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Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil

Received: 5 February 2024     Accepted: 26 February 2024     Published: 30 May 2024
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Abstract

The program (cast3m) produced for us tables of values of stresses, displacements, images characterising stresses, displacements and deformations with their corresponding graphs. The results were presented as part of this study. It has been found that: two shallow closed foundations seriously affect the soil between them regardless of the soil type. Then, when the foundation is at same level in the different soil type and stress values are extracted in the zone of the cohesive soil (soft clay). A horizontal separation to width of foundation ratio was 0.7 and an influence equation was 0.333 if values of stresses are extracted from the partially cohesive soil (sandy clay). As per the vertical variation of the foundation in the different soil type. Independent of the soil type and the depth variation, a vertical separation to width of foundation ratio of 0.333 was observed. As the cohesion increases, the soil becomes denser which account for the high limit compressive stress compared to inferior values of cohesion. Finally, it is seen as a result of this research that the type of soil has a great rule to play as far as the interaction between two foundations is concern. An interaction led to failure when the foundation had a vertical gap between it that did not meet the above equation.

Published in Journal of Civil, Construction and Environmental Engineering (Volume 9, Issue 3)
DOI 10.11648/j.jccee.20240903.11
Page(s) 51-64
Creative Commons

This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited.

Copyright

Copyright © The Author(s), 2024. Published by Science Publishing Group

Keywords

Numerical Approach, Interactions, Shallow Foundations, Cohesion, Soil

1. Introduction
A foundation said to be shallow is defined as a structure with depth equal to 3 to 4 times the width of the foundation that transmit imposed loads into the ground, very near to the surface rather than the lower layers of the earth . In the domain of foundation engineering, studying interaction between two neighboring shallow foundation has a great place in the heart of scientific advancement in order to overcome problems associated with the foundation and the environment (soil) . Numerical approaches play a crucial role in understanding and analyzing the interaction between neighboring shallow foundations on cohesive and partially cohesive soils. This topic is of great importance in geotechnical engineering, as it helps engineers design and assess the stability and performance of foundation systems. When two or more shallow foundations are built in close proximity, their loadings can interact with each other, leading to changes in soil stresses and settlements . This interaction becomes even more complex when the soil is cohesive or partially cohesive, as these types of soils exhibit different behaviors compared to cohesion less soils. To appreciate this interaction, numerical methods such as finite element analysis (FEA) or finite difference method (FDM) are commonly used. These methods involve dividing the soil and foundation systems into smaller elements or grids and solving mathematical equations to simulate the mechanical behavior of the soil and foundations under various loading conditions.
Stuart show that the interactions between footings in cohensionless soil on the base of the limit equilibrium method , his experiment agrees with Terzaghi’s formular. West and Stuart show that the method of stress characteristics to establish a solution for the interference of a strip footing on sand soil , their outcomes showed that the efficiency factor (ξ) values were smaller compared to those obtained by Stuart. Selvadurai and Rabbaa show that the interference of three closely spaced strip foundations on Ottawa and silica sand , interference initiated when spacing is of ratio S/< 3. Graham show that the interference of three closely spaced strip foundations on Ottawa and silica sand , the interaction depends on soil friction angle and efficiency factors for versus spacing are given. Lee and Eun show that studying of interference of footing using conducted field circular plate test , conducted field circular plate test. Failure stress of the soil beneath neighbored footing is higher than isolated footing; however, larger settlements occurs beneath neighbored footing . Srinivasan and Ghosh show that laboratories scaled model tests of circular footings in dry dense homogeneous sand , concluded that efficiency factors (ξ) are found to be maximum at S/B = 0.5. Reddy. Borzooei, and Reddy show that test on Square and circular footing model On Medium dense sand, square and circular footing model were conducted. On sand, the closeness of footings found to improves the responses of foundations both in terms of settlement and ultimate bearing capacity; nevertheless, increasing in settlements are being observed at between B ≤ S ≤ 6B. Srinivasan and Ghosh show that investigation on two layers of sand (weak layer underline by strong layer) , they reached the following conclusion that the bearing capacity and the developed settlement at failure declined with an increase in the depth of the upper weak layer. Efficiency factors (ξ) are found to be maximum at S/B = 0.5. All previous research studies explored the effect of the interaction of closely spaced shallow foundations on the bearing capacity at the ultimate failure compared to the settlement behavior which is for some reason not addressed profoundly, even though it is more critical than bearing capacity.
