figure 10 demonstrates that in some cases, the area and volume of the backfilled stope can be assumed to be approximately circular in the vertical direction, and the vertical depth is greater than the width of the cross section. From this, we can use the viscoelastic solution from the plane strain model obtained in the previous section to analyze the temporal properties of the backfill's stress distribution.

Analytical Model of Time-Dependent Stress Arching Effect in Backfill.
Lateral pressure P is expressed as follows: where η is the ratio of horizontal/vertical stress, p 0 is the stress of overlying strata of the backfilled opening or stope, ρ r is the rock's density, g is the gravitational acceleration, and h is the depth of the backfilled opening or stope. e p in A and B is separated as follows: e mean strain ε m and mean stress σ m can be expressed as follows: e instantaneous elastic strain ε r (0) formed by initial extraction of the nearby rock material and the creep stress variable ε delay (t d ) generated by delayed backfilling of the nearby rock material are as follows: Consequently, the expression of ε r (t) of the radial viscous strain of the nearby rock material can be given as follows: 8 e expression of strain ε rc (t) acting on backfilling by the creep behavior of the nearby rock material is given as follows: e gravity on the differential element body is as follows: When the creep behavior happens in the nearby rock material, the backfill pore structure is compressed tightly when the backfill is squeezed. In addition, backfill drainage produces consolidation effect, which reduces the backfill's porosity, and the backfill's bulk density gradually increases with the development of creep deformation. us, there are Among them, χ represents the compaction capacity of backfill under confining pressure and is the empirical coefficient related to the characteristics of backfill materials, c 0 is the initial backfill density, and c s is the tailings bulk density.
Assuming that the horizontal plane of the differential element is subject to the average vertical stress with uniform distribution, the normal pressure C generated by the surrounding rock and the friction force S (without considering the interfacial bonding forces) are, respectively, as follows: According to Poisson's effect, the differential element is squeezed by the horizontal force from the surrounding rock mass, and it tends to squeeze downward in the vertical direction under the action of gravity. erefore, the reaction coefficient tends toward the passive condition [49], and the equality in the vertical way can be inferred as follows: where B refers to the vertical squeezing pressure caused by Poisson's effect in the vertical direction of horizontal squeezing on the differential element body: where v is the ratio between horizontal and vertical squeezing pressure caused by the surrounding creeping rock material.
By integration, e vertical stress σ v in the backfill is obtained by solving the first-order linear nonuniform differential equations: (1) when δ � 0 and B � 0, then where h � 0, and then C � 0. (2) when δ ≠ 0, then Among them, when h � 0, C � (C/B) + (A/B 2 ), If c ≥ c s , where e horizontal stress of backfill σ h is where E b is positively correlated with the bulk density of backfill as well as the curing age.

Verification of the Offered Model
To verify the rationality of the proposed theoretical model, a corresponding numerical model is built for simulating the backfill into the stope influenced by the creep behavior of the nearby rock material and the time-dependent stress distribution in the backfill. As shown in Figure 11, to save calculation time, the axisymmetric model is selected, the width of the backfilled stope is set at 6 m, the height is 45 m, and the void area of the backfilled stope is 0.5 m. e model boundary width is set at 250 m, and the height is set at 500 m in the light of Saint-Venant's principle and the trial calculation results of different mesh sizes. Finally, 151999 tetrahedral elements with a minimum size of 0.25 m were also constructed. e backfill and surrounding rock mass are modeled as elastic materials. Elastic modulus and Poisson's ratio of rock and backfill can be seen in Table 1.
e specific simulation process is as follows: (1) the backfilled stope is selected at a depth of 1000 m, the initial ground stress field conditions are given, the lateral pressure coefficient is set to 2, and the horizontal ground stress ratio is set to 1; (2) excavating the filling stope and solving to equilibrium to complete the elastic equilibrium calculation under the influence of the excavation; and (3) zero the initial displacement field formed by the excavation and perform the solution calculation for the creep or time-dependent deformation of the nearby rock material with and without filling until the target time is set.
To verify the assumption in the established model that the differential elements in the horizontal direction of filling stope approximately meet the plane strain condition, this study calculates the creep deformation without filling after excavation to acquire the vertical strain of the nearby rock material. Figure 12 shows the change of vertical strain along with the height of filling stope in the creep process of adjacent surrounding rock mass. Except that the vertical strain in upper/lower sides of the backfilled stope is not close to 0, all other places meet the requirements of plane strain; that is, the vertical strain is 0.
To verify the validity of the theoretical solution, the simulation process does not take into account the effects of the damage caused by the excavation and the creep deformation process, i.e., the strength of the nearby rock mass is set large. e backfill is not damaged, and the effects of creep deformation of the backfill are not considered. e elastic modulus E b of backfilling is 300 MPa, and the comparison between the different delay times for the backfill and the different creep deformation times for the nearby rock material is shown in Figures 13(a)-13(c).
e comparison results show that in general the theoretical solution is close to the numerical simulation results, especially the development of vertical stresses in backfill influenced by creeping rock mass. e backfill's horizontal stress is influenced by the extrusion stress in lower sides of the backfilled stope by the bottom corner points, which is different from the mathematical simulation. e stress in the backfill will increase as the creep behavior of the nearby rock material develops, and this increase will become insignificant as the delay time for filling the mined-out opening or stope increases due to the compression exerted in the backfill by creeping rock material.

