Time dilation and relativity paradox?

Question

I've come across a weird paradox that I can't answer, I will explain it via the following thought experiment:

There is a space-train and an observer 1 light year apart with synchronised clocks. The train travels to the observer at just below the speed of light. In the reference frame of the observer the train is subject to time dilation and length contraction. When it arrives its clock reads 1 second as its time was basically standing still and the observers clock reads one year. From the trains reference frame it sees the 'observer' travelling towards the train at near light speed, so the train should expect to read the observers clock as 1 second and the trains clock as a year as the train sees the observer to have undergone time dilation. So what do the clocks actually read and why? The only way I can imagine the paradox with relativity not occurring is if both clocks read the same otherwise you could tell what speed you were going?

Answer 1

This is not exactly the twin paradox, but it's close.

First, let's make the problem more precise. Let's assume the train is one light year away from a planet, traveling near light-speed, and at the very beginning of the journey, a person on the planet views the clocks as synchronized. Then a person on the train does not view the clocks as synchronized. This is the famous "relativity of simultaneity".

So here's what happens. At the start of the journey, someone on the planet thinks both clocks read 0 years. At the end of the journey, the person on the planet thinks the planet clock reads 1 year, the train clock reads 1 minute.

The person on the TRAIN, on the other hand, starts out thinking that their clock reads 0 years, but the planet clock is just a small fraction of a minute shy of 1 year. Then the person on the train makes the journey, and it takes one minute from their perspective, and even less time passed on the planet from their perspective, and they reach the planet and find that the planet clock reads 1 year, and the train clock reads 1 minute. So no paradox occurred!

You could also set up the problem so that the person on the train views the clocks as synchronized, and get a similar result.