Finite Element Design Concrete Structures Rombach Pdf
The design of concrete members for shear without stirrups has become a major issue worldwide especially for bridge decks as. Safety of existing structures mainly build without shear reinforcement has been brought into focus. From world-wide experience with nonlinear Finite Element Analysis it could not. Exploring the Black Box that is Finite Element Analysis (FEA) in Reinforced Concrete Design. Finite element analysis FEA has become a popular method of analysing flat slab concrete structures for practising engineers. Rombach is shown below; as you can see the difference in effective stiffness can be important.
This paper studies the modeling of symmetric and asymmetric flat slabs, presenting alternatives to the problem of singularity encountered when the slab is modeled considering columns as local support. A model that includes the integrated slab x column analysis was proposed, distributing the column reactions under the slab. The procedure used transforms the bending moment and column axial force in a distributed load, which will be applied to the slab in the opposite direction of gravitational loads.
Thus, the bending moment diagram gets smooth in the punching region with a considerable reduction of values, being very little sensible to the variation of used mesh. About the column, it was not seen any significant difference in the axial force, although the same haven't occurred with the bending moments results. The final part of the work uses geoprocessing programs for a three-dimensional view of bending moments, allowing a new comprehension the behavior of these internal forces in the entire slab.
Keywords: flat slabs; reinforced concrete; FEM; singularity. Introduction The flat slabs are an interesting structural system for applications in projects, providing layout changes because they don't require the use of beams.
Analyses of this type of slab are complex and are often designed using software developed for linear analysis based on the classic plate theory, using numerical analyses (SKORPEN ET AL ). The Finite Element Method (FEM) and Grid Analogy Method are examples for numerical analyses, both procedures widely used by technical designers. The use of numerical models that simulate the slabs-columns connections as being pinned support (singularities) provide results with high concentration of strains across these areas, resulting in peak of bending moments in the slab and distortions of the values of bending moments columns. Results of this type require a more refined analysis to be used in structural designs. According CHOI ET AL, the structural behavior of the slab- columns connections is very complicated, since they are composed of two different types of elements: beams (columns) and plates (slabs).
It is known that the slabs-columns connections are not punctual. Figure 1 Distribution of bending moments on a flat slab adapted of SKORPEN ET AL they are regions of complex behavior.
The numerical models using the columns as pinned supports despise the favorable effect of that interaction region. This effect should be taken into account to provide a better analysis of the slabs-columns connections. Therefore, it is necessary improve the models to obtain suitable efforts across these areas. There are several possible models that take these effects into account, which can vary in complexity, and many of them are not suitable for current use in structural projects.
MURRAY ET AL comments that the way to model slabs-columns connections behavior is the critical point of analysis of flat slabs. The purpose of this paper is to contribute to the development of models for structural analysis that can be used in projects of reinforced concrete structures, integrating flat slabs with the columns, using the Finite Element Elastic Linear Analysis. To ease the analysis of the slabs-columns connections and to obtain results for the design of the slabs, this work also tried to contribute in graphic displays of results using available resources in other areas of engineering, allowing 3D views and mapping sections in regions of interest. The softwares SAP2000, ArcGIS / ArcMap and Global Mapper have been adopted as tools for the development of this work. Modeling alternatives slabs-columns connections Theoretically, when a concentrated load is applied on a slab, it causes a bending moment that tends to infinity in its point of application, creating singularity points. Consequently, in a numerical method, when a column for supporting slabs is modeled as a pinned support, it causes the effect of a concentrated load in the opposite direction, resulting in very high bending moments on the load application point and around it. Studies by PUEL showed that those moments will be greater as the mesh gets more refined.