Figure 1. Presentation of the geometry of the foundations in the different soil.
The main objective is to accurately predict the effects of interaction, including changes in soil stresses, settlements, and potential failure mechanisms. By doing so, engineers can make informed design decisions to mitigate risks and ensure the stability and performance of the foundation system. Addressing this problem requires the development and implementation of numerical techniques, such as finite element analysis (FEA) or finite difference method (FDM), that can simulate the behavior of the soil-foundation system under various loading conditions. These techniques should be able to capture the complex behavior of cohesive and partially cohesive soils and provide reliable predictions of the interaction between neighboring shallow foundations. Overall, the problem statement revolves around developing a numerical approach that can effectively analyze and appreciate the interaction between neighboring shallow foundations on cohesive and partially cohesive soils, leading to improved design practices and safer structures. Figure 1 show the geometry of the foundations in the different soil.
2. Materials and Method
2.1. Method
As part of this research, a numerical approximation of the behavior model of two neighboring shallow foundations in a cohesive and partially cohesive soil has been proposed. CAST3M software as the numerical tool was used.
CASTEM is a computer code for the analysis of structures by finite element method. CASTEM presents a complete system, integrating not only the functions of calculation themselves, but also the functions of constructing models (preprocessor) and processing the results (post-processor). CASTEM made it possible for us to deal with problems of linear elasticity in the statics and dynamics fields (extraction of eigenvalues), nonlinear problems (elasto-viscoplasticity), step by step dynamic problems, etc . In order to convert the names of the objects into data-processing entities usable by the program, it is necessary to have an interface. It is the GIBIANE language which will make it possible for us to communicate directly with the program .
2.1.1. Presentation of Model
Physical geometry
Three models characterized this study: the two foundations were placed at the same level, a vertical variation of the right foundation was made while fixing the left foundation and vice versa. Figure 2 below show case 1 of the foundations placed at the same level and Figure 3 below show case 2 of the vertical variation of the right foundation.
Figure 2. Case 1: Foundations placed at the same level.
Figure 3. Case 2: Vertical variation of the right foundation.
2.1.2. Boundary Conditions
The limit conditions for the modelling of this two shallow foundations are attached to the geometry of the model. The foundation is in contact with the foundation soil. From the geometry below:
CL1 = BLOQ DEPLA ROT (L1 ET LPP55); the base of the foundation is rigid.
CL2 = BLOQ UX L20; the soil on the adjacent sides do not move in the horizontal direction.
CL3 = BLOQ UX L2; the soil on the adjacent sides do not move in the horizontal direction.
CL4 = BLOQ UY (L26 ET L35); the footing is rigid compared to the soil and thus does not change in shape horizontally.
The Figure 4 below show the geometry of the boundary conditions.
Figure 4. Geometry of the boundary conditions.
2.2. Mechanical Characteristics
2.2.1. Behavioral Law
Figure 5 show the three sub-behavioral laws: Concrete, Soil and Interface.
Figure 5. Three sub-behavioral laws: Concrete, Soil and Interface.
The table 1 show the foundation (concrete) characteristics of Mazar’s deformation model.
Table 1. Foundation (concrete) Characteristics of Mazar’s deformation model

PARAMETERS

SYMBOL

NUMERICAL VALUE

Young’s Modulus

E (Mpa)

27000

Volumic mass

ρ (Kg/m3)

2500

Poisson’s Ratio

ϑ

0.2

Thresholddeformation in tension

KTRO

1×10-4

Compression Parameter

ACOM

1.4

Compression Parameter

BCOM

1900

Tension Parameter

ATRA

0.8

Tension Parameter

BTRA

17000

Correction parameter for shearing

BETA

1.06

2.2.2. Characteritics
Tables 2, 3 and 4 show respectively the characteristics of soft clay soil of Douala, characteristics of clayey sand soil of Douala, Concrete-Soil Interface Characteristics.
Table 2. Characteristics of soft clay soil of Douala.

PARAMETERS

SYMBOL

NUMERICAL VALUE

Young’s Modulus

E (Mpa)

24

Volumic mass

ρ (Kg/m3)

1575

Poisson’s Ratio

ϑ

0.43

Indice of voids

EO

0,37

Coefficient of Friction

M

0.6

Internal angle of friction

φ

30

Cohesion

COHE (KPa)

40

Pre-consolidation pressure

PO (KPa)

20

Elastic slope

KAPA

0.02

Plastic slope

LAMD

0.1

Shear Modulus

G1 (MPa)

15.4

Table 3. Characteristics of clayey sand soil of Douala.

