I guarantee there is a better answer than this, and I admit I don't quite understand @GeorgScholly's answer, but maybe the function you're looking for is a polynomial, which can be obtained via interpolation.

For example, say your vector **X** has two integers, **x**_{0}, **x**_{1}, and so your output vector **Y** must have two integers, **y**_{0}, **y**_{1}. There is a line **y=ax+b** that fits any two points **(x**_{0}, y_{0}) and **(x**_{1}, y_{1}).

In general, **n** points, **(x**_{0}, y_{0}) ... (x_{n-1}, y_{n-1}), can always be *perfectly fit* by a polynomial of degree **n-1**, *i.e.* a function, **y = a**_{n-1}x^{n-1} + a_{n-2}x^{n-2} + ... + a_{2}x^{2} + a_{1}x + a_{0}.

These coefficients, **a**_{n-1} ... a_{0}, can be found by many methods of "polynomial interpolation." Effectively, the coefficients in vector form would define your function, **F(x)**.

Finally, to incorporate a parameter **t**, you might simply add am "unnecessary" term, *i.e.* match two points with a parabola (not a line), match three points with a cubic (not a parabola), etc., in order to have an additional **a**_{n} to use as a fixed point, **t**.

I'll be very surprised if there isn't a much simpler way (if @GoergScholly's answer isn't already one).