According SKORPEN ET AL, the basics of using linear FEM to analyze flat slabs is commonly understood by most designers. However, the modeling of connections between column and slab is still open to numerous forms of designer interpretation. The NBR 6118: 2014 and even the Eurocode 2, which is a respected code in the technical community, do not prescribe a type of analysis or modeling nor indicate how to interpret the results obtained from a numerical analysis of concentrated loads effect. This naturally leads to many forms of interpretation that depend on how the slabs-columns connections are modeled, leaving it to the experience and feeling of the designers. Another approach for the design of flat slabs is use the Equivalent Frames Method, which takes into account the plastic behavior of the cross sections of reinforced concrete slab, that leads to a design with redistribution of bending moments. According MURRAY ET AL, the design of flat slabs is governed by national codes of practice that have developed as a result of empirical research. Some international codes prescribe criteria to distribute the peak bending moments for the footings design, as shown in.
The NBR 6118: 2014, item 14.7.8, allows the structural analysis of flat slabs by the Equivalent Frames Method (EFM). This is a process based on an approximate elastic analysis, with redistribution, taking in each direction multiple frames to obtain the internal forces, whose inertias will be equal to the slab's limited by the half of the distance between two rows of columns, as shown in. For each frame the total loading must be considered. The distribution of moments obtained in each direction, according to NBR 6118: 2014, item 14.7.8, is as follows: n 45,0% of positive moments for the two inner strip; n 27,5% of positive moments for each of the external strip; n 25,0% of negative moments for the two inner strip; n 37,5% of negative moments for each of the external strip. The Equivalent Frames Method provides more economic results compared with projects based on linear elastic analysis, but should be used only in the Ultimate Limits State (ULS) checks.
Methodology for column reaction distribution on the slab When the column is positioned asymmetrically in relation to the slab, the load is asymmetric or horizontal forces exist, besides the normal force, bending moments appear in the column. The application of the load as a reaction distributed in the slab at the column region should take into account binary forces, calculated from the sum of the bending moment applied to the slab, from the upper and lower span column. The effect of connection between column x slab is obtained through a model analogous to the one used in continuous beam, which is modeled half of the column above and half of the column below. With this, when there is an asymmetry in the loading and/or the geometry between the slab and punched column, spin happens on the joint at the column x slab connection, which causes bending in the column, as shown in.
The methodology for simulating the axial forces and bending on the column as a reaction applied to the slab consists an iterative process, shown briefly in. The necessary steps in this process are presented in detail as follows: 1) Initially, analyze the structure modeling the column as pinned support to obtain the diagrams of normal forces and bending moments on the column; 2) Find the value of 'q' and 'q M'. Overlap the normal (q) and bending (q M) column effects, getting a final loading diagram with q E and q D values, adding it in the slab. Where: q = Load value applied as a reaction on the slab due to the column normal stress; a = colum dimension at the moment action plan; b = another column dimension; P = axial force on the column; M laje = slab bending moment, obtained by the sum of upper. Moment column and lower moment column; qM = Edge value load applied as reaction on the slab; qE = load at the column left face; qD = load at the column right face. 3) Replace column modeled as line (half up and half down) for a hinged support, as shown in.
4) Analyze the structure again, obtaining the forces on column joint restricted (red circle in ); 5) The support reaction should be zero or close to zero. If not, correct the initial axial force from the difference found in this iteration; 6) Through spin joint, check the new active moment, multiplying the spin joint by the spring with stiffness that simulates the rigidity of the column line, modeled half upper and half lower of the slab, as shown in. The spring stiffness (kmola) is calculated as follows. Where: M laje = Slab action moment; k mola = springs stiffness; ϕ = column joint spin restricted (red circle in ), obtained by load diagram with q E and q D, applied as a reaction on the slab, as shown in. If the bending moment in this iteration that occurs the column joint restricted is not equal to the previous bending moment, used to find q E and q D, it is necessary to repeat the process. Convergence occurs when the moment obtained in the current iteration is equal or practically equal to that used in the previous interaction.
It is necessary to stipulate a minimum limit of convergence for the spring moments. Figure 14 Column joint spin restricted (PUEL ) To represent the pillar as a reaction on the flat slab distributed at the column cross-section area, it is necessary that the geometry of the mesh used in FEM modeling matches these dimensions. The same occurs when there is a rigid sector on the column head and when it distributes the reaction in the column region projected at the geometric center of the slab (similar criteria to the effects of a wheel on bridge slabs) Thus, it is necessary to create transitions in the mesh to make this geometric adjustment, as shown in and. The adoption of rigid sectors on head column follows the NBR 6118: 2014 requirements, item 14.6.2.1. This model was also suggested by ROMBACH Case 'e'.
