Consider the möbius function given by A = [[a b] [c d]], all 4 parameters real. If det A= then it is constant.

Otherwise, it has a pole at x=-d/c (which you can treat as going to infinity, and even in a rigourous manner). Other than that, is it increasing or decreasing?

Take the derivative of the function to find out. It turns out that it's det A/(cx+d)2. The denominator is always positive, so all that matters is the sign of the determinant of A! If it is positive the function is increasing; if it is negative, it is decreasing.

In any case it is one to one (assuming we deal with infinity and the pole in a proper fashion). Of course, since we can easily calculate the inverse function (it's also a möbius function, in case you hadn't guessed), this point is moot.

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