The Background: The hands of a clock are in motion relative to the observer’s rest frame yet they display the present time of the rest frame. The motion of the clock hands is identified with the time of the rest frame.

The speed of a body is its distance traversed per unit of time. The inverse of speed is called pace, which is the time of travel per unit of length. The vector version of speed is the displacement of a body per unit of time (velocity), but what is the vector version of pace? Call it lenticity, which would seem to be a kind of displacement in time per unit of length, but that implies there are three dimensions of time. The rest of this article defines time and shows that it has three dimensions, although two of its dimensions are usually latent.

The term time has many different meanings, but it is unavoidable because of the lack of alternatives. The main thing to remember is that time in physics is duration, Δt, an interval or length of time (cf. Newton). Let us call this the distime because it is analogous to distance in space. Since time is homogeneous, in physics it makes no difference what the particular date and time are. It’s the same with space: only the length, Δx, a distance, an interval or length of space that matters, not the particular coordinates.

The Theory: An observer is a device or person capable of making measurements relative to a frame of reference. An inertial observer is an observer in inertial motion, i.e., one that is not accelerated with respect to an inertial system. An observer here shall mean an inertial observer. An inertial frame is one that is not accelerating. A frame of reference here shall mean an inertial frame.

An observer P measures space coordinates relative to a frame K at rest relative to P. Call frame K a space frame for P. Space (3D space) is the R³ geometry of places and lengths in a space frame. A place point is a point in 3D space. The space origin is a reference place point. The location vector of a place point is the 3D space vector to it from the space origin. The coordinates of place points are called locations relative to the frame K of observer P and are measured in terms of length of space. Let the space axes in K be designated as x₁, x₂, and x₃.

An observer P measures time coordinates relative to a frame L in uniform motion at a standard rate relative to P. Call frame L a time frame for P. Time (3D time) is the R³ geometry of times and durations in a time frame. A time point is a point in 3D time. The time origin is a reference time point. The chronation vector of a time point is the 3D time vector to it from the time origin. The coordinates of time points are called chronations relative to the frame L of observer P and are measured in terms of length of time (duration). Let the time axes of L be designated t₁, t₂, and t₃.

Every observer has a space frame and a time frame, which together form a complete frame of reference. Let the direction of motion of the time frame relative to the space frame be the x₁ axis, and let this axis be coincident with the t₁ axis. In general, the coordinates of a point in space and time will then be ((x₁, x₂, x₃); (t₁, t₂, t₃)).

Since uniform motion is one-dimensional, only one coordinate from either the space frame or time frame is required as the independent denominator for rates of motion. For rates of velocity, acceleration, etc., only one time coordinate is needed; the other two time coordinates are zero, so time (duration) is a scalar. For rates of lenticity, retardation, etc., only one space coordinate is needed; the other two space coordinates are zero, so space (stance) is a scalar.

If a time frame is moving at velocity v_c relative to its associated space frame, then the other time coordinates are zero: ((x₁, x₂, x₃); (t₁, 0, 0)). The time coordinate (t₁, 0, 0) may be expressed by a scalar; call it t. The result is the space coordinates (x₁, x₂, x₃) and a time scalar, t.

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The post continues the ones here, here, and here.

There are three dimensions of motion. The extent of motion in each dimension may be measured by either length or time (duration). There are three dimensions of length and three dimensions of time (duration) for a total of six dimensions.

But there is no six-dimensional metric. Why? Because a metric requires all dimensions to have the same units, which requires a ratio to convert one unit into the other unit. The denominator on a ratio is a one-dimensional quantity, which means either the length or time dimensions need to be reduced by two dimensions.

This ratio is a conversion factor that is either a speed, which multiplied by a time equals a length, or a pace, which multiplied by a length equals a time. In general a speed is the ratio Δdr²/|Δdt²| = Δdr²/(Δt₁² + Δt₂² + Δt₃²)^1/2, and a pace is the ratio Δdt²/|Δdr²| = Δdt²/(Δx² + Δy² + Δz²)^1/2. The denominator is a distance or distime, which is a linear measure of length or time (duration).

The conversion factors required are the speed of light in a vacuum, c, or its inverse, the pace of light in a vacuum, k. The resulting four-dimensional metric is either c²dt² − dx² − dy² − dz² (with time reduced to one dimension) or dt₁² − dt₂² − dt₃² − k²dr² (with space reduced to one dimension).

These metrics are often simplified by taking c = 1 and k = 1 so that symbolically they are the same. Their units are not the same, however.

Each metric may be further reduced by separating space and time, as in classical physics. Then the space metric is |Δdr²| = (Δx² + Δy² + Δz²)^1/2 and the time metric is |Δdt²| = (Δt₁² + Δt₂² + Δt₃²)^1/2. In the classical (3+1) of three space dimensions and one time dimension, time is replaced by its metric, and in the classical (1+3) of one space dimension and three time dimensions, space is replaced by its metric.