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Theoretical and numerical modeling of a shallow foundation stiffness based on the theory of elastic half-space

Wojciech Pakos

Wojciech Pakos

Wroclaw University of Science and Technology, Faculty of Civil EngineeringWrocław, Poland
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Pakos, Wojciech
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Andrzej Helowicz

Andrzej Helowicz

Wroclaw University of Science and Technology, Faculty of Civil EngineeringWrocław, Poland
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Helowicz, Andrzej
  
13 nov 2024
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Categoría del artículo: Original Study
Publicado en línea: 13 nov 2024
Páginas: 302 - 314
Recibido: 03 may 2024
Aceptado: 25 jul 2024
DOI: https://doi.org/10.2478/sgem-2024-0022
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© 2024 Wojciech Pakos et al., published by Sciendo
This work is licensed under the Creative Commons Attribution 4.0 International License.

Figure 1:

Scheme of a rectangular foundation.
Scheme of a rectangular foundation.

Figure 2:

Coefficients βx, βz, and βϕ for a rectangular foundation base with regards to α=a/b.
Coefficients βx, βz, and βϕ for a rectangular foundation base with regards to α=a/b.

Figure 3:

Scheme of a foundation with a rectangular base according to Gorbunova-Possadov [12], [13].
Scheme of a foundation with a rectangular base according to Gorbunova-Possadov [12], [13].

Figure 4:

Graphs for determining the coefficients K1 (a) and K2 (b) used in equations (12) and (13). The graphs were prepared by the authors based on works [12] and [13].
Graphs for determining the coefficients K1 (a) and K2 (b) used in equations (12) and (13). The graphs were prepared by the authors based on works [12] and [13].

Figure 5:

Notations for the equation for the spring constant in the case of rocking motion: (a) for α=a/b=(1÷0.1); (b) for α=a/b=(1÷10).
Notations for the equation for the spring constant in the case of rocking motion: (a) for α=a/b=(1÷0.1); (b) for α=a/b=(1÷10).

Figure 6:

The analyzed 3D frame.
The analyzed 3D frame.

Figure 7:

Axonometric view of complex model A.
Axonometric view of complex model A.

Figure 8:

Axonometric view of simple model B.
Axonometric view of simple model B.

Figure 9:

Finite element mesh of complex model A.
Finite element mesh of complex model A.

Results for columns C1_

Column C1
Node 1 Node 2
Model A Model B Error Model A Model B Error
Ux [mm] 2.2 2.3 4.5% −0.4 −0.5 25.0%
Uy [mm] 3.5 3.7 5.7% −0.6 −0.6 0.0%
Uz [mm] −5.0 −5.7 14.0% −4.7 −5.4 14.9%
N [kN] −299.2 −298.9 −0.1% −344.2 −343.9 −0.1%
Ty [kN] −21.1 −20.6 −2.4% −21.1 −20.6 −2.4%
Tx [kN] −16.6 −16.1 −3.0% −16.6 −16.1 −3.0%
Mx [kN m] 161.0 159.1 −1.2% −7.9 −5.3 −32.9%
My [kN m] −124.3 −123.0 −1.0% 8.4 5.6 −33.3%

Results for columns C2_

Column C2
Node 3 Node 4
Model A Model B Error Model A Model B Error
Ux [mm] 2.1 2.2 4.8% 0.2 0.2 0.0%
Uy [mm] 3.2 3.3 3.1% −0.4 −0.5 25.0%
Uz [mm] −6.5 −7.3 12.3% −6.0 −6.9 15.0%
N [kN] −532.2 −532.2 0.0% −577.2 −577.2 0.0%
Ty [kN] −23.6 −23.1 −2.1% −23.6 −23.1 −2.1%
Tx [kN] 4.5 4.6 2.2% 4.5 4.6 2.2%
Mx [kNm] 167.0 165.3 −1.0% −21.5 −19.2 −10.7%
My [kNm] 21.5 22.2 3.3% −14.7 −14.5 −1.4%