Models description The numerical analyses made in this paper model the column in different ways, the first being a bar connected directly on the slab plate elements. This modeling is used only for comparison with the results obtained in more suitable models. Models were made to replace the column reaction as load applied to the slab in opposite direction as gravity loads, using the column cross-section area and column cross-section area projected at the geometric center of the slab. Finally, models were made with rigid sectors to simulate the column head, with or without distributed reactions. Two structures were studied, one with a symmetrically middle column and another with an asymmetry on the column position. The models developing for each structure were called 'Cases' and are presented in the next chapter. The shows the structure with an asymmetric column position, with a 1m eccentricity to the vertical axis when compared with the symmetrical structure.
Figure 16 Column region projected at the geometric center of the slab n F ck = 25 MPa; n E cs = 2,38 x 107 kN/m 2; n Overload = 2,0 kN/m 2; n Floor covering = 1,0 kN/m 2; n Self wheigth = 0,16 x 25 = 4,0 kN/m 2; n Slab thickness = 16,0 cm n Total load applied to the slab= 7,0 kN/m 2; n Vincinity beams sections 20 x 50 cm; n Vincinity columns sections 20 x 20 cm; n Middle column sections 50 x 50 cm; n k spring = 371875 kNm; n Rigid sector dimension = 40,4 cm; n Column projected dimension = 66 cm; n Rigid sector stiffiness = 100x slab thickness stiffness. As boundary conditions, the upper and lower column joints were restricted with roller and hinged supports, respectively.
This model is analogous to the continuous beam prescribed in NBR 6118: 2014. Analysis results Models of symmetrical flat slabs (Case 1.1) are shown in. The results () showed that the slabs positive moments are little influenced modeling the column as line or by the mesh adopted. However, the same cannot be said about the negative moments in the slab. The also shows that the maximum negative moment over the column P5 is strongly influenced by the mesh adopted, which tends to always increase with the refinement of this mesh.
This moment is not suitable for use in structural analysis, showing that the column modeled as a bar directly connected to the slab should be avoided if the purpose analysis is to obtain bending moments in the region slab x column connection It is shown in the bending moments over the column P5, section 1-1, using mesh 12.5, shown in. The bending moments diagrams provided by the Cases 1.2 and 1.3 were smoothed over the column P5 compared with Case 1.1 (where is pinned considered) because they consider the column reaction distributed in the slab. Analogous results were obtained by PEDROZO. The other meshes studied also showed similar results as presented in, showing that the Cases 1.2 and 1.3 are less sensitive to mesh used. Therefore, modeling the column reaction as a distributed load solves the singularities, providing suitable moments for structural analysis. The distribution of these loads over the cross-section area column or the crosssection area column projected in the geometric center of the slab changes a little the value of the maximum moment.
The, which shows the maximum moments over the column P5 for Cases 1.1, 1.2 and 1.3 for the various meshes studies, confirms these partial conclusions. Besides, it can be noted that Case 1.1 clearly shows the singularity problem, because the negative moments over the column increase when finer meshes are used. The use of a rigid section at the column head also provides a suitable modeling. The use of distributed loads together with the rigid sections smooth the moment diagram over the column, but there is some perturbation of moments within de column.
The moments obtained on the column face have very similar values to each other. It can be an appropriate alternative to represent the moments on this region. The shows the bending moment's variation at the P5 column face to the Cases 2.1, 2.2 and 2.3. It may be noted that the values are practically the same for Cases 1.2 and 1.3, obtained at the P5 column face, whatever mesh used. In the Case 2.1, the moments at the face using a mesh with 12,5x12,5cm were almost the same obtained on Cases 1.2, 1.3, 2.2 and 2.3.
