Questions tagged [nonstandard-analysis]
Non-standard ordered fields are fields which have infinitesimals, that is, positive numbers which are smaller than any positive *real* number. Non-standard analysis is analysis done over such fields (e.g. hyperreal fields). Please specify the exact framework for non-standard analysis you are using in your question (e.g., what definition of "hyperreal number" you are using).
494
questions
2
votes
0
answers
25
views
Is there an external reflection principle in IST?
Background
The reflection principle is a theorem schema in ZF.
Given a formula $ φ $ and a set $ M $ we obtain $ φ $ relativized to $ M $ by restricting all quantifiers of $ φ $ to range over $ M $. ...
1
vote
0
answers
33
views
Does this basic property of hyperreal function hold?
Let $x=(a_1, a_2, a_3, ...) + \mathcal U \in {}^\ast \mathbb R := \displaystyle\prod_1^\infty \mathbb R/\mathcal U$ be a hyperreal number using the ultrapower construction and $f \colon \mathbb R\to \...
- 1,185
3
votes
1
answer
93
views
How to compare two hyperreals?
Potentially scattered question, this is the result of my trying and failing to understand the relevant wikipedia pages.
I know that every sequence of reals represents a hyperreal, but every hyperreal ...
2
votes
2
answers
72
views
A rigorous treatment of the hyperreal numbers and nonstandard analysis.
I tried finding a decent book to study nonstandard analysis from and found Goldblatt's Lectures on the Hyperreals. However, I was very disappointed to find out that the text is not rigorous at all --- ...
- 485
6
votes
1
answer
114
views
Largest subfields common to all hyperreal fields
Suppose we build the hyperreal numbers $^*\Bbb R$ in the usual way as an ultrapower of the reals, built as a quotient of $\omega$-length sequences of reals mod some non-principal ultrafilter. Then, in ...
- 7,302
2
votes
1
answer
146
views
Does any infinite set contain an element that is not uniquely definable?
Background/Motivation
My framework is first order logic and ZF.
A uniquely definable set is one uniquely satisfying a predicate, for instance, the empty set is uniquely defined by the unary predicate $...
2
votes
0
answers
43
views
How sensible is the limit from above against infinity in nonstandard analysis?
In nonstandard analysis, we have hyperreal numbers that are greater than any real number. As such, we can create a sequence of infinite, hyperfinite hyperreal numbers which grows ever smaller.
More ...
- 3,216
4
votes
0
answers
104
views
Nonstandard Complex Analysis?
I recently discovered Nonstandard Analysis and am slowly working my way through Kelsier's textbook and Foundations companion. However while I have found plenty of stuff about real nonstandard ...
1
vote
1
answer
62
views
How to find infinitesimally small segments for graph $y = x^2$?
I read on Wiki:
Intuitively, smooth infinitesimal analysis can be interpreted as
describing a world in which lines are made out of infinitesimally
small segments, not out of points.
I tried to find ...
- 139
2
votes
1
answer
38
views
Uniqueness of standardization
So I'm reading Kanovei's and Reeken's book "Nonstandard Analysis, Axiomatically" and there is something which I'm not quite understanding.
So, in page 15, it is stated that a "...
- 568
1
vote
1
answer
80
views
How to prove that 2 points $\varepsilon$ and 2$\varepsilon$ are indistinguishable not only in sole case? (Smooth infinitesimal analysis)
There are 2 points on the Real line: $A$ and $2A$. They are indistinguishable in sole case - if $A$ is $0$.
But how to prove that $\varepsilon$ and 2$\varepsilon$ are indistinguishable not only in ...
- 139
2
votes
1
answer
143
views
Discontinuous function in Smooth infinitesimal analysis
I read that there isn't discontinuous functions in Smooth infinitesimal analysis. But I tried to define discontinuous function ($\varepsilon$ is infinitesimal):
$f(x) =
\begin{cases}
1, & \text{...
- 139
4
votes
0
answers
82
views
Nonstandard analysis and hyperreals
Hyperreal numbers and nonstandard analysis are intimately connected. First, the nonstandard analysis consists of an extension of the axioms for the real numbers, which introduces a new predicate $\...
- 656
0
votes
0
answers
92
views
Proposal for the number next to $0$ [duplicate]
What if we define the number next to $0$ on the real number line to be special like $0$, but not quite $0$. Is there some work done in this direction? Can someone point me towards it because I am ...
0
votes
1
answer
47
views
standard part definition of the derivative
In high school my teacher told us : $$f'(a)= \lim_{h\to 0} \frac{f(a+h)-f(a)}{h} \tag{1}$$
For a long time I've been thinking that it was an alternative version of the other definition ($\lim_{x\to a}...
- 826
0
votes
1
answer
44
views
Arguments illustrating advantage of hyperreal definition over sequential one
As is well known, fields of hyperreals $\mathbb R^*$ can be formed by
an ultrapower construction, as quotients of the space of sequences of
real numbers by a nonprincipal ultrafilter. In fact, some ...