Spring constants for a foundation with a rectangular base resting on elastic half-space [7], [8], [9]_

Motion Spring constant Reference
Vertical Kz=G1vβzA {K_z} = {G \over {1 - v}}{\beta _z}\sqrt A Barkan (1962)
Horizontal Kx=2G1+vAβx {K_x} = 2G\left( {1 + v} \right)\sqrt A\, {\beta _x} Barkan (1962)
Rocking Kϕ=G1vβϕ8ab2 {K_\phi } = {G \over {1 - v}}{\beta _\phi }\;8a{b^2} Gorbunov-Possadov (1961)

Material properties used in the analysis_

Model A, B
Soil Loose sand [17]
Es [MN/m2] 40 (Middle range value)
ν 0.3
ϕ 30 (Model A)
G [MN/m2] 15.385
L × B [m] 1.5 × 1.5
L × B [m] 2.0 × 2.0
Frame structure Concrete C50/60
Ecm [MN/m2] 37,000
v 0.2

Results for beam B2_

Node 1 Node 6 Node 7
Model A Model B Error Model A Model B Error Model A Model B Error
Ux [mm] 2.2 2.3 4.5% 2.2 2.3 4.5% 2.2 2.3 4.5%
Uy [mm] 3.5 3.7 5.7% 3.5 3.7 5.7% 3.5 3.6 2.9%
Uz [mm] −5.0 −5.7 14.0% −17.0 −17.8 4.7% −5.1 −5.8 13.7%
N [kN] −30.8 −30.2 −1.9% −30.8 −30.2 −1.9% −30.8 −30.2 −1.9%
Ty [kN] 152.4 152.3 −0.1% −4.0 −4.1 2.5% −160.4 −160.5 0.1%
Tx [kN] 0.3 0.3 0.0% 0.3 0.3 0.0% 0.3 0.3 0.0%
Mx [kNm] −161.5 −159.7 −1.1% 304.0 305.1 0.4% −209.7 −209.2 −0.2%
My [kNm] 1.6 2.0 25.0% 0.0 0.0 0.0% −1.7 −2.0 17.6%

Calculated spring constants used in model B_

In the corner footing In the inner footing Units
βx =βy = 0.956
βz = 2.113
βϕX = βϕY = 0.49
kx = ky = 57,374 kx = ky = 76,498 [kN/m]
kz = 69,668 kz = 92,891
kϕX = kϕY = 36,381 kϕX = kϕY = 86,235 [kN/m/rad]

Results for beam B1_

Node 1 Node 5 Node 3
Model A Model B Error Model A Model B Error Model A Model B Error
Ux [mm] 2.2 2.3 4.5% 2.10 2.20 4.8% 2.1 2.2 4.8%
Uy [mm] 3.5 3.7 5.7% 3.40 3.50 2.9% 3.2 3.3 3.1%
Uz [mm] −5.0 −5.7 14.0% −13.00 −13.90 6.9% −6.5 −7.3 12.3%
N [kN] −26.3 −25.7 −2.3% −26.30 −25.70 −2.3% −26.3 −25.7 −2.3%
Ty [kN] 131.7 131.6 −0.1% 2.50 2.40 −4.0% −181.1 −181.2 0.1%
Tx [kN] −0.4 −0.4 0.0% −0.40 −0.40 0.0% −0.4 −0.4 0.0%
Mx [kNm] 123.8 122.4 −1.1% −228.60 −229.40 0.3% 409.7 409.3 −0.1%
My [kNm] −1.8 −2.0 11.1% −0.10 −0.10 0.0% 2.4 2.6 8.3%

Load applied to the structure_

Load type Value
Self-weight of the concrete frame structure (SW) 24 kN/m3
Uniform distributed load (UDL) 20 kN/m
Concentrated force Px and Py 10 kN
Idioma:
Inglés
Calendario de la edición:
4 veces al año
Temas de la revista:
Geociencias, Geociencias, otros, Ciencia de los materiales, Compuestos, Materiales porosos, Física, Mecánica y dinámica de fluidos
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