PARAMETERS

SYMBOL

NUMERICAL VALUE

Young’s Modulus

E (Mpa)

16

Volumic mass

ρ (Kg/m3)

1900

Poisson’s Ratio

ϑ

0.286

Indice of voids

EO

0,33

Coefficient of Friction

M

0.9

Internal angle of friction

φ

10

Cohesion

COHE (KPa)

25

Pre-consolidation pressure

PO (KPa)

30

Elastic slope

KAPA

0.02

Plastic slope

LAMD

0.1

Shear Modulus

G1 (MPa)

10.3

Table 4. Concrete-Soil Interface Characteristics

PARAMETERS

SYMBOL

NUMERICAL VALUE

Second Normal stiffness constant

EF

2×1015N/m2

Threshold deformation

ECN

1000%

Cohesion

COHE

10kPa

Angle of friction

FRIC

20

Maximum resistance in tension

FTRC

0

A load intensity of 50KN was applied. This loading was done following the Cast3m operator: PASAPAS, which takes into consideration time as a parameter. Figure 6 show load factor-time graph.
Figure 6. Load factor-time graph.
3. Result and Discussion
For the different cases, stress-displacement graphs and space-stress separation graphs, separation-settlement space graphs were observed. Images of horizontal displacement, vertical displacement (subsidence) and vertical stress were observed. The Figure 7. pictures of XX displacement, deformation, stress for case 1.
3.1. Case 1; Foundations Placed at the Same Level
DETA-X = 1m DETA- Y = 0
Figure 7. Pictures of XX displacement, Deformation, Stress for case 1.
Commentary on foundation in soft clay (silty clay) influence by clayey sand (clay loam) soil with variation of the horizontal gap between them.
Extraction of values in soft clay soil
Figures 8 and 9 show the settlement-space separation graph and stress-space separation graph for case 1.
Figure 8. Settlement-Space Separation Graph for Case 1.
Figure 9. Stress-Space Separation Graph for Case 1.
1. From the mid-stress-strain graph, stress-space separation graph, settlement-space separation graph, as the space separation increases the settlement under the left footing decreases and becomes constant, while the stress decreases and becomes constant.
2. From the settlement-space separation graph, a monotonous interaction but all leading to a decrease of settlement at increasing space separation and further reaches a constant zone. This monotonous decreasing zone is delimited by a space separation of 1 meter.
3. Mathematically, from graph, the threshold value of space separation is 1meter, hence a fractional empirical equation as shown below.
ShB23~0.7 (1)
Sh = horizontal space separation between two foundation (m)
B = the base of the foundation in the soil in consideration (m)
Where S is the gap between two foundations and B: the base of the footing. This expression above translates the threshold space separation above which settlement of two neighbouring shallow foundations in a soft clay –Clayey sand taking into consideration the soft clay soil.
Extraction of values in clayey sand soil
Figures 10 and 11 show the settlement-space separation graph and the stress-space separation graph for case 1.
Figure 10. Settlement -Space Separation Graph for Case 1.
Figure 11. Stress-Space Separation Graph for Case 1.
3.2. Case 2 Vertical Variation of Right Footing While Fixing Left Footing
The Figure 12 below show the Pictures of XX displacement, Deformation, Stress for Case 2.
DETA-Y = 1m, DETA-X = 0.1m
HORIZONTAL DISPLACEMENT VERTICAL DEFORMATION
Figure 12. Pictures of XX displacement, Deformation, Stress for Case 2.
From the Stress-strain Graph, clayey sand soil under the foundations, follows respects the Terzaghi soil deformation curve indispensable of the different space separations.
From the Maximum Stress-Space Separation Graph, the stress in the soil between both foundations decreases and attains a threshold value 0.5meter then becomes constantly monotonous.
The mathematical expression of this behavior can be expressed by the inequality below:
ShB13~0.333 (2)
The expression above, gives the threshold space separation above which there is least stress interaction between both foundations.
S = horizontal space separation between two foundation (m)
B = The base of the foundation in the soil in consideration (m)
Where S is the gap between two foundations and B: the base of the footing. This expression above translates the threshold space separation above which settlement of two neighbouring shallow foundations in a soft clay –Clayey sand taking into consideration the clayey sand soil.
Extraction of values in soft clay soil