The rigid section at column head allows modelling adequately the column stiffness, also observed by ROMBACH (Case 'e' ). When introduced an asymmetry in the column position, the structural behavior changes significantly. To calculate the distributed reaction must include the column bending moment. It's showed at the bending moment on the flat slab with asymmetry in the column position. It was used a mesh with 25x25cm, carrying out refinements in the cross-section area column, using meshes with 12,5x12,5cm 6,25x6,25cm and 3,125x3,125cm.
The results are shown in graphs, using the Section 1 as reference. The shows the bending moments for the Cases 3.1 / 3.2 / 3.3. The shows the maximum negative bending moments over the P5 column for the Cases 3.1 / 3.2 / 3.3.
It is clearly noted that modeling column as bar directly connected to the plates elements is not an appropriate model. Modeling column reaction distributed at the cross-section area, however, smooths the moments over the column´s region.
The qualitative results of this model are analogous to the negative moments smoothed on the supports of continuous beams. Besides, the quantitative results are little dependent on the mesh used, solving the singularity problem. The shows the bending moments for Cases 4.1 / 4.2 / 4.3. When using the rigid section at column head to simulate the column dimensions, in case 4.1, the maximum negative moment remains dependent on the mesh used (). However, modeling the column reaction distributed at the rigid sections gets the moments smoothed over the column cross-section and little dependent on the mesh used, as had occurred in the symmetrical structure (). The use of rigid section at column head results bigger bending moments than compared with models without rigid sections, and there is also a perturbation of moments within de column cross-section.
The shows the distribution of bending moments only over the column P5 region for Cases 3.1 / 3.2 / 3.3 and 4.1 / 4.2 / 4.3. It can be noticed, once again, that the modeling cases with rigid sections provide moments more consistent when analyzed in the beginning of the rigid section or at the column face, and even Case. Figure 20 Bending moments - Region column P5 - Cases 1.1/1.2/1.3/2.1/ 2.2/ 2.3 When there is asymmetry on the column position, the loading diagram of the column reaction is not uniform and, therefore, the maximum negative moment to the slab does not occur in the column center, as can be observed in Cases 1.2 and 1.3. The moments diagram gets moved in the opposite direction to the column joint spin.
And show the bending moments at the left and right sides of the column P5, respectively. Except with mesh of 25x25cm, the moments in both faces of the column P5 are about the same for the Cases 3.2 and 3.3, 4.1 and 4.2. The Case 4.3 showed results noticeably greater than the Cases cited above. The Case 4.1, although has the problem of the singularity, the est to the slabs design, analyzing the column bending moments moments on both sides were consistent. This does not happen in can be of interest, which will later be used for punching check Case 3.1, which also has the singularity problem, but without rigid and column design. Section on the column head.
The shows the bending moments at the column P5 for Besides the analyses of slab bending moments, which is inter- Cases 3 and 4. Figure 22 Bending moments - face of column P5 - Cases 2.1/2.2/2.3 In general, the bending moments at the column P5 for Case 4 were greater than those obtained for Case 3, on average 10% higher. The Cases 3.3 and 4.3 resulted in moments higher when compared with the Cases 3.2 and 4.2, respectively.
The difference to the mesh of 3,125x3,125cm was 8.0% of Case 3.3 compared to Case 3.2 and 3.0% of Case 4.3 compared to Case 4.2. Therefore, the models with rigid section at column head lead to minor differences when distributing the column reaction in the cross-section area than the cross-section area column projected at the geometric center of the slab. 3D Graphics With computer graphics booming, it's possible to explore the 3D features in viewing results. In this article in particular, as there are regions with significant concentration stress, the 3D views allow a better understanding in these regions behavior as well as the use of graphics resources to obtain sections of interest.
This type of visualization, often used in image processing, is much better than 2D views. Thus, 3D graphics will be generated from the data obtained from linear analysis with the help of the following software: n ArcGis/ArcMap: software used for image processing.
Figure 25 Maximum negative bending moments over column P5 n Global Mapper: software used to render the triangulation. From the models generated in software SAP 2000 for Case 3, exportsed to the X, Y and Z mesh joints coordinates and imported for the software ArcGIS / ArcMap and Global Mapper. The X and Y coordinates giving the joint position in plant. The coordinate Z represents the bending moment at each joint mesh. The final product is an Rastes image with pixels of 0.04 cm, generated from points arranged according actual values. In order to understand the region where the stress concentration. Figure 27 Bending moments - Asymmetrical flat slab - Section 1 - Case 4.2 occurs, it shows the 3D display bending moments.
