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Betti's theorem, also known as Maxwell-Betti reciprocal work theorem, discovered by Enrico Betti in 1872, states that for a linear elastic structure subject to two sets of forces {Pi} i=1,...,m and {Qj}, j=1,2,...,n, the work done by the set P through the displacements produced by the set Q is equal to the work done by the set Q through the displacements produced by the set P. This theorem has applications in structural engineering where it is used to define influence lines and derive the boundary element method.

Betti's theorem is used in the design of compliant mechanisms by topology optimization approach.

Demonstration

Consider a solid body subjected to a pair of external force systems, referred to as FiP and FiQ. Consider that each force system causes a displacement fields, with the displacements measured at the external force's point of application referred to as diP and diQ.

When the FiP force system is applied to the structure, the balance between the work performed by the external force system and the strain energy is:

12i=1nFiPdiP=12ΩσijPϵijPdΩ

The work-energy balance associated with the FiQ force system is as follows:

12i=1nFiQdiQ=12ΩσijQϵijQdΩ

Now, consider that with the FiP force system applied, the FiQ force system is applied subsequently. As the FiP is already applied and therefore won't cause any extra displacement, the work-energy balance assumes the following expression:

12i=1nFiQdiQ+i=1nFiPdiQ=12ΩσijQϵijQdΩ+ΩσijPϵijQdΩ

Conversely, if we consider the FiQ force system already applied and the FiP external force system applied subsequently, the work-energy balance will assume the following expression:

12i=1nFiPdiP+i=1nFiQdiP=12ΩσijPϵijPdΩ+ΩσijQϵijPdΩ

If the work-energy balance for the cases where the external force systems are applied in isolation are respectively subtracted from the cases where the force systems are applied simultaneously, we arrive at the following equations:

i=1nFiPdiQ=ΩσijPϵijQdΩ
i=1nFiQdiP=ΩσijQϵijPdΩ

If the solid body where the force systems are applied is formed by a linear elastic material and if the force systems are such that only infinitesimal strains are observed in the body, then the body's constitutive equation, which may follow Hooke's law, can be expressed in the following manner:

σij=Dijklϵkl

Replacing this result in the previous set of equations leads us to the following result:

i=1nFiPdiQ=ΩDijklϵijPϵklQdΩ
i=1nFiQdiP=ΩDijklϵijQϵklPdΩ

If we subtracting both equations then we obtain the following result:

i=1nFiPdiQ=i=1nFiQdiP

Example

For a simple example let m=1 and n=1. Consider a horizontal beam on which two points have been defined: point 1 and point 2. First we apply a vertical force P at point 1 and measure the vertical displacement of point 2, denoted ΔP2. Next we remove force P and apply a vertical force Q at point 2, which produces the vertical displacement at point 1 of ΔQ1. Betti's reciprocity theorem states that:

PΔQ1=QΔP2.

See also

References

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