Theoretical foundations of calculus: limits, convergence of sequences, construction of the real numbers, least upper bound property, and related analysis topics such as continuity, differentiation, and integration through the fundamental theorem of calculus.

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Typical Inequalities for real numbers

If a,b,c and d are real numbers, then (a) $\bigg(\frac{5a}{12}+\frac{b}{3}+\frac{c}{6}+\frac{d}{12}\bigg)^2 \leq \frac{5a^2}{12}+\frac{b^2}{3}+\frac{c^2}{6}+\frac{d^2}{12}$ (b) $a+b+c=2$ with ...
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1answer
16 views

Proof by basic principles of Riemann Integration

Let $f:[a,b] \rightarrow \mathbb R$ be Riemann Integrable on $[a,b]$ and $f(x)\ge0$ for all $x\in[a,b]$. Show that $$\int_a^b f(x)dx\ge0$$ using basic principles of Riemann Integration. I'm new to ...
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Related to limit superior of a sequence if sequence doesn't converge

Suppose that I have a sequence $(a_n)$,and I am interested in finding the $\lim_{n\to \infty}$sup$(a_n)$.So I have the following definition of limsup of a sequence: $c_n$ ...
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1answer
12 views

find a open cover for R that has no lebesgue number.

Q. find a open cover for R that has no lebesgue number. my doubt: well i am still strugling with this question. i recall that for a compact subset of metric space, every open cover has a lebesgue ...
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1answer
19 views

Simple Question about Derivative property

Suppose $f:[-1,1] \to \mathbb{R}$ is twice differentiable and $f(-1) = f(1) = 0$ and $f(0) = 1$. Prove that there exists $x_0 \in (-1,1)$ with $f''(x_0) = -2$. I tried establishing this with ...
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1answer
21 views

set of orthogonal matrices is compact

Q.let the set of all nxn matrices (denoted by $M_n(R)$ ) is a metric space. Show that set of all orthogonal matrices is compact. my attempt: well i am beginner in real analysis. compact means every ...
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2answers
45 views

A+B is closed if one of them is compact

Q.show that if A and B are closed subsets of $R^n$ and one of them is compact then A+B is closed. my doubt: A+B is not necessarily closed given A and B are closed. i need hints to start this question ...
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given A is open and B subsets.to show A+B open

Q. i.prove that if A is open and B is arbitrary subset of $R^n$ then A+B ={x+y : $x\in A$, y $\in B$ } is open. ii.show that if A and B are closed subsets of R then A+B need not be closed. my ...
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33 views

Fast formula for gamma function [duplicate]

I am trying to find an efficient way of evaluating the gamma function gamma(t) where t is a complex number. The Wolfram Mathworld page http://mathworld.wolfram.com/GammaFunction.html gives a number ...
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3answers
35 views

Help with proof of theorem 1-10 spivak calculus on manifolds

Theorem 1-10 The bounded function (mapping to $\mathbb{R}$), $f$ is continuous at $a$ if and only if the oscillation of a point of $f$ at $a$ is $0$ The definition spivak provides of oscillation ...
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32 views

Showing that there exists a function with a certain property.

I want to prove the following: $\forall \epsilon > 0: \exists \text{ function }f:\mathbf{R}_{> 0} \rightarrow \mathbf{R}_{> 0}: \forall a,b\in \mathbf{R}_{>0}: a < b: \epsilon \cdot ...
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1answer
50 views

Important difference between “claim” and “assume” in proofs.