Figures 13 and 14 show the combined maximum settlement-vertical position graph and combined maximum mid stress-vertical position graph.
Figure 13. Combined Maximum Settlement-Vertical Position Graph. Case 2 (delta-x = 0.1, 0.5, 1).
Figure 14. Combined Maximum Mid Stress-Vertical Position Graph. Case 2 (delta-x = 0.1, 0.5, 1).
1. The combined Settlement-Vertical position graphs and Stress-Vertical Position graphs clearly interprets to us the various Mid Stress-strain graphs:
2. From these combined graphs that, as the vertical position of the right footing increases, there is a decrease in the settlement and Stress under the left footing. This ratio of decrease, becomes significantly very small as the horizontal gap between both foundations increase.
This phenomenon becomes constant for a Horizontal space separation of 0.5m.
The mathematical expression of this behavior can be expressed by the inequality below:
SvB13~0.333 (3)
The expression above, gives the threshold space separation above which there is least stress interaction between both foundations.
Sv= vertical space separation between two foundation (m)
B = the base of the foundation in the soil in consideration (m)
Extraction of values in clayey sand soil
Figures 15 and 16 show the combined maximum settlement-vertical position graph and Combined maximum stress-vertical position graph for case 2.
Figure 15. Combined Maximum Settlement-Vertical Position Graph. Case 2 (Delta-x = 0.1, 0.5, 1).
Figure 16. Combined Maximum Stress-Vertical Position Graph. Case 2 (Delta-x = 0.1, 0.5, 1).
1. It is observed that for a very small separation, Stress increases as the depth of the right foundation increases and becomes constants at a vertical difference of 0,5m;
2. One equally observe that the maximum settlement of the clayey sand soil occurs at a depth of 1meter
3. The mathematical expression of this behavior can be expressed by the inequality below:
SvB13~0.333(4)
The expression above, gives the threshold space separation above which there is least stress interaction between both foundations.
Sv = vertical space separation between two foundation (m)
B = the base of the foundation in the soil in consideration (m)
Influence of cohesion on the settlement of the soft clay soils.
Figures 17 and 18 show the graph of settlement against cohesion and graph of stress against cohesion.
Figure 17. Graph of Settlement against Cohesion.
Figure 18. Graph of Stress against Cohesion.
Influence of cohesion on the settlement of the sandy-clay soils.
Figures 19 and 20 show the graph of settlement against cohesion and graph of stress against cohesion.
Figure 19. Graph of Settlement against Cohesion.
Figure 20. Graph of stress against cohesion.
From the Graphs above that, as the Cohesion increases, the settlement under the footings decreases. This explains that, the soil becomes more rigid and resistant to settlement as the cohesion of the soil increases.
4. Conclusions
The results of simulation were showed that closely spaced shallow foundations in a Sandy Clay soil interact greatly. The spacing between neighboring shallow foundations has been identified as a critical factor influencing the interaction. Smaller spacing leads to increased soil stress concentrations and higher settlements between foundations. The presence of cohesion in the soil has been found to significantly affect the interaction between neighboring shallow foundations. Cohesive soils tend to transfer more load between neighboring foundations, resulting in higher soil stresses and settlements. Soil-structure interaction has been considered in numerical analyses to improve the accuracy of predicting the behavior of neighboring shallow foundations on cohesive and partially cohesive soils. This includes accounting for the interaction between the foundations and the surrounding soil. The numerical approach has proven to be a valuable tool for designing and optimizing neighboring shallow foundations on cohesive and partially cohesive soils. It allows for better understanding of the interaction behavior and can lead to more efficient and cost-effective foundation designs. Shallow foundations on cohesive and partially cohesive soils and have highlighted the importance of considering the interaction effects in design and analysis. However, further research is still needed to explore additional factors and refine the numerical approaches used in evaluating this interaction.
Abbreviations