Sample Application
Researchers have conducted extensive theoretical analyses for underground backfilled stope where the creep behavior effect on the nearby rock material is not considered or is not apparent, and the results confirmed that the stresses in backfill present arching phenomena [50,51], which is also common in soil foundations [52]. However, when the creep deformation of the surrounding rock mass is considered, the stress distribution changes significantly and the internal stresses exceed the self-weight stresses of backfill. is form of stress distribution is closely related to the stope buried depth, lateral pressure coefficient, Young's modulus of the backfill, creep deformation of the surrounding rock mass, and delayed filling time. Based on this, these influencing parameters are analyzed in this section. Table 2 lists a specific comparison conditions. Figure 14 demonstrates that the depth of the backfilled stope has a strong impact on its internal stress distribution of backfill. is is primarily reflected in the fact that the deeper the filling stope is, the greater the surrounding rock stress is, and the more likely the surrounding rock mass is to creep deformation under high in situ stress. Consequently, the squeezing pressure of the backfill subjected to the nearby rock deformation is greater. When the buried depth of the filled stope is 500 m, the creep performance of the nearby rock material has a little influence on the backfill's internal stresses. e backfill's internal stress is close to that obtained when the effect of creeping rock is not considered; that is, the stress in the lower side of the backfilled stope is less important than the self-weight stress value, and the effect of arching is noteworthy. However, when the buried depth of stope is 1000 m and 1500 m, the vertical/horizontal stresses in backfilling surge intentionally, and the squeezing effect of the nearby rock material on the backfill becomes significant.
is indicates that when considering the effect of creep property of the nearby rock material on the backfill's internal stress, the depth of the backfill opening or stope cannot be ignored, and there is safety hidden dangers when entering deep mining according to the standard of designing backfill strength according to the distribution of self-weight stress. Figure 15 demonstrates that the ratio of horizontal/vertical stresses of the nearby rock material has an influence on the backfill's internal stress, which is mainly reflected in that the internal stress of the backfill is more significantly affected by the creep behavior of the nearby rock material as the lateral pressure coefficient increases. When the coefficient of lateral stresses in nearby rock material is 0.5, the horizontal creep deformation of the nearby rock material drops and the squeezing pressure of the nearby rock material on the backfill decreases. At this time, the backfill's internal stresses are less than the self-weight stress. With a lateral pressure coefficient of 2, the horizontal deformation capacity of the nearby rock material rises, and the stress inside the backfill increases significantly. is further indicates that when considering the creep behavior of the nearby rock material, the main reason for Advances in Civil Engineering the increase in the internal stress of the backfill is the surge of the horizontal deformation capacity of the nearby rock material and the improvement of the squeezing capacity of the backfill.
As can be seen from Figure 16, with the increase in backfill's elastic modulus, the vertical and horizontal stresses in the backfill rise. With the backfill's elastic modulus of 30 MPa, the stress in the backfill is less than the self-weight stress distribution, and the horizontal stress and vertical stress distribution are close to each other.
With the rise in backfill's elastic modulus, difference between horizontal and vertical stresses increases, and both of them gradually exceed their self-weight stress. e supporting reaction force of the nearby rock material also increases with the increase in the creep behavior of the nearby rock material. e two are coupled. It reflects the passive support form of "You are strong, I am strong, you are weak, I am weak" after the backfill is filled into the mined-out opening or stope. Figure 17 shows that the changes of the ratio between two horizontal stresses also govern the backfill's internal stress influenced by creeping rock. e stresses in backfill decrease with the rise of the ratio of horizontal stress, and the gap between horizontal stress and vertical stress of backfill will shorten. is is because, when the fixed value of horizontal stress in one direction is 0.5 p and when the ratio is 0.5, 1, and 2, the horizontal stress in the other direction is p, 0.5 p, and 0.25 p, respectively. One can see that when the horizontal stress ratio is 0.5, the nearby rock material will be in a stress environment with high confining pressure. Relevant studies show that the creep behavior of the nearby rock material will be enhanced under high confining pressure. erefore, the horizontal squeezing effect of the nearby rock on the interior of backfilling will increase, leading to the increase in its internal stress.
According to the numerical results of Figure 13, the delay time of backfilling also can affect the internal stress of the backfill. e greater the delay time, the more rock creep  deformation occurs and may then gets back into the stable stage; at this point, the creep deformation rate is relatively small; thus the deformation amount of the nearby rock acting on the backfill is smaller. us, the weaker the backfill's stress is under the squeezing capacity of the nearby rock material, the smaller the backfill's internal stress is.