- 36.7k
3
votes
2
answers
128
views
Nonstandard characterization of compactness
I'm trying to write up notes for myself on nonstandard analysis, consulting outside resources as little as possible. I have stumbled upon what seems to be referred to as Robinson's characterization of ...
1
vote
0
answers
62
views
Why isn't Riemann sum infinitesimal in nonstandard analysis?
I am trying to learn nonstandard analysis from Keisler's book. In the integration chapter it feels like the use of the Transfer Principle is some kind of magic that just requires us to believe results ...
- 2,560
0
votes
0
answers
31
views
Characterizing the set of first-order definable real functions
I am trying to characterize the set of first-order definable functions $f: \Bbb R \to \Bbb R$ and see what properties they have.
It is immediately clear that these functions are not all analytic ...
- 7,302
8
votes
1
answer
99
views
What do you get if you perform the Dedekind Cuts procedure on $\mathbb Q(x)$?
Let $\mathbb Q(x)$ denote, as usual, the field of rational functions with rational coefficients. Any element of $\mathbb Q(x)$ can be written in the form
$$f=\frac{a_n x^n + \cdots +a_0}{b_m x^m + \...
- 22.9k
8
votes
1
answer
130
views
How can infinite sums be defined for a non-complete hyperreal field?
The definition of integration in non-standard analysis is $$\int_a^b f(x)dx:= st\left(\sum_a^b f(x)dx \right),$$ as given by Keisler (you could also use the transfer principle for internal functions). ...
- 1,099
1
vote
0
answers
33
views
Are there guaranteed conglomerate sized models for a given first-order theory?
In a comment under What is the “maximal hyperreal field”? a commenter put “for any first-order theory 𝑇
with infinite models, one can prove the following in NBG set theory with the axiom of global ...
- 1,099
3
votes
0
answers
24
views
How to use non-standard analysis to prove Baire Category Theorem?
I'm caring about some questions of non-standard analysis. I have found the only book talking about Baire Category Theorem, which is the book of Siu-Ah Ng. But I think the proof in this book is not ...
- 31
4
votes
0
answers
69
views
Noetherian Rings in Nonstandard Framework
I have been trying to go through some algebraic geometry using the nonstandard framework. Noetherian rings are of course fundamental in this subject and it is characterized by the attribute that every ...
- 488
1
vote
1
answer
87
views
Equivalence of the nonstandard analysis integral and the Riemann integral
I have a question about the definition of the integral in nonstandard analysis. The definition that I've usually seen is this: given a function $f(x)$ that you want to integrate from $a$ to $b$, you ...
- 131
1
vote
1
answer
119
views
Is this a valid integral to prove area of circle?
Similar to the original poster of this question Is this a valid proof for the area of a circle?, I am a high school AP Calc BC student using the idea of Riemann sums to add an infinite number of ...
- 35
2
votes
0
answers
42
views
Does non-standard analysis lead to different PDEs from those obtained through standard analysis?
Take the Navier-Stokes equations as an example. If we take a non-standard analysis approach, will the final form of the PDEs be different from what presented in classical books on fluid dynamics?
- 131
0
votes
0
answers
34
views
Distribution that is 0 everywhere but sums up to unity?
For instance say I have random variable $X \sim \mathcal{N(\mu,\sigma)}$ Now the $\lim\limits_{\sigma \to \infty} f_{X} = 0$, so unfortunaltly it's not a pdf. However infinitesimally smaller values ...
- 129
4
votes
0
answers
97
views
What is the “maximal hyperreal field”?
In many SE posts and the Wikipedia article on the surreal numbers I’ve seen references to a “maximal” hyperreal field that’s isomorphic to the surreals. If they’re isomorphic, then why is it that ...
- 1,099
5
votes
1
answer
113
views
How can a field be Cauchy complete and non Archimedean
The Wikipedia page for the completeness of the Real numbers, says that “ there are non Archimedean fields that are ordered and Cauchy complete.” However, in many other places, I’ve read that non ...
- 1,099
0
votes
0
answers
33
views
Cardinality of the set of internal sets
Non standard analysis relies on using sets that have the same properties as sets of real numbers to transfer many good theorems over. Every set $S\in P(\Bbb R)$ has a unique extension $S^* \in P(\Bbb ...
- 1,099
4
votes
1
answer
106
views
Nonstandard algebraic geometry: Fundamental Theorem of Algebra
I have been trying to study the basics of algebraic geometry using nonstandard analysis and I can't wrap my head around this issue.
Let $^*\mathbb{C}$ be the extension of the complex numbers. Now ...
- 488
0
votes
0
answers
47
views
Arithmetic in a nonstandard model of Real numbers
A problem from Section 3.3 in "A Friendly Introduction to Mathematical Logic" (Christopher C. Leary, Lars Kristiansen; 2nd edition):
(a) In the structure $\mathfrak{A}$ that was built in ...
- 237
0
votes
1
answer
60
views
Repeated transfer principle for transfinite induction.