FEA

Finite Element Analysis

FDM

Finite Difference Method

Cast3M

Castem

Acknowledgments
The authors gratefully acknowledge the support of the mechanical laboratory of HTTTC (High Technical Teacher Training College) of University of Bamenda, the laboratory of National Higher Polytechnic Institute (NAHPI) of University of Bamenda.
Author Contributions
Kuma Moses Mbuh initiated the project and project administration, investigation and writing-original draft; Leonard Nsahlai and Penka Jules Bertrand: Supervision, formal analysis, validation, writing review and editing; Arnaud Nguessi Kouamou: Methodology, Data curation, Visualization, writing review and editing; Elvis Agandeh and Abong Claret Phonchu: read and approved the final manuscript.
Conflicts of Interest
The authors declare no conflicts of interests.
References
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[2] Elsawwaf, A., El Sawwaf, M., Farouk, A., Aamer, F., & El Naggar, H. (2023). Restoration of tilted buildings via micropile underpinning: a case study of a multistory building supported by a raft foundation. Buildings, 13(2), 422.
[3] Gourvenec, S., & Steinepreis, M. (2007). Undrained limit states of shallow foundations acting in consort. International Journal of Geomechanics, 7(3), 194-205.
[4] Stuart JG (1962) Interference between foundations, with special reference to surface footings in sand. Geotechnique 12(1): 15–22.
[5] Silvestri, F., de Silva, F., Piro, A., & Parisi, F. (2024). Soil-structure interaction effects on out-of-plane seismic response and damage of masonry buildings with shallow foundations. Soil Dynamics and Earthquake Engineering, 177, 108403.
[6] Peng, W., Zhao, M., Zhao, H., Zhang, L., & Zhou, S. (2024). Effect of slope on lateral bearing capacity of nearshore large-diameter monopiles in cohesive soil. Marine Georesources & Geotechnology, 42(1), 26-46.
[7] Noo-Iad, D., Shiau, J., Chim-Oye, W., Jamsawang, P., & Keawsawasvong, S. (2023). Determination of Efficiency Factors for Closely Spaced Strip Footings on Cohesive–Frictional Soils. Sustainability, 15(3), 2585.
[8] Selvadurai, A. and Rabbaa, S. (1983). “some experimental studies concerning the contact stress beneath interfering rigid strip foundations resting on a granular stratum.” Can. Geotech. J.20, 406-415.
[9] Yadegari, S., & Yazdandoust, M. (2024). Experimental Investigation of the Effect of Strip Footing on Shear Band Development and Lateral Pressure Distribution in Helical Soil-Nailed Walls. International Journal of Geomechanics, 24(4), 04024016.
[10] Ghazavi, M., Valinezhad Torghabeh, N., & Fazeli Dehkordi, P. (2024). Analysis of Twin Large Circular Footings on a Geocell-Reinforced Bed Using Response Surface Method. International Journal of Geomechanics, 24(4), 04024032.
[11] Graham J, Raymond GP, Suppiah A (1984) Bearingcapacity of three closely spaced footings on sand. Geotechnique 34(2): 173–182.
[12] Mabrouki, A., Benmeddour, D., Frank, R., & Mellas, M. (2010). Numerical study of the bearing capacity for two interfering strip footings on sands. Computers and Geotechnics, 37(4), 431-439.
[13] Lee, J., & Eun, J. (2009). Estimation of bearing capacity for multiple footings in sand. Computers and geotechnics, 36(6), 1000-1008.
[14] Srinivasan, V., & Ghosh, P. (2013). Experimental investigation on interaction problem of two nearby circular footings on layered cohesionless soil. Geomechanics and Geoengineering, 8(2), 97-106.
[15] Fisher, R., & Cathie, D. (2003). Optimisation of gravity based design for subsea applications. In BGA International Conference on Foundations: Innovations, observations, design and practice: Proceedings of the international conference organised by British Geotechnical Association and held in Dundee, Scotland on 2–5th September 2003 (pp. 283-296). Thomas Telford Publishing.
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    Kuma, M. M., Leonard, N., Bertrand, P. J., Arnaud, K. N., Elvis, A., et al. (2024). Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil. Journal of Civil, Construction and Environmental Engineering, 9(3), 51-64. https://doi.org/10.11648/j.jccee.20240903.11

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    Kuma, M. M.; Leonard, N.; Bertrand, P. J.; Arnaud, K. N.; Elvis, A., et al. Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil. J. Civ. Constr. Environ. Eng. 2024, 9(3), 51-64. doi: 10.11648/j.jccee.20240903.11

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    AMA Style

    Kuma MM, Leonard N, Bertrand PJ, Arnaud KN, Elvis A, et al. Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil. J Civ Constr Environ Eng. 2024;9(3):51-64. doi: 10.11648/j.jccee.20240903.11

