A clock consists of two frames of references. This is seen in an ordinary analogue clock, which is composed of two parts:

Circular Space Frame

The space frame is at rest relative to the observer. The time frame is in uniform angular motion relative to the observer. Measurement of space and time requires both frames. The units marked on the space frame have dual significance: (a) as amounts of space or angles in space, and (b) as amounts of time.

Read more →

V. I. Arnold’s Mathematical Methods of Classical Mechanics (Springer, 1989) provides a contemporary approach to classical mechanics. We follow the presentation here but modify it to six dimensions of space-time.

1  The principles of relativity and determinancy

A series of experimental facts is at the basis of classical mechanics. We list some of them.

A  Geometry and order

Motion is three-dimensional and Euclidean.

B  Galileo’s principle of relativity

There exist uniform rectilinear motion (URM) coordinate systems possessing the following two properties:

1. All the laws of motion are in all cases the same in all URM coordinate systems.
2. All coordinate systems in uniform rectilinear motion with respect to a URM one are themselves URM coordinate systems.

In other words, if a coordinate system attached to the earth is URM, then an experimenter on a train which is moving uniformly in a straight line with respect to the earth cannot detect the motion of the train by experiments conducted entirely inside their car.

In reality, the coordinate system associated with the earth is only approximately URM. Coordinate systems associated with the sun, the stars, etc. are more nearly URM.

C  Newton’s principle of determinancy

The initial state of a mechanical system (the totality of positions and motions of its events) uniquely determines all of its motion.

Read more →

Four-Dimensional Formulations of Newtonian Mechanics

First we reproduce section 2 from Michael Friedman’s “Simultaneity in Newtonian Mechanics and Special Relativity” in Foundations of Space-Time Theories (ed. Earman et al., UMinn, 1977), p.405-407. Then we provide the dual.

According to the space-time point of view, the basic object of both our theories is a four-dimensional manifold. I shall use R⁴, the set of quadruples of real numbers, to represent the space-time manifold. Both theories agree that there is a natural system of straight lines defined on this manifold. If (a₀, a₁, a₂, a₃), (b₀, b₁, b₂, b₃) are two fixed points in R⁴, then a straight line is a subset of R⁴ consisting of elements (x₀, x₁, x₂, x₃) of the form

(1) x₀ = a₀r + b₀
x₁ = a₁r + b₁
x₂ = a₂r + b₂
x₃ = a₃r + b₃

where r ranges through the real numbers. A curve on R⁴ is a (suitably continuous and differentiable) map σ: R → R⁴. Such a curve σ(u) is a geodesic if and only if it satisfies

(2) x₀ = a₀u + b₀
x₁ = a₁u + b₁
x₂ = a₂u + b₂
x₃ = a₃u + b₃

where (x₀, x₁, x₂, x₃) = σ(u) and the a_i and b_i are constants. So if a curve is a geodesic its range is a straight line. Note that the geodesies are just the curves that satisfy

(3) d²x_i/du² = 0       i = 0, 1, 2, 3.

The importance of straight lines and geodesies is due to the fact that both theories agree that the trajectories of free particles are straight lines in space-time. So we can represent such trajectories as geodesies in R⁴.

Read more →

We follow the treatment by David Tong of Cambridge University in his Classical Dynamics.

A transicle is defined as a moving object of insignificant size. The motion of a transicle of vass n at the chronation t is governed by Newton’s Second Law for time-space, R = nb or, more precisely,

R(t; t′) = h′           (1.1)

where R is the release which, in general, can depend on both the chronation t as well as the lenticity t′, and h = nt′ is the fulmentum. Both R and h are 3-vectors which we denote by the bold font. A prime indicates differentiation with respect to stance x. Equation (1.1) reduces to R = nb if n′ = 0. But if n = n(x), then the form with h′ is correct.

General theorems governing differential equations guarantee that if we are given t and t′ at an initial stance x = x₀, we can integrate equation (1.1) to determine t(x) for all x (as long as R remains finite). This is the goal of classical dynamics.

Read more →

This is an update and expansion of the post here.

Here is a derivation of the space-time equations of motion, in which acceleration is constant. Let time = t, location = x, initial location = x(t₀) = x₀, velocity = v, initial velocity = v(t₀) = v₀, speed = v = |v|, and acceleration = a.

First equation of motion

v = ∫ a dt = v₀ + at

Second equation of motion

x = ∫ (v₀ + at) dt = x₀ + v₀t + ½at²

Third equation of motion

From v² = v ∙ v = (v₀ + at) ∙ (v₀ + at) = v₀² + 2t(a ∙ v₀) + a²t², and

(2a) ∙ (x ‒ x₀) = (2a) ∙ (v₀t + ½at²) = 2t(a ∙ v₀) + a²t² = v² ‒ v₀², it follows that

v² = v₀² + 2(a ∙ (x ‒ x₀)), or

v² − v₀² = 2a ∙ x, with x₀ = 0.

Here is a derivation of the time-space equations of motion, in which retardation is constant. Let stance = x, time (chronation) = t, initial time = t(x₀) = t₀, lenticity = w, initial lenticity = w(x₀) = w₀, pace w = |w|, and retardation = b.

First equation of motion

w = ∫ b dx = w₀ + bx

Second equation of motion

t = ∫ (w₀ + bx) dx = t₀ + w₀x + ½bx²

Third equation of motion

From w² = w ∙ w = (w₀ + bx) ∙ (w₀ + bx) = w₀² + 2x(b ∙ w₀) + b²x², and

(2b) ∙ (t ‒ t₀) = (2b) ∙ (w₀x + ½bx²) = 2x(b ∙ w₀) + b²x² = w² ‒ w₀², it follows that

w² = w₀² + 2(b ∙ (t ‒ t₀)), or

w² − w₀² = 2b ∙ t, with t₀ = 0.

Read more →