The graphics will be presented to the Cases 3.1, 3.2 and 3.3 (the column region without rigid section with asymmetry 1 meter), considering the mesh of 25x25 cm, with transition in the column region to 12,5x12,5 cm. In all cases a section was made in the slab (), which pass through the column P5 center (Section 1).
The points shown in coincide with the mesh joints used in the SAP 2000 for the cases studied in this article. The refers to mesh of 25x25cm with transition on column region to 12,5x12,5cm. The shows the 3D display of the moments in the direction X, for Case 3.2, a without rendering and b with rendering. The shows the section 1 to Case 3.1. The shows the 3D display of the moments in the direction X, for Case 3.1, a without rendering and b with rendering. The shows the section 1 to Case 3.2. The shows the 3D display of the moments in the direction X, for Case 3.3, a without rendering and.
Figure 29 Maximum negative bending moments - Left face column P5 b with rendering. Visualization of large stress concentrations in the column region, The shows the section 1 to Case 3.3. And its possible see that the reaction distribution gets smoothed The 3D view allows the visualization of the bending moments the bending moments. Along the all slab, facilitating detailed analysis of their behavior in The use of GIS software allows, besides to obtaining predetermined cross sections, future postprocessing to obtain areas of the vicinity column region.
The results before have allowed a quick. Conclusions The elastic-linear analysis of structures studied showed the use of suitable modeling to the column x slab connections. The procedure proposed in this work, distributing the column reaction as a distributed load, was efficient and can be applied easily even in commercial structural analysis programs. The modeling used solve the singularity problem can be applied in both symmetric and asymmetric structures, and it was little sensitive to the mesh variation after a suitable refinement. The results obtained with the bending moments smoothed over the column allowed an easy understanding of the phenomenon on P5 region, facilitating future decisions to use these results. Figure 32 Analyzed sections in 3D view - Direction X The column reaction distributed on the slab in the column crosssection and also the reaction distributed in the column region projected at the geometric center of the slab, provided a small change in the maximum moment value, and the distribution projected at the geometric center of the slab decreased a little this value, going towards results when models with rigid section at the head column.
The use of rigid sections at the column head could include in the model, the stiffness column effect in this region. The distributed load inclusion provided the best quality results within the column area. Cbi Shankar Kannada Mp3 Songs Download more. However, the values closer to the column face are best suited to represent the efforts in this region.
Prepar3d Seriale. When analyzing a model column x slab integrated, in addition to efforts on the slab may be necessary to study the efforts on the columns for punching check and column design. Figure 33 Graphic 3D - Asymmetrical flat slab - Case 3.1 - Direction X While the column P5 axial forces in models with or without rigid section, distributing or not the column reaction as loading the slab, present results with little variation between themselves, the bending moments depends on the modeling. When it models the column as pinned support and does not consider the rigid section at the column head (Case 3.1), the results were much smaller for refined mesh within column P5 region. This occur due a lot of elements within the column with small stiffness, damaging the slabs-columns connection. These models must be avoided. However, when distributing the P5 column reaction at the column cross-section area, keeping the column region without rigid sections, the bending moment in column P5 was low sensitive to the mesh used in both analyzes and numerically much greater than values obtained in Case 3.1. When use rigid sections at the column head, in all subcases of the Case 4, the bending moment at the column are close to each other, and numerically great than those obtained in the Cases 3.2 and 3.3.
By adding rigid elements on the column P5 area made the slab-column connection present a behavior that takes into account the correctly stiffness of this connection, as showed in Case 4.1: even with the singularity problem, the bending moment at the column P5 showed good results, being also a possible solution. Finally, the bending moments displayed in the slab in 3D graphics with the help of specialized software for GIS promotes the analysis results. It´s possible to view the bending moments in a spatial form, in all directions.
This type of resource may to be important in defining criteria for the slab design.