Proper Time LL 2 Section 3. An inertial frame with some clocks moving in arbitrary manner. X Y v(t) Our frame, our clock.

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Presentation transcript:

Proper Time LL 2 Section 3

An inertial frame with some clocks moving in arbitrary manner. X Y v(t) Our frame, our clock.

At each different moment, their motion can be considered uniform. At each moment, we can rigidly link a coordinate system with the clocks to make a set of inertial reference systems X Y v, dr Y’ K K’ X’ t t’

During dt on our clock in K, moving clock travels a distance dr = Sqrt[dx 2 +dy 2 +dz 2 ] What time interval dt’ is indicated for this period on the moving clock? dt’ = dt dt’ > dt dt’ < dt 1 2 3

In the K’ system linked to a moving clock, dx’ = dy’ = dz’ = 0. Invariance of intervals ds 2 = ds’ 2 c 2 dt 2 - dx 2 - dy 2 - dz 2 = c 2 dt’ 2 - 0

What time interval dt’ is indicated for this period on the moving clock? dt’ = dt dt’ > dt dt’ < dt

Finite time intervals

The time on a clock moving with an object is the “proper time” for that object. t 2 ’ - t 1 ’ = proper time between two events for an object at rest in K’, as measured on moving clock = the time between the same two events measured in the rest system K

Moving object’s proper time is always less than the corresponding time in the rest system. Moving clocks go more slowly Time interval observed in rest system is dilated relative to proper time. These conclusions do not assume uniform rectilinear motion of moving clocks. They do assume rest frame is inertial.

For uniform rectilinear motion of clock in K’ relative to K, both frames are inertial? From point of view of observer in K, K’ clock lags. From point of view of observer in K’, K clock lags. Contradiction? NO X Y Y’ K K’ X’ t t’ V

To compare clock rates in two reference systems, we need several clocks in one frame, but only one clock in the other frame. Process is not symmetric Clock that appears to lag is always the one being compared to the many. Because time is not absolute, the many clocks are not synchronized. X Y Y’ K K’ X’ t t’ V

Consider a clock that describes a closed path Moving clock appears to lag relative to clock in K Converse reasoning is now impossible, because clock in closed trajectory is not in uniform rectilinear motion, so its reference system is not inertial. Argument that leads to result that clocks at rest lags from point of view of moving clock is not valid, since laws of physics are different in two frames. X Y Y’ K K’ X’ t t’

Consider two events for an object stationary in the K system. = the time interval read on the clock in K Integral is over the world line of the clock

Clock at rest follows a straight world line parallel to the t axis. x t b a For the clock at rest in K For the clock following the closed trajectory

curve straight Thus interval between given world points (a,b) always has its maximum value if the connecting world line is straight. Consequence of 4-space being non-Euclidean. (For Euclidean 3-space minimum distance between two pointes is for straight line.)