Centered trochoid

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Elastic wedge loaded by two forces at the tip

The Flamant solution provides expressions for the stresses and displacements in a linear elastic wedge loaded by point forces at its sharp end. This solution was developed by A. Flamant [1] in 1892 by modifying the three-dimensional solution of Boussinesq.

The stresses predicted by the Flamant solution are (in polar coordinates)

σrr=2C1cosθr+2C3sinθrσrθ=0σθθ=0

where C1,C3 are constants that are determined from the boundary conditions and the geometry of the wedge (i.e., the angles α,β) and satisfy

F1+2αβ(C1cosθ+C3sinθ)cosθdθ=0F2+2αβ(C1cosθ+C3sinθ)sinθdθ=0

where F1,F2 are the applied forces.

The wedge problem is self-similar and has no inherent length scale. Also, all quantities can be expressed in the separated-variable form σ=f(r)g(θ). The stresses vary as (1/r).

Forces acting on a half-plane

Elastic half-plane loaded by two point forces.

For the special case where α=π, β=0, the wedge is converted into a half-plane with a normal force and a tangential force. In that case

C1=F1π;C3=F2π

Therefore the stresses are

σrr=2πr(F1cosθ+F2sinθ)σrθ=0σθθ=0

and the displacements are (using Michell's solution)

ur=14πμ[F1{(κ1)θsinθcosθ+(κ+1)lnrcosθ}+F2{(κ1)θcosθ+sinθ(κ+1)lnrsinθ}]uθ=14πμ[F1{(κ1)θcosθsinθ(κ+1)lnrsinθ}F2{(κ1)θsinθ+cosθ+(κ+1)lnrcosθ}]

The lnr dependence of the displacements implies that the displacement grows the further one moves from the point of application of the force (and is unbounded at infinity). This feature of the Flamant solution is confusing and appears unphysical. For a discussion of the issue see http://imechanica.org/node/319.

Displacements at the surface of the half-plane

The displacements in the x1,x2 directions at the surface of the half-plane are given by

u1=F1(κ+1)ln|x1|4πμ+F2(κ+1)sign(x1)8μu2=F2(κ+1)ln|x1|4πμ+F1(κ+1)sign(x1)8μ

where

κ={34νplane strain3ν1+νplane stress

ν is the Poisson's ratio, μ is the shear modulus, and

sign(x)={+1x>01x<0

Derivation of Flamant solution

If we assume the stresses to vary as (1/r), we can pick terms containing 1/r in the stresses from Michell's solution. Then the Airy stress function can be expressed as

φ=C1rθsinθ+C2rlnrcosθ+C3rθcosθ+C4rlnrsinθ

Therefore, from the tables in Michell's solution, we have

σrr=C1(2cosθr)+C2(cosθr)+C3(2sinθr)+C4(sinθr)σrθ=C2(sinθr)+C4(cosθr)σθθ=C2(cosθr)+C4(sinθr)

The constants C1,C2,C3,C4 can then, in principle, be determined from the wedge geometry and the applied boundary conditions.

However, the concentrated loads at the vertex are difficult to express in terms of traction boundary conditions because

  1. the unit outward normal at the vertex is undefined
  2. the forces are applied at a point (which has zero area) and hence the traction at that point is infinite.
Bounded elastic wedge for equilibrium of forces and moments.

To get around this problem, we consider a bounded region of the wedge and consider equilibrium of the bounded wedge.[2][3] Let the bounded wedge have two traction free surfaces and a third surface in the form of an arc of a circle with radius a. Along the arc of the circle, the unit outward normal is n=er where the basis vectors are (er,eθ). The tractions on the arc are

t=σntr=σrr,tθ=σrθ.

Next, we examine the force and moment equilibrium in the bounded wedge and get

f1=F1+αβ[σrr(a,θ)cosθσrθ(a,θ)sinθ]adθ=0f2=F2+αβ[σrr(a,θ)sinθ+σrθ(a,θ)cosθ]adθ=0m3=αβ[aσrθ(a,θ)]adθ=0

We require that these equations be satisfied for all values of a and thereby satisfy the boundary conditions.

The traction-free boundary conditions on the edges θ=α and θ=β also imply that

σrθ=σθθ=0atθ=α,θ=β

except at the point r=0.

If we assume that σrθ=0 everywhere, then the traction-free conditions and the moment equilibrium equation are satisfied and we are left with

F1+αβσrr(a,θ)acosθdθ=0F2+αβσrr(a,θ)asinθdθ=0

and σθθ=0 along θ=α,θ=β except at the point r=0. But the field σθθ=0 everywhere also satisfies the force equilibrium equations. Hence this must be the solution. Also, the assumption σrθ=0 implies that C2=C4=0.

Therefore,

σrr=2C1cosθr+2C3sinθr;σrθ=0;σθθ=0

To find a particular solution for σrr we have to plug in the expression for σrr into the force equilibrium equations to get a system of two equations which have to be solved for C1,C3:

F1+2αβ(C1cosθ+C3sinθ)cosθdθ=0F2+2αβ(C1cosθ+C3sinθ)sinθdθ=0

Forces acting on a half-plane

If we take α=π and β=0, the problem is converted into one where a normal force F2 and a tangential force F1 act on a half-plane. In that case, the force equilibrium equations take the form

F1+2π0(C1cosθ+C3sinθ)cosθdθ=0F1+C1π=0F2+2π0(C1cosθ+C3sinθ)sinθdθ=0F2+C3π=0

Therefore

C1=F1π;C3=F2π.

The stresses for this situation are

σrr=2πr(F1cosθ+F2sinθ);σrθ=0;σθθ=0

Using the displacement tables from the Michell solution, the displacements for this case are given by

ur=14πμ[F1{(κ1)θsinθcosθ+(κ+1)lnrcosθ}+F2{(κ1)θcosθ+sinθ(κ+1)lnrsinθ}]uθ=14πμ[F1{(κ1)θcosθsinθ(κ+1)lnrsinθ}F2{(κ1)θsinθ+cosθ+(κ+1)lnrcosθ}]

Displacements at the surface of the half-plane

To find expressions for the displacements at the surface of the half plane, we first find the displacements for positive x1 (θ=0) and negative x1 (θ=π) keeping in mind that r=|x1| along these locations.

For θ=0 we have

ur=u1=F14πμ[1(κ+1)ln|x1|]uθ=u2=F24πμ[1+(κ+1)ln|x1|]

For θ=π we have

ur=u1=F14πμ[1(κ+1)ln|x1|]+F24μ(κ1)uθ=u2=F14μ(κ1)F24πμ[1+(κ+1)ln|x1|]

We can make the displacements symmetric around the point of application of the force by adding rigid body displacements (which does not affect the stresses)

u1=F28μ(κ1);u2=F18μ(κ1)

and removing the redundant rigid body displacements

u1=F14πμ;u2=F24πμ.

Then the displacements at the surface can be combined and take the form

u1=F14πμ(κ+1)ln|x1|+F28μ(κ1)sign(x1)u2=F24πμ(κ+1)ln|x1|+F18μ(κ1)sign(x1)

where

sign(x)={+1x>01x<0

References

  1. A. Flamant. (1892). Sur la répartition des pressions dans un solide rectangulaire chargé transversalement. Compte. Rendu. Acad. Sci. Paris, vol. 114, p. 1465.
  2. Slaughter, W. S. (2002). The Linearized Theory of Elasticity. Birkhauser, Boston, p. 294.
  3. J. R. Barber, 2002, Elasticity: 2nd Edition, Kluwer Academic Publishers.

See also