I was discussing with a TA friend, one of the HW problems was Find $\lim_{n\rightarrow \infty} \frac{1}{n}$. Before doing the "$\epsilon, N$" definition proof, the students wrote We claim ...
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2answers
69 views

Constante of Euler-Mascheroni

I know that $$\gamma =\lim_{n\to\infty }\left(\sum_{k=1}^n\frac{1}{k}-\ln(n)\right)$$ I have to show that $$\gamma ...
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0answers
36 views

Two different definitions of General Measurable Function

I've noticed two different kinds of definitions for a Measurable Function. In Folland's Real Analysis Modern Techniques: If $(X, \mathcal {M})$ and $(Y, \mathcal {N})$ are measurable spaces, a ...
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1answer
86 views

Show that there is such a number as $\sqrt{1+\sqrt2}$. [on hold]

How do I show such a thing? This question is from a chapter on the archimedean postulate, but I can't seem to make the connection, or with any of the previous material for that matter.
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1answer
20 views

How does this follow from the Baire category theorem?

The book says that statement 2 is a direct consequence of statement 1. I don't see how they prove statement 2 directly from statement 1, can you please help me? Statement 1: A complete metric ...
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1answer
25 views

homeomorphism of a Banach space, constructed using a contraction

Let $X$ be a Banach space and $g: X \to X$ a contraction, meaning that for all $x, y \in X$, we have that $$||g(x) - g(y)|| ≤ L ||x - y||$$ for a constant $0 ≤ L < 1$. Now, consider the function ...
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3answers
31 views

Convergent Series and Proofs

I am trying to get some clarity as to what exactly this is asking me? Is this series convergent or divergent and prove: $$s_n=\begin{cases} \frac{1}{n} & n\,\text{odd} \\ 0 & n\,\text{even} ...
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1answer
45 views

Is every differentiable function on $(0,1)$ uniformly continuous $?$

$$f:(0,1)\rightarrow [0,1]$$ is a differentiable function . Is it uniformly continuous then $?$ Now $f$ being differentiable on $(0,1)$ is continuous , that is easy. Now I could ...
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2answers
65 views

Baby Rudin Exercise 2.24

I have some difficulties solving the following exercise (Baby Rudin 2.24) Let $ X $ be a metric space in which every infinite subset has a limit point. Prove that $ X $ is separable. In order to ...
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4answers
32 views

Sum of two harmonic alternating series

I'm trying to solve the series $\sum_{n=1}^\infty (-1)^{n+1}\frac{2n+1}{n(n+1)}$ I've simplified it to the form $\sum_{n=1}^\infty (-1)^{n+1}\frac{1}{n+1} + \sum_{n=1}^\infty (-1)^{n+1}\frac{1}{n}$ ...
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70 views

The sequence $x_{n+1}=ax_{n}+b $ converges to where?

$$a,b \in \mathbb R , \ 0\lt a\lt 1 . $$ Define the sequence $$x_{n+1}=ax_{n}+b \text{ for } n\ge0\ .$$ Then for a given $\ \ x_0\ \ $ , does this sequence converge? And if it does, to ...
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1answer
22 views

Existence of the partial derivatives ${\delta^{2}f}\over {\delta x \delta y}$ and ${\delta f}\over {\delta x}$

The question is can the partial double derivative ${\delta^{2}f}\over {\delta x \delta y}$ exist without the derivative ${\delta f}\over {\delta x}$ existing? I don't know , I am ...
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0answers
33 views

Does Every Periodic Function Have An Associated Differential Equation?

My question is the opposite to proving the existence of periodic solutions to ODE's. Assume that $\ f(z)$ is a periodic function over the $\mathbb{R}$ , or doubly periodic over some lattice $\Lambda$ ...
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1answer
25 views

Measurable sets

Show the following. E is measurable $\Longleftrightarrow$ For any $\epsilon > 0$, there exists a closed set $F \subset E$ such that $m^*(E) - m^*(F) < \epsilon$ Here is my attempt: $"\leq"$ ...
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111 views

Calculating in closed form $\int_0^{\pi/2} \arctan\left(\sin ^3(x)\right) \, dx \ ?$

It's not hard to see that for powers like $1,2$, we have a nice closed form. What can be said about the cubic version, that is $$\int_0^{\pi/2} \arctan\left(\sin ^3(x)\right) \, dx \ ?$$ What are ...
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1answer
36 views