Discussion
e contact between mine backfilling and nearby rock material is related to drainage, consolidation, and dynamic disturbance conditions of backfill [10,20] and is the result of multifield (THMC) and multifactor coupling. e strength     of the surrounding rock mass may be weakening under longterm water erosion influenced by backfill with high water and high permeability, thus increasing the deformation tendency of the surrounding rock mass. is process may further squeeze the backfill and result in increase in the stresses in backfill. However, for the cemented paste backfill, the ability of bleeding and permeability is relatively small, so it is reasonable not to consider the effect of water erosion on strength and deformation of the nearby rock material. Besides, a certain water pond on upper sides of the backfilled stope will be formed in early filling stages with regard to the backfill of high bleeding, which will affect the evolution and development of the backfill's internal strength [32]. e upper sides of the backfilled stope may be also affected by the drying and evaporation effects. e blasting disturbance near the backfilled stope will lead to further deformation of the nearby rock material, which will surge sharply in a short time, causing a sudden increase in stresses in backfill [53]. It is important for the stability analysis of barricades for this sudden increase in stresses in the backfill. In the early stage of backfilling, when the compressive strength of the backfill is small, dynamic disturbance may cause liquefaction of the backfill [54], resulting in sudden changes in the interaction state between mine backfill and the nearby rock material, and how the hardening process changes after liquefaction of the backfill requires further consideration.

Conclusions
In this study, the spatial and temporal coupling effects of the interaction between the hardening process of backfill and the surrounding rock mass are investigated. e present study proposes a corresponding theoretical model and draws the following main conclusions: (1) e interaction between mine backfill after filling the stope and the nearby rock material shows three main interaction processes: (i) the support action causes the stress level of the nearby rock material to change, which in turn changes the creep behavior of the nearby rock material; (ii) the squeezing force generated by the nearby rock mass puts the backfill under curing stress; and (iii) the change of shrinkage strain in the hardening process of backfilling affects the deformation of the nearby rock material. (2) e stress distribution of backfill in circular and high filling stope under the effect of time-dependent deformation of rock is solved. e strength and elastic modulus evolution formula which considers the change of curing time, curing stress, and cement content during curing process of backfill are presented.
(3) When the creeping rock mass enters the second creep stage, the controlling effect of backfill over the creep behavior of the nearby rock material is not obvious. For the nearby rock material with minor creep deformation, the stress distribution inside backfill is mainly dependent on the effect of stress arching. When the stope depth is relatively high and the creep effect of rocks is substantial, the stress distribution in backfill is mainly composed of stress arching and squeezing effect, and the squeezing effect makes the stress distribution in backfill exceed its self-weight stress. (4) After stope excavation, delay backfilling has a major impact on deformation of the nearby rock material in accordance with the monitoring results of Moser et al. [55].

Data Availability
e data used to support the findings of this study are included within the article.

Conflicts of Interest
e authors declare that they have no conflicts of interest regarding the publication of this paper.