MultiPhysicsVault/wiki/concepts/Displacement-Based Finite Element Formulation.md

---
type: concept
title: "Displacement-Based Finite Element Formulation"
complexity: advanced
domain: computational-mechanics
aliases:
  - displacement formulation
  - displacement method
created: 2026-05-28
updated: 2026-05-29
address: c-000008
tags:
  - concept
  - finite-element-method
  - structural-mechanics
status: current
related:
  - "[[Finite Element Method]]"
  - "[[Isoparametric Finite Elements]]"
  - "[[Mixed Finite Element Formulations]]"
  - "[[Solid Element Notes]]"
  - "[[Solid Element Strain-Displacement Matrix]]"
  - "[[Solid Element Stiffness Integration]]"
  - "[[Assumed Transverse Shear Strain Interpolation]]"
  - "[[Direct Stiffness Method]]"
  - "[[Bar and Truss Finite Elements]]"
  - "[[Beam and Frame Finite Elements]]"
  - "[[Plane Stress and Plane Strain Elements]]"
sources:
  - "[[Finite Element Procedures]]"
  - "[[A Continuum Mechanics Based Four-Node Shell]]"
  - "[[Solid Element Notes]]"
  - "[[A-First-Course-in-the-Finite-Element-Method|A First Course in the Finite Element Method]]"
source_refs:
  - source: "[[Finite Element Procedures]]"
    raw_path: ".raw/FiniteElementProcedures/"
    raw_files:
      - "FiniteElementProcedures_017.md"
      - "FiniteElementProcedures_001.md"
      - "FiniteElementProcedures_030.md"
      - "FiniteElementProcedures_index2.md"
    md_indices:
      - 17
      - 1
      - 30
      - 109
    match: "heuristic-heading-keyword"
    confidence: high
  - source: "[[A Continuum Mechanics Based Four-Node Shell]]"
    raw_path: ".raw/AContinuumMechanicsBasedFourNodeShell/"
    raw_files:
      - "AContinuumMechanicsBasedFourNodeShell_001.md"
      - "AContinuumMechanicsBasedFourNodeShell_002.md"
    md_indices:
      - 1
      - 2
    match: "heuristic-heading-keyword"
    confidence: high
  - source: "[[Solid Element Notes]]"
    raw_path: ".raw/SolidElement/"
    raw_files:
      - "SolidElement_001.md"
    md_indices:
      - 1
    match: "heuristic-heading-keyword"
    confidence: low
  - source: "[[A-First-Course-in-the-Finite-Element-Method|A First Course in the Finite Element Method]]"
    raw_path: ".raw/AFirstCourseInTheFiniteElementMethod/"
    raw_files:
      - "AFirstCourseInTheFiniteElementMethod_047.md"
      - "AFirstCourseInTheFiniteElementMethod_003.md"
      - "AFirstCourseInTheFiniteElementMethod_039.md"
      - "AFirstCourseInTheFiniteElementMethod_005.md"
    md_indices:
      - 47
      - 3
      - 39
      - 5
    match: "heuristic-heading-keyword"
    confidence: high
---

# Displacement-Based Finite Element Formulation

## Definition

The displacement-based finite element formulation uses nodal displacements as the primary unknowns and derives element and global equilibrium equations from a virtual work, energy, or variational statement.

## How It Works

Element displacement fields are interpolated from nodal degrees of freedom. Strains are computed from displacement gradients, stresses from constitutive laws, and element stiffness matrices from the strain-displacement and material matrices. Element contributions are assembled into the global equilibrium system, commonly represented in linear static form as `K u = R`.

## Why It Matters

This is the main formulation path for linear solid and structural mechanics in the source. It is direct and broadly useful, but it has limits for incompressibility, locking, and constraints, which motivates [[Mixed Finite Element Formulations]].

The four-node shell paper gives a concrete locking example: direct displacement interpolation can impose nonphysical transverse shear strains in thin-shell bending, motivating [[Assumed Transverse Shear Strain Interpolation]].

[[Solid Element Notes]] gives the corresponding 3D continuum path: interpolate nodal translations, compute small strains with the solid `B` matrix, apply the Hooke-law `D` matrix, and integrate `B^T D B` over the element volume.

[[A-First-Course-in-the-Finite-Element-Method|A First Course in the Finite Element Method]] gives the introductory sequence: start from the [[Direct Stiffness Method]], then apply displacement interpolation to springs, bars, trusses, beams, frames, plane elements, axisymmetric elements, and thermal stress problems.

## Practical Checks

- Does the interpolation reproduce rigid-body motion and constant strain states where required?
- Are displacement boundary conditions imposed consistently?
- Are stresses recovered in a way that reflects the approximation quality?
- Does mesh refinement improve the relevant response quantities?
- Are distributed, body, surface, and thermal loads converted into compatible equivalent nodal forces?

## Sources

- [[Finite Element Procedures]]
- [[A Continuum Mechanics Based Four-Node Shell]]
- [[Solid Element Notes]]
- [[A-First-Course-in-the-Finite-Element-Method|A First Course in the Finite Element Method]]