Is the metric ${d(x,y)}\over {1+d(x,y)}$ complete where $d$ is the usual Euclidean metric on $\mathbb R^{2}$

Let $d(x,y)$ be the usual Euclidean metric on $\mathbb R^{2}.$ $\mathbb R^{2}$ is complete under $d(x,y)$. I have this subspace given $$[0,1]\times [0,\infty )\ \ of\ \ \mathbb ...
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Every $f\in\omega^\omega$ is bounded by the “increasing enumeration” of the intersection of a countable dense set and a dense open set in $\mathbb{R}$

I am studying the theorem 2.2.6 of "On the structure of the real line" of book Bartosznky-Judah. In the proof of theorem 2.2.6 the part $(4) \to (5)$ $(4)$ for every family of dense open subsets ...
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11 views

To show that $L(f) = \sup \{L(P;f) : P \in P^*\}$.

Let $a>0$ and let $J = [-a , a]$. Let $f: J \to \Bbb R$ be bounded and $P^*$ be the set of all partitions $P$ of J that contain $0$ and are symmetric. Show that $L(f) = \sup \{L(P;f) : P \in ...
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3answers
61 views

Proving a function is bounded

Here's my question, and a suggestion for a solution. Please let me know if I'm wrong. Prove that the function $$f(x)=\frac{\ln(x+1)}{x}$$ is bounded in $(0,\infty)$ Solution: Using L'Hospital ...
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1answer
19 views

If $X \geq X_t$ why is $\frac{X}{(1+|X|)} \geq \frac{X_t}{(1+|X_t|)}$? So a monotone, 1-1 transformation doesn't affect the inequality?

I am wondering why if $X=\sup_t \{ X_t \} $ for $t \in T$ which is some index set, we have that $\frac{X}{1+|X|} \geq \frac{X_t}{1+|X_t|}$. Clearly, $ \ast X \geq X_t \forall t$. My beginning is to ...
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0answers
18 views

Rayleigh quotient strictly increases

Consider the Rayleigh quotient $$\lambda_{L} := \max_{u \in H^{1}_{0}([0, L])}\frac{-\int_{0}^{L}u'^{2}\, dx}{\int_{0}^{L}u^{2}\, dx}.$$ Is $\lambda_{L}$ strictly increasing in $L$? Fix an $L_{1}, ...
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22 views

Uniform convergence of Lipschitz functions to characteristic function of a compact set

Consider $(X,d)$ a metric space and $K \subseteq X$ a compact subset. I am trying to build a sequence of Lipschitz functions $f_n : X \to \mathbb R$ s.t. $f_n \to \chi_K$ uniformly. If we try to ...
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0answers
25 views

Is there any solution manual to Halmos' Measure Theory?

I've spent some time on Halmos' Measure Theory and must upvote such a good book. I want to solve most exercises in this book. I'm not sure whether there is a solution manual or instructor manual that ...
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1answer
23 views

Does measure imply the existence of limit function?

I am reading a book and I don't quite understand some of the statements. It says "$\{u_n\}$ is a Cauchy sequence in the space $L^2(\mathbb{R}^d;|\xi|^{2s}d\xi)$. Because $|\xi|^{2s}d\xi$ is a measure ...
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1answer
11 views

Limit of sequence partially applied to a function

Let $(a_n)_{n\in\mathbb N}$, $(b_n)_{n\in\mathbb N}$, $(c_n)_{n\in\mathbb N}$ and $(d_n)_{n\in\mathbb N}$ be real-valued sequences and $f:\mathbb R\to \mathbb R$ monotone with ...
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1answer
18 views

Boundedness of smooth functions approximating an Lp function

We all know that the space of smooth functions on Euclidean space with compact support is dense in the Lp spaces, for p strictly less than infinity. Now my question is: suppose there is a function f ...
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1answer
21 views

Convergence of a Sequence Involving arctan - Is my solution correct?