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  • @article{10.11648/j.jccee.20240903.11,
      author = {Mbuh Moses Kuma and Nsahlai Leonard and Penka Jules Bertrand and Kouamou Nguessi Arnaud and Agandeh Elvis and Phonchu Claret Abong},
      title = {Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil
    },
      journal = {Journal of Civil, Construction and Environmental Engineering},
      volume = {9},
      number = {3},
      pages = {51-64},
      doi = {10.11648/j.jccee.20240903.11},
      url = {https://doi.org/10.11648/j.jccee.20240903.11},
      eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.jccee.20240903.11},
      abstract = {The program (cast3m) produced for us tables of values of stresses, displacements, images characterising stresses, displacements and deformations with their corresponding graphs. The results were presented as part of this study. It has been found that: two shallow closed foundations seriously affect the soil between them regardless of the soil type. Then, when the foundation is at same level in the different soil type and stress values are extracted in the zone of the cohesive soil (soft clay). A horizontal separation to width of foundation ratio was 0.7 and an influence equation was 0.333 if values of stresses are extracted from the partially cohesive soil (sandy clay). As per the vertical variation of the foundation in the different soil type. Independent of the soil type and the depth variation, a vertical separation to width of foundation ratio of 0.333 was observed. As the cohesion increases, the soil becomes denser which account for the high limit compressive stress compared to inferior values of cohesion. Finally, it is seen as a result of this research that the type of soil has a great rule to play as far as the interaction between two foundations is concern. An interaction led to failure when the foundation had a vertical gap between it that did not meet the above equation.
    },
     year = {2024}
    }
    

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  • TY  - JOUR
    T1  - Numerical Approach to Appreciate the Interaction of Two Neighbouring Shallow Foundation on a Cohesive and Partially Cohesive Soil
    
    AU  - Mbuh Moses Kuma
    AU  - Nsahlai Leonard
    AU  - Penka Jules Bertrand
    AU  - Kouamou Nguessi Arnaud
    AU  - Agandeh Elvis
    AU  - Phonchu Claret Abong
    Y1  - 2024/05/30
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    N1  - https://doi.org/10.11648/j.jccee.20240903.11
    DO  - 10.11648/j.jccee.20240903.11
    T2  - Journal of Civil, Construction and Environmental Engineering
    JF  - Journal of Civil, Construction and Environmental Engineering
    JO  - Journal of Civil, Construction and Environmental Engineering
    SP  - 51
    EP  - 64
    PB  - Science Publishing Group
    SN  - 2637-3890
    UR  - https://doi.org/10.11648/j.jccee.20240903.11
    AB  - The program (cast3m) produced for us tables of values of stresses, displacements, images characterising stresses, displacements and deformations with their corresponding graphs. The results were presented as part of this study. It has been found that: two shallow closed foundations seriously affect the soil between them regardless of the soil type. Then, when the foundation is at same level in the different soil type and stress values are extracted in the zone of the cohesive soil (soft clay). A horizontal separation to width of foundation ratio was 0.7 and an influence equation was 0.333 if values of stresses are extracted from the partially cohesive soil (sandy clay). As per the vertical variation of the foundation in the different soil type. Independent of the soil type and the depth variation, a vertical separation to width of foundation ratio of 0.333 was observed. As the cohesion increases, the soil becomes denser which account for the high limit compressive stress compared to inferior values of cohesion. Finally, it is seen as a result of this research that the type of soil has a great rule to play as far as the interaction between two foundations is concern. An interaction led to failure when the foundation had a vertical gap between it that did not meet the above equation.
    
    VL  - 9
    IS  - 3
    ER  - 

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Author Information
  • Department of Civil Engineering and Forestry Techniques, Higher Technical Teacher Training College, The University of Bamenda, Bamenda, Cameroon

  • Department of Civil Engineering and Urban Development, National Higher Polytechnic Institute (NAHPI), The University of Bamenda, Bamenda, Cameroon

  • Department of Civil Engineering and Urban Development, National Higher Polytechnic Institute (NAHPI), The University of Bamenda, Bamenda, Cameroon

  • Department of Civil Engineering and Forestry Techniques, Higher Technical Teacher Training College, The University of Bamenda, Bamenda, Cameroon

  • Department of Civil Engineering and Forestry Techniques, Higher Technical Teacher Training College, The University of Bamenda, Bamenda, Cameroon

  • Department of Civil Engineering and Urban Development, National Higher Polytechnic Institute (NAHPI), The University of Bamenda, Bamenda, Cameroon