The statement "A one to one function f: ℝ→ℝ is monotone" is false. A counterexample is provided with the function f(x) defined as f(x) = x for rational x and f(x) = -x for irrational x, demonstrating that the function is injective but not monotone due to its discontinuous nature. Additionally, the discussion highlights that while a function can be monotone on dense subsets, it may not be overall continuous or monotone across its entire domain of ℝ.
PREREQUISITESMathematics students, educators, and anyone studying real analysis or exploring the properties of functions, particularly in the context of monotonicity and injectivity.
Let f(x)=x, x is rational, f(x)=-x,x is irrational, the function is one to one,but it is jumping. Does this example apply?andrewkirk said:You have not defined the value of f(x) outside of I, so the example does not meet the requirements of the question, which include that the domain be all of ##\mathbb{R}##.
I think the statement is false, but a little more work is needed to produce a counterexample.
Since both are dense, it's just a big X. And it leads to interesting philosophical questions: what one draws is always discrete for you put carbon atoms on the paper. (I apologize, if that remark should be regarded as improper.)andrewkirk said:(albeit harder to visualize).
Of course you could have f(x) = x outside of the interval (-1, 1) and f(x) = -x on the interval (-1, 1) .HaLAA said:Let f(x)=x, x is rational, f(x)=-x,x is irrational, the function is one to one,but it is jumping. Does this example apply?