Here's my question: Let $(a_{n})$ be a sequence where $(a_{1}) > 0$, defined as: $$(a_{n+1})=\arctan*(a_{n})$$ for all $n$. Prove that $a_{n}$ has a limit $L$ and calculate it. Solution: ...
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1answer
71 views

An elementary proof for a bound on $x \log x$

During one of our information theory classes, the Professor used the following bound to prove a result. For any $x,y \in (0,1)$, $x \neq y$, show that $$|x \log(x) - y \log(y) | \leq |x-y|\log ...
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38 views

Finding the intervals where $f(x)=\frac{1}{|x-2|}-x$ is monotonous

Given $$f(x)=\frac{1}{|x-2|}-x.$$ I am interested in finding the intervals in $\mathbb{R}$ in which the function is monotonically increasing or decreasing. Usually I would take $f'(x)>0$ for the ...
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1answer
32 views

Problem 20 chapter 3 from baby Rudin

Suppose $\{p_n\}$ is a Cauchy sequence in a metric space $X$, and some subseqeunce $\{p_{n_i}\}$ converges to a point $p\in X$. Prove that the full sequence $\{p_n\}$ converges to $p$. Proof: ...
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1answer
61 views

Will the Lebesgue integral of a real valued function always be a Riemann sum?

If we have a real valued integral that is Lebesgue integrable but not Riemann integrable, can the value of the Lebesgue integral be given by a Riemann sum by choosing appropriate points in the ...
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2answers
40 views

$\{a_n\} \to a$ iff $\limsup_{n \to \infty} \{a_n\} = \liminf_{n \to \infty} \{a_n\}$

It is clear that if $$\limsup_{n \to \infty} \{a_n\} = \liminf_{\to \infty} \{a_n\},$$ then $\{a_n\} \to a$, since we can just squeeze the terms in the middle. I understand that to prove the ...
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75 views

Why are definitions written as 'if-then' statements instead of 'if-and-only-if' [duplicate]

An example from Rudin would be: (c) if $x + y = 0$ then $y = -x$. There may be times when one would have to use the fact that since $y = -x, x + y = 0$. While this is fairly intuitive, professors ...
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1answer
38 views

Confusion about Partial Derivative for a Function of One Variable

This question actually came up as I was reading an example in my differential equations book (Boyce & Diprima): Solve: $2x+y^2+2xyy'=0$ Define $\psi(x,y)=x^2+xy^2$ Then ...
6
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1answer
59 views

A Vitali set is non-measurable, direct proof, without using countable additivity

I am teaching a measure theory class, where we are in the process of constructing Lebesgue measure on $\mathbb{R}$ via the usual Caratheodory outer measure construction. As motivation, we began by ...
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1answer
48 views

Proving $x_ky_k\to ab $

Prove that the sequence $x_ky_k\to ab $ if $x_k\to a$ and $y_k\to b$. I wanted to try and do this with the epsilon definition but i am having a few technical issues. Proof: $$ |x_ky_k - ab| = |x_k ...
3
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1answer
35 views

Making sense of $ f(y) - f(x) = \int_{\tau = 0}^{1} \langle \nabla f( x+ \tau (y - x)), y - x \rangle d \tau $

I was wondering if anyone has a good explanation why this holds. I came across this in the page 17 of this paper (equations at the end of the page): $$ f(y) - f(x) = \int_{\tau = 0}^{1} \langle ...
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1answer
25 views

Is the closure of a bounded open set in $\mathbb{R}^n$ locally convex about the boundary?

The question is basically in the title. I think it is true, but I'm not sure. Can someone verify whether this is in fact true. Thanks.
2
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2answers
47 views

Exercise: signed measures, total variation.

I have this exercise: Let $\nu_1$ and $\nu_2$ be finite signed measures on $(\Omega,\mathcal{A})$. Prove that: $|\nu_1+\nu_2|\le|\nu_1|+|\nu_2|$; , that is ...