McCarthy Formalism

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A mechanical system is scleronomous if the equations of constraints do not contain the time as an explicit variable. Such constraints are called scleronomic constraints.

Application

Main article:Generalized velocity

In 3-D space, a particle with mass m, velocity v has kinetic energy

T=12mv2.

Velocity is the derivative of position with respect time. Use chain rule for several variables:

v=drdt=irqiq˙i+rt.

Therefore,

T=12m(irqiq˙i+rt)2.

Rearranging the terms carefully,[1]

T=T0+T1+T2:
T0=12m(rt)2,
T1=imrtrqiq˙i,
T2=i,j12mrqirqjq˙iq˙j,

where T0, T1, T2 are respectively homogeneous functions of degree 0, 1, and 2 in generalized velocities. If this system is scleronomous, then the position does not depend explicitly with time:

rt=0.

Therefore, only term T2 does not vanish:

T=T2.

Kinetic energy is a homogeneous function of degree 2 in generalized velocities .

Example: pendulum

A simple pendulum

As shown at right, a simple pendulum is a system composed of a weight and a string. The string is attached at the top end to a pivot and at the bottom end to a weight. Being inextensible, the string’s length is a constant. Therefore, this system is scleronomous; it obeys scleronomic constraint

x2+y2L=0,

where (x,y) is the position of the weight and L is length of the string.

A simple pendulum with oscillating pivot point

Take a more complicated example. Refer to the next figure at right, Assume the top end of the string is attached to a pivot point undergoing a simple harmonic motion

xt=x0cosωt,

where x0 is amplitude, ω is angular frequency, and t is time.

Although the top end of the string is not fixed, the length of this inextensible string is still a constant. The distance between the top end and the weight must stay the same. Therefore, this system is rheonomous; it obeys rheonomic constraint

(xx0cosωt)2+y2L=0.

See also

References

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