In set theory, one can use a non-principal ultra filter, $U_0$, to construct the hyperreal numbers. $\mathbb{R}^*$ is constructed as $\mathbb{R}^{\mathbb{N}}/U_0$. The transfer principal means that ...
- 1,099
0
votes
0
answers
38
views
Is $No^2$ or $(\mathbb{R}^*)^2$ rotation invariant?
The fields of the surreal and hyperreal numbers aren’t complete. I’ve noticed that $\mathbb{Q}^2$ isn’t rotationally complete as $(0,1)$ could be rotated to a point not in the rational plane (like $(1,...
- 1,099
0
votes
1
answer
65
views
Can the hyperreal numbers have a property akin to completeness by considering hypernatural sequences?
I’ve seen that $\mathbb{R}^*$ isn’t complete as many Cauchy sequences won’t converge, and that includes power series. In other stack exchange posts, I’ve seen that even the exponential function won’t ...
- 1,099
2
votes
2
answers
169
views
Can the hyper hyper real numbers be constructed?
The hyperreal numbers can be constructed as $\mathbb{R}^{\mathbb{N}}/U$ given some ultra filter and this allows first-order statements to be transferred over to $\mathbb{R}^*$. Can this be done again ...
- 1,099
1
vote
1
answer
92
views
Approach to construction hyperreal number with sequence
I read that hyperreal numbers can be constructed with sequences. For example, $\varepsilon = (1, 1/2, 1/3, ...)$ and $\varepsilon$ is infinitesimal.
But there is no smallest number (infinitesimally ...
- 139
0
votes
0
answers
59
views
Number of models of the naturals and reals with and without CH
The Wikipedia page on true arithmetic says that it has $2^\kappa$ models for each uncountable cardinal $\kappa$. This refers to the theory of all first-order statements of the naturals.
I'm curious ...
- 7,302
1
vote
0
answers
33
views
How is it possible that $dx$ contains $dx^2$ $N$ and $N+1$ times simultaneously?
Let's assume that $N$ is even infinite hyperinteger and $N=1/dx$, $N=dx/dx^2$.
Let's assume that we have expression $dx+dx^2$. We can add up $dx^2$ to $dx$ and $dx$ is obtained: $dx+dx^2=dx$ (...
- 139
1
vote
1
answer
374
views
In what sense is $\Bbb R(x)$ an "instantiation" of the hyperreals?
I'm teaching myself about hyperreal numbers. My main motivation for doing so is that they include infinite numbers, whose existence I hear disputed & doubted often as "quantifying the ...
- 42.5k
6
votes
0
answers
68
views
Transfinitely iterating the Puiseux, Levi-Civita, or Hahn series constructions
There are many ways to take some real-closed field and generate a proper extension of it with elements that are infinite and infinitesimal relative to the original field. One well-known example is ...
- 7,302
4
votes
1
answer
138
views
Why does this nonstandard model of Robinson Arithmetic fail to be a model of PA?
As talked about in this question, there is a nonstandard model of Robinson arithmetic of the form:
$z_0 + z_1\omega + z_2\omega^2 + z_3\omega^3 + ... + z_n\omega^n$
in which $\omega$ is a formal ...
- 7,302
2
votes
0
answers
63
views
Levi-Civita field vs Puiseux series: why is Cauchy completeness important?
The Levi-Civita field's main claim to fame is that it's the smallest real-closed field which is a proper extension of the reals and which is Cauchy-complete. That last bit is important, or else the ...
- 7,302
2
votes
2
answers
129
views
"Real-closed" vs "transfer principle"
The hyperreals are "real-closed," which means that any first-order statement that is true of the reals is true of the hyperreals. However, they also satisfy a "transfer principle," ...
- 7,302
0
votes
0
answers
68
views
Formula for probabilistically selecting a good server
There are $N$ nodes, each has response time $t_i$ (here and further I use $i$ as an index).
I want probabilistically choose a node with low response time; if there are several nodes with low response ...
- 4,913
4
votes
0
answers
490
views
How do we naturally extend the average from the Hausdorff Measure for functions with a domain without a gauge function?
Motivation: According to this question
Some sets have a Hausdorff Dimension $\alpha$ but have a
zero-dimensional Hausdorff Measure. These sets may have another
dimension function, i.e. a function $h:[...
user1027188
1
vote
1
answer
79
views
Nonstandard proof of Lebesgue Number Lemma
I am currently going through Munkres's Topology but trying to prove things with nonstandard methods. The one I am struggling with right now is the Lebesgue Number Lemma, not too sure if my proof is ...
- 488
3
votes
0
answers
76
views
How to derive the triple product rule with Nonstandard Analysis?
$\frac{\partial x}{\partial y} \cdot \frac{\partial y}{\partial z} \cdot \frac{\partial z}{\partial x} = -1$ according to the triple product rule
However, it would be 1, if derivatives behaved like ...
- 419
4
votes
1
answer
117
views
Are all Hyperreal Infinitesimals representable by Monotonically Decreasing Sequences to 0?
I know there are many possible theoretical ways to built *R, including axiomatic and set-theoretic approaches. I am limiting my attