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Plastic hinge

A plastic hinge in structural engineering is a localized yield zone within a beam or frame member where the bending moment reaches the full plastic moment capacity, permitting large plastic rotations at a constant moment while the structure redistributes loads to achieve higher ultimate capacity.^[1] This concept applies to ductile materials like structural steel and reinforced concrete, where initial elastic deformation transitions to plastic yielding as stresses exceed the yield point, first at the outer fibers and progressing inward until the entire cross-section yields.^[2] The plastic moment M_p is calculated as M_p = \sigma_y \times S, where \sigma_y is the yield stress and S is the plastic section modulus, which exceeds the elastic yield moment M_y by a shape factor typically ranging from 1.12 for wide-flange sections to 1.5 for rectangular sections.^[1] Plastic hinges form the foundation of plastic analysis methods, enabling engineers to predict collapse mechanisms in indeterminate structures by assuming hinge locations at critical points like supports or maximum moment regions, thus determining the true collapse load factor through principles such as the uniqueness theorem.^[1] In practice, they are idealized as points but represent finite regions of inelastic deformation, often modeled in software using lumped or distributed plasticity approaches for nonlinear seismic simulations.^[2] The development of plastic hinges is essential for performance-based design, particularly in earthquake engineering, where they allow energy dissipation through controlled yielding, enhancing ductility and preventing brittle failure; for instance, in reinforced concrete columns under cyclic loading, hinges concentrate deformations to maintain overall stability.^[3]

Fundamentals

Definition

A plastic hinge is an idealized concept in structural engineering representing a localized yielded zone within a beam or frame member where the bending moment reaches the full plastic moment capacity of the cross-section, permitting substantial rotation at a constant moment level without leading to structural failure.^[4] This model assumes that once the entire cross-section has yielded, the member can undergo unlimited plastic deformation concentrated at that point, akin to the behavior of a mechanical hinge but driven by material plasticity rather than a physical joint.^[2] Unlike an elastic hinge, where rotational deformation is linearly proportional to the applied bending moment under Hooke's law, a plastic hinge forms only after the material transitions from elastic to plastic behavior, with the moment remaining constant as rotation increases due to full plastification of the section.^[2] In elastic analysis, deformation is distributed across the member, but the plastic hinge idealization concentrates nonlinear effects at discrete locations to account for the ductility of materials like steel. The purpose of this idealization is to simplify the analysis of ductile structures subjected to overloads or extreme loads, such as earthquakes, by treating plastic deformation as occurring at discrete points rather than distributed zones, thereby enabling efficient computation of ultimate load capacity and collapse mechanisms. This approach leverages the energy absorption potential of plastic deformation in materials capable of significant straining before fracture.^[2] In beams under bending, this yielding process begins with the development of normal stresses that vary linearly across the cross-section, compressive above the neutral axis and tensile below it, with zero stress at the neutral axis passing through the centroid.^[5] Yield initiation occurs when the extreme fiber stress reaches the material's yield strength, prompting progressive plastification from the outer fibers inward until the full section yields, forming the plastic hinge.

Historical development

The concept of the plastic hinge originated in the early 20th century amid experimental studies on the yielding of steel members. In 1914, Hungarian engineer Gábor Kazinczy conducted tests on fixed-end steel beams, demonstrating that localized plastic deformation formed at critical sections—termed plastic hinges—enabling structures to sustain loads well beyond their elastic capacity before collapse.^[6] This work highlighted the reserve strength in indeterminate structures, challenging purely elastic design assumptions. Building on this, Ludwig Prandtl's theoretical contributions in the 1920s established foundational principles of continuum plasticity, including analyses of plane plastic flow and indentation hardness, which informed later structural applications.^[7] Further experimental validation came from H. Maier-Leibnitz's 1929 tests on I-beams, which confirmed the formation of plastic hinges and the associated load-carrying reserve under bending.^[8] The mid-20th century saw accelerated development of plastic hinge theory, particularly in the United Kingdom, driven by wartime needs for resilient structures against bomb impacts. During World War II, British engineers advanced plastic analysis to exploit the ductility of steel frames, ensuring progressive collapse resistance through controlled hinge formation. Post-war, key formalization occurred in the 1950s through contributions from figures like John F. Baker, who developed methods for predicting collapse mechanisms via plastic hinges and demonstrated their practical application in frame design.^[9] Collaborators such as Michael R. Horne and William Merchant refined these ideas, introducing systematic approaches to plastic analysis, including moment distribution techniques and shakedown theorems, which enabled efficient computation of ultimate loads.^[10] Standardization of plastic hinge concepts in design codes marked their widespread adoption. In the United States, the American Institute of Steel Construction (AISC) integrated plastic design provisions in its 1963 specification, initially for beams and later for frames, allowing up to 15-20% material savings compared to elastic methods.^[11] By the 1980s, European efforts culminated in the Eurocodes, with Eurocode 3 (published in stages from 1992 but developed in the 1980s) incorporating plastic global analysis and hinge-based methods for steel structures, emphasizing limit state design paradigms that accounted for progressive yielding.^[12] This influence extended to seismic provisions in Eurocode 8, promoting dissipative mechanisms via plastic hinges to enhance ductility.^[13]

Theoretical foundation

Material plasticity

Plastic deformation in materials refers to the irreversible change in shape or size that occurs when a material is stressed beyond its elastic limit, contrasting with elastic deformation where the material returns to its original configuration upon unloading. In ductile metals such as steel, this permanent plastic strain arises after the applied stress exceeds the yield stress, denoted as \sigma_y, which marks the onset of yielding and the transition from recoverable to non-recoverable deformation. The ultimate strength, the maximum stress the material can withstand before necking or fracture, determines the extent of post-yield deformation capacity, allowing significant energy absorption before failure.^[14]^[15] The stress-strain behavior of ductile metals is often idealized using a bilinear model, known as the elastic-perfectly plastic approximation, which simplifies analysis for plastic hinge formation. In this model, the curve consists of a linear elastic portion up to \sigma_y, governed by the modulus of elasticity E, followed by a horizontal plastic plateau where strain increases without a corresponding rise in stress, assuming no strain hardening.^[16] While real materials exhibit work hardening—a gradual increase in stress with further strain—this effect is often neglected in basic models for simplicity, though it enhances the load-carrying capacity beyond \sigma_y.^[17] For plastic hinges to form reliably in structural applications, materials must demonstrate sufficient ductility, typically quantified by an elongation at fracture exceeding 20% in tensile tests, ensuring large plastic rotations without brittle failure.^[18] Mild steel grades like ASTM A36, with a minimum elongation of 20-23%, exemplify this ductility, enabling the localized yielding essential for hinge mechanisms, whereas brittle materials such as concrete lack comparable elongation (often <5%) and are unsuitable for pure plastic hinge behavior in metals-focused analyses.^[19] At a microscopic level, yielding in ductile metals initiates through slip mechanisms within the crystal lattice, where dislocations—line defects in the atomic structure—move along specific planes and directions under shear stress, allowing permanent deformation without breaking interatomic bonds.^[20] This process, dominant in face-centered cubic metals like austenitic steels, requires overcoming lattice friction and is facilitated by multiple slip systems to accommodate macroscopic strain.^[21]

Moment-rotation relationship

The moment-rotation relationship describes the nonlinear bending response of a structural member at the location of a plastic hinge, transitioning from elastic behavior to plastic deformation under increasing moment. In the idealized model, this relationship assumes an elastic-perfectly plastic material response, where the member resists moment proportionally to rotation until the plastic moment capacity is reached, after which rotation occurs at constant moment without limit.^[22] This idealization simplifies analysis for collapse load prediction in plastic design, relying on sufficient material ductility to permit large rotations without significant moment increase.^[22] The idealized moment-rotation (M-θ) curve consists of three phases: an initial elastic phase where moment M is linearly related to rotation θ through the member's rotational stiffness, derived from the flexural rigidity EI (product of modulus of elasticity E and moment of inertia I); a yield point at the plastic moment M_p, marking the "knee" of the curve; and a post-yield plateau where M remains constant at M_p while plastic rotation θ_p increases indefinitely.^[23] The plastic moment M_p is given by M_p = Z σ_y, where Z is the plastic section modulus and σ_y is the material yield stress.^[22] This differs from the elastic yield moment M_y = S σ_y, where S is the elastic section modulus; the ratio Z/S, known as the shape factor, typically ranges from 1.12 to 1.5 for common steel sections, reflecting the increased capacity from full plastification.^[18] For symmetric cross-sections, the derivation of Z involves shifting the neutral axis to the centroid upon full plastification, allowing equal areas in tension and compression to yield simultaneously, which effectively doubles the moment capacity compared to elastic conditions for rectangular sections (shape factor of 1.5).^[22] Specifically, Z is computed as the first moment of the entire cross-sectional area about the plastic neutral axis, such as Z = b d^2 / 4 for a rectangular section of width b and depth d.^[18] The plastic rotation capacity θ_p quantifies the additional rotation beyond yield, typically computed as the product of plastic curvature and the length of the plastic zone. In the idealized case, θ_p is unlimited at M_p, but in practice, factors such as strain hardening—where stress increases beyond σ_y with further strain—provide a finite rotation before fracture or local buckling, typically allowing 3 to 9 times the elastic rotation for compact steel sections.^[22] Graphically, the M-θ curve appears as a straight line from the origin with slope representing rotational stiffness up to the yield knee at (θ_y, M_p), followed by a horizontal line extending to large θ_p, emphasizing the hinge-like behavior post-yield.^[23] This bilinear representation, often sketched with the elastic portion steep and the plastic portion flat, underscores the concentration of rotation at the hinge while maintaining full moment resistance elsewhere in the structure.^[22]

Formation and mechanics

Yielding process

In the initial stage of bending, a beam cross-section behaves elastically under increasing load, resulting in a linear stress distribution across the depth with the maximum compressive and tensile stresses occurring at the outer fibers.^[24] This elastic response follows Hooke's law, where stresses are proportional to strains via the material's Young's modulus, and no permanent deformation occurs until the extreme fiber stress reaches the yield stress σ_y, defining the yield moment M_y.^[2] As the applied moment exceeds M_y, partial plastification begins with the outer fibers entering the plastic range, while an elastic core persists in the central portion of the cross-section.^[24] Plastic zones spread inward from the extremities, causing the elastic core to shrink progressively, though the neutral axis remains at the centroid for symmetric sections like I-beams.^[2] This stage allows the moment to increase beyond M_y due to the redistribution of stresses, with the material's stress-strain curve exhibiting a plateau at σ_y in the plastic region.^[24] Full plastification occurs when the entire cross-section yields, with all fibers reaching σ_y in tension or compression, thereby achieving the plastic moment M_p and forming the plastic hinge.^[2] At this point, the load factor λ, defined as the ratio M_p / M_y (also known as the shape factor), is approximately 1.15 for typical I-beam sections, reflecting the enhanced moment capacity from full plastification.^[24] The yielding process is typically analyzed under quasi-static loading assumptions, where load rates are low enough to neglect dynamic effects on material behavior.^[25] Elevated temperatures reduce the yield strength of structural steel; for instance, by approximately 18% at 482°C (900°F), according to Eurocode 3 reduction factors.^[26]^[27] This thereby accelerates plastification and lowers the moments required for hinge formation.

Hinge behavior in structures

In structural engineering, plastic hinges form at critical sections such as supports and points of maximum moment, like midspan, enabling the structure to undergo large deformations without further increase in load. When a sufficient number of these hinges develop independently, they transform the structure into a kinematic chain, allowing unconstrained rotations that lead to collapse. This mechanism formation relies on the principle of virtual work, where the internal work done by moments at the plastic hinges equals the external work done by the applied loads during a virtual displacement (δW_i = δW_e).^[23] The number of plastic hinges required for collapse is determined by the structure's degree of static indeterminacy (r), typically requiring r + 1 hinges to create a mechanism. For beams, such as a fixed-end beam under uniform loading, three hinges are necessary: one at each end and one at midspan, converting the statically indeterminate beam into a mechanism. In frames, the same rule applies based on redundancy; for instance, a multi-story frame may require more hinges depending on its configuration.^[28]^[23] Various collapse mechanisms can occur depending on the loading and geometry. A beam mechanism involves hinges primarily within beam spans, leading to vertical collapse under transverse loads. A sway mechanism forms in frames under horizontal loads, with hinges at beam-column joints enabling lateral sidesway. Combined mechanisms integrate elements of both, often resulting in the lowest collapse load. For example, in a symmetric single-bay portal frame with fixed bases under combined vertical and horizontal loading, a combined mechanism may involve four plastic hinges—two at the beam ends and two at the column tops—allowing both beam sagging and frame sway.^[29]^[23] Energy dissipation during collapse occurs primarily at the plastic hinges, where rotations at the plastic moment capacity absorb the work input from external loads. This dissipation enables moment redistribution throughout the structure, allowing it to carry loads beyond the elastic limit and up to 1.5 to 2 times the elastic capacity in ductile materials, as the hinges maintain constant moment while permitting large rotations.^[29]^[23]

Applications

Beam analysis

In beam analysis using plastic hinge theory, the approach focuses on determining the ultimate load-carrying capacity by identifying the formation of sufficient plastic hinges to create a collapse mechanism. This method leverages the ductility of materials like steel to allow moment redistribution, enabling structures to sustain loads beyond the initial yielding point. For beams, analysis typically involves equilibrium conditions to locate potential hinge positions and kinematic methods to compute collapse loads, providing a more realistic assessment of strength compared to elastic methods that halt at first yield. Consider a simply supported beam of span length L subjected to a central point load P. A single plastic hinge forms at the midspan when the bending moment reaches the plastic moment capacity M_p. At collapse, the beam behaves as two rigid segments rotating about the hinge, with the collapse load given by P_c = \frac{4 M_p}{L}. This formula derives from equilibrium, where the moment at midspan is \frac{P L}{4} = M_p.^[23] For continuous beams, plastic hinge analysis accounts for moment redistribution, where moments shift from over-stressed sections to under-stressed ones after initial hinges form, enhancing overall capacity. In a two-span continuous beam with equal spans L and uniform distributed load w, plastic hinges typically develop at the central support and within each span (often near midspan for symmetric loading). The collapse mechanism involves three hinges: one at the support and one in each span, transforming the structure into a kinematic chain. For an end span under UDL, the collapse load is w_c = \frac{11.656 M_p}{L^2}, with hinges at the end support and at approximately 0.586L from the end. This redistribution allows the beam to carry additional load after the first hinge at the support reaches M_p.^[23] The step-by-step analysis of beams proceeds as follows: first, perform an elastic analysis to identify sections where moments first reach M_p, using equilibrium to sketch bending moment diagrams and locate probable hinge positions. Next, assume a collapse mechanism with the minimum number of hinges required for instability (one more than the degree of static indeterminacy). Then, apply the upper-bound kinematic method, equating external virtual work to internal work at hinges: for a mechanism, \sum P_i \delta_i = \sum M_p \theta_j, solving for the collapse load. Verify with the lower-bound equilibrium method by ensuring no moment exceeds M_p in a statically admissible field. For the two-span example, this yields a collapse load approximately 45% higher than the elastic limit for the end span, though typical redistribution in ductile beams increases capacity by 20-30% over elastic predictions depending on loading and geometry.^[23]^[30] Compared to elastic analysis, which conservatively limits design to the first yield (load factor of 1 based on yield moment M_y), plastic analysis incorporates the full plastic capacity and redistribution, yielding higher load factors (often 1.5-2.0 including shape factor) for ductile beams. This results in safer, more economical designs by utilizing reserve strength, provided rotation capacity at hinges is sufficient to accommodate the mechanism without fracture.^[23]

Frame design

Plastic design of steel frames utilizes the formation of plastic hinges to achieve ultimate load-carrying capacity through controlled collapse mechanisms, prioritizing economy and reserve strength over elastic serviceability limits. This approach allows structures to redistribute moments beyond the first yield point, leveraging the material's ductility to form multiple hinges until a kinematic mechanism develops. The shape factor, defined as f = M_p / M_y, where M_p is the plastic moment capacity and M_y is the yield moment, quantifies the reserve strength available in a cross-section and guides the selection of members with favorable plastic moduli to maximize efficiency. For typical wide-flange sections, f ranges from 1.12 to 1.15, enabling up to 15% additional capacity beyond elastic limits.^[31] Design codes provide specific provisions to ensure safe implementation of plastic analysis in frames. The AISC 360-16 specification permits plastic design for compact sections capable of developing full plastic stress distributions and possessing sufficient rotation capacity, typically requiring a relative rotation capacity of at least 3 (i.e., three times the rotation at yield) before significant strength degradation due to local buckling. Applicable to doubly symmetric I-shaped members and certain hollow sections bent about their major axis, it limits unbraced lengths to prevent lateral-torsional buckling and mandates second-order inelastic analysis for stability. In contrast, Eurocode 3 (EN 1993-1-1) allows plastic global analysis for Class 1 cross-sections in low-rise frames where the critical load factor \alpha_{cr} \geq 15, restricting application to low axial compression where buckling slenderness \bar{λ} ≤ 0.2 (allowing neglect of second-order effects) and ensuring lateral-torsional buckling resistance at plastic hinges to avoid premature instability. Both codes emphasize the use of rolled shapes with low width-to-thickness ratios to ensure ductility at hinge locations.^[32]^[12] The design process begins by assuming a collapse mechanism with plastic hinges at critical sections, such as beam ends and midspans, to form a kinematic chain that defines the ultimate load factor via the principle of virtual work. Member plastic moments M_p are selected to enforce desired hinge locations, adhering to the strong column-weak beam rule, which requires the sum of column flexural strengths at a joint to exceed 1.2 times the sum of adjacent beam strengths, preventing column hinging and promoting energy dissipation in beams. Rotation capacity is verified by ensuring sections meet compactness criteria and bracing prevents buckling, with empirical limits like unbraced length L_{pd} = [0.12 + 0.076 (M_2 / M_1)] (E / F_y) r_y for I-shapes (where M_1 and M_2 are moments at segment ends, |M_2 / M_1| \leq 1) to prevent lateral-torsional buckling during plastic rotations. Equilibrium is checked by constructing moment diagrams that do not exceed M_p anywhere, confirming the mechanism's validity.^[32]^[29] A representative case study involves a single-story symmetric portal frame with span L and height h, subjected to a horizontal load \lambda P at the beam level and vertical loads. The governing collapse mechanism is typically a combined sway-beam mode, with hinges forming at the beam ends, midspan, and leeward column base. Using kinematics, the virtual work principle equates external work from load displacements to internal work at hinges: for small rotations \theta, the collapse load factor \lambda_c satisfies \lambda_c P (\theta h / 2 + \theta L / 4) = 4 M_p \theta, yielding \lambda_c = 4 M_p / (L h / 2 + L^2 / 4) after normalization. Equilibrium verifies this by resolving reactions—e.g., horizontal reaction H = \lambda_c P / 2—and ensuring the free-body moment diagram peaks at M_p without exceeding it elsewhere, such as M(x) = H h - V x along the column. This approach determines the required M_p for a target \lambda_c, often 1.5–2.0 times elastic predictions, highlighting the method's efficiency for low-rise industrial frames.^[29]

Limitations and extensions

Key assumptions

The plastic hinge theory relies on several core idealizations to simplify the analysis of structural collapse under ultimate loads. A primary assumption is perfect plasticity, where the material exhibits no strain hardening beyond the yield point, allowing the stress in the plastic zone to remain constant while permitting unlimited rotation at the full plastic moment capacity M_p. This idealization is valid primarily for mild steels with a well-defined yield plateau, as higher-strength steels often display significant hardening that violates the constant-moment condition during hinging. Another key assumption is that the plastic rotation is fully concentrated at a mathematical point (zero length), with no spread of plasticity along the member length, enabling the hinge to behave like an ideal rotational joint while maintaining equilibrium. Additionally, the theory presupposes sufficient material ductility to accommodate large rotations without fracture, typically requiring an ultimate rotation capacity \theta_u > 0.02-0.05 radians for the hinge to develop fully before failure, which stems from the inherent ductility in the material's plastic regime.^[33] These assumptions impose notable limitations on the applicability of plastic hinge theory, particularly in scenarios where real material and structural behaviors deviate from the idealizations. The model is invalid for strain-rate sensitive materials under dynamic loading, such as earthquakes, where high strain rates can increase yield strength by 20-50% and alter the plastic flow, leading to non-constant moment resistance and premature hardening. It also fails for slender sections prone to local buckling, as thin flanges or webs may buckle elastically before reaching M_p, preventing hinge formation; design codes classify such sections (e.g., Class 4) and prohibit plastic analysis for them. Non-symmetric loading or asymmetric cross-sections further invalidate the theory, as unequal tension-compression yield stresses or eccentric plasticity spread can cause moment redistribution inconsistencies not captured by the point-hinge idealization. To address these uncertainties, modern design codes incorporate safety factors on M_p, applying partial material factors of 1.1-1.25 to reduce the design plastic moment and account for variabilities in material properties, geometry, and loading; for instance, the AISC LRFD uses a resistance factor \phi = 0.9 for flexure, equivalent to a 1.11 factor on capacity. Rotation capacity is verified through standardized testing to ensure sections meet ductility demands, with compact (Class 1 or 2) sections required for plastic hinge development without buckling or fracture. Plastic hinge analysis should be avoided in high-cycle fatigue scenarios, as the theory focuses on monotonic ultimate collapse rather than cumulative damage from repeated low-amplitude cycling, which can initiate cracks unrelated to yielding. Similarly, it is unsuitable for temperature extremes, where elevated temperatures above 600°C can reduce M_p by up to 50% due to decreased yield strength and accelerated creep, invalidating the perfect plasticity assumption.^[34]

Advanced modeling

Advanced modeling of plastic hinges extends beyond classical lumped plasticity assumptions by incorporating distributed yielding mechanisms and computational refinements to capture more realistic structural responses, particularly under complex loading conditions. Distributed plasticity approaches model plastic deformation as spreading over a finite length along beam-column elements, typically 0.5 to 1 times the member depth (h), rather than concentrating at discrete points. This is achieved using finite element formulations with fiber sections that discretize the cross-section into uniaxial material fibers, allowing for gradual yielding and interaction between axial force and bending moments. For instance, force-based beam-column elements employ Gauss-Radau quadrature to integrate plastic rotations over specified hinge lengths, ensuring numerical consistency and objective responses even in strain-softening materials like reinforced concrete. These methods offer advantages over lumped plasticity by reducing mesh sensitivity and accurately simulating non-localized deformation patterns in seismic or progressive collapse scenarios.^[35]^[36] Implementation in software tools such as ABAQUS and OpenSees facilitates these distributed models through integration points and material constitutive laws. In ABAQUS, frame elements support plasticity via a lumped approach at element ends with nonlinear kinematic hardening, but distributed effects are captured using beam elements with multiple integration points along the length to compute moment-curvature relationships based on section fibers. Bilinear kinematic hardening is defined for the material, simulating Bauschinger effects under cyclic loading. OpenSees, an open-source framework, excels in distributed plasticity with force-based or displacement-based beam-column elements, where fiber sections (defined by uniaxial materials like steel with bilinear hardening) enable P-M-M interaction; typically, 5 integration points suffice for accuracy within 2% error in nonlinear analyses. These tools integrate plastic zones using commands for fiber discretization, supporting applications in pushover and dynamic simulations of frames.^[37]^[38] Hybrid approaches combine concentrated plastic hinges with elastic-plastic finite element analysis to balance computational efficiency and accuracy, while incorporating geometric nonlinearity for second-order effects. These methods refine hinge models by distributing plasticity over short lengths within higher-order elements that use co-rotational formulations to handle P-δ and P-Δ interactions, requiring only one element per member for convergence. Material nonlinearity is addressed through incremental spring stiffness updates based on yield functions, enabling simulation of gradual yielding, full plastification, and strain hardening. Such hybrids provide partial safety factors in design and have been validated on benchmarks like column buckling (ultimate load factor of 6.85) and multi-story frames (load factor of 1.03 relative to benchmarks). They are particularly useful for steel structures under combined loading, overcoming limitations of pure elastic analysis.^[39] Recent advances leverage machine learning to predict plastic hinge characteristics, enhancing seismic design by forecasting locations and extents under cyclic loading. Post-2020 studies employ ensemble algorithms like AdaBoost on datasets of over 130 reinforced concrete column tests to predict hinge lengths, outperforming empirical formulas with superior accuracy in force-based fiber elements for monotonic and cyclic behaviors. Stacked ensembles combining support vector regression, random forest, and XGBoost, interpretated via SHAP, achieve R² values of 0.82-0.83 for plastic rotational capacity in rectangular and circular columns, using inputs like reinforcement ratios and axial loads. These data-driven models integrate into nonlinear simulations for rapid vulnerability assessment, supporting performance-based seismic engineering.^[40]^[41]

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Feb 18, 2016 · Nonlinear geometric and material computational technique: Higher-order element with refined plastic hinge approach · Abstract and Figures.
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Data-Driven Approach to Predict the Plastic Hinge Length of Reinforced Concrete Columns and Its Application | Journal of Structural Engineering | Vol 147, No 2
### Summary of Data-Driven Approach for Predicting Plastic Hinge Length in RC Columns
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Stacked ensemble and SHAP-based approach for predicting plastic ...
Oct 16, 2025 · In summary, this study develops machine learning models that are designed to be both accurate and transparent in predicting the plastic ...