Problem Set - Continuous functions

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

and

Department of Mathematics
University of Wisconsin, Madison
Madison, WI 53706 USA
ram@math.wisc.edu

Last updates: 7 December 2009

Continuous functions

	Let $f : ℝ \to ℝ$ be such that $f$ is continuous at $x = 0$ and if $x, y \in ℝ$ then $f (x + y) = f (x) f (y)$ . Show that if $a \in ℝ$ then $f$ is continuous at $x = a$ .
	Let $f : ℝ_{> 0} \to ℝ$ be such that $f$ is continuous at $x = 1$ and if $x, y \in ℝ_{> 0}$ then $f (x y) = f (x) + f (y)$ . Show that if $a \in ℝ_{> 0}$ then $f$ is continuous at $x = a$ .
	Let $I$ be an interval in $ℝ$ . Let $f : I \to ℝ$ be continous. Show that the function $\| f \| : I \to ℝ$ given by $\| f \| (x) = \| f (x) \|$ is continuous.
	Let $I$ be an interval in $ℝ$ and let $f : I \to ℝ$ and $g : I \to ℝ$ be continous. Show that the function $\max (f, g) : I \to ℝ$ given by $\max (f, g) (x) = \max (f (x), g (x))$ is continuous.
	(Thomae's function) Let $f : [0, 1] \to ℝ$ be given by $f (x) = {\begin{matrix} \frac{1}{n}, & if \frac{m}{n} \in ℚ is reduced, \\ 0, & if x \notin ℚ . \end{matrix}$ Show that (a) If $a \notin ℚ$ then $f$ is continuous at $x = a$ , and (b) If $a \in ℚ$ then $f$ is not continuous at $x = a$ .
	Let $I$ be an interval in $ℝ$ and let $f : I \to ℝ$ and $g : I \to ℝ$ be continous. Show that the function $\min (f, g) : I \to ℝ$ given by $\min (f, g) (x) = \min (f (x), g (x))$ is continuous.
	Let $a \in ℝ$ and let $f : ℝ \to ℝ$ be given by $f (x) = {\begin{matrix} a x, & if x \leq 0, \\ \sqrt{x}, & if x > 0 . \end{matrix}$ Show that $f$ is continuous.
	Is the function $f : ℝ \to ℝ$ given by $f (x) = x$ uniformly continuous?
	Is the function $f : (0, 1) \to ℝ$ given by $f (x) = \frac{1}{x}$ uniformly continuous?
	Is the function $f : (10^{-4}, 1) \to ℝ$ given by $f (x) = \frac{1}{x}$ uniformly continuous?
	Is the function $f : (0, 1) \to ℝ$ given by $f (x) = x^{2}$ uniformly continuous?
	Is the function $f : [-1, 1] \to ℝ$ given by $f (x) = \sqrt{1 - x^{2}}$ uniformly continuous?
	Is the function $f : (1, \infty) \to ℝ$ given by $f (x) = \log x$ uniformly continuous?
	Is the function $f : (0, \infty) \to ℝ$ given by $f (x) = \log x$ uniformly continuous?
	Let $f : ℝ \to ℝ$ be the function given by $f (x) = \frac{x}{(1 + \| x \|)}$ . Show that (a) $f$ is continuous, (b) $f$ is uniformly continuous, (c) $\sup (f (ℝ)) = 1$ , (d) There does not exist $x \in ℝ$ such that $f (x)) = 1$ , (e) $\inf (f (ℝ)) = -1$ , (d) There does not exist $y \in ℝ$ such that $f (y)) = -1$ .
	Show that the function $f : ℝ \to ℝ$ given by $f (x) = x^{3} - 6 x + 3$ has exactly 3 roots.
	Let $I$ be an interval in $ℝ$ and let $f : I \to ℝ$ be a continuous function. Prove that $f (I)$ is an interval.
	Let $I$ and $J$ be intervals in $ℝ$ and let $f : I \to J$ be a surjective strictly monotonic continuous function. Prove that the inverse function $g : J \to I$ exists and is strictly monotonic and continuous.

References [PLACEHOLDER]

[BG] A. Braverman and D. Gaitsgory, Crystals via the affine Grassmanian, Duke Math. J. 107 no. 3, (2001), 561-575; arXiv:math/9909077v2, MR1828302 (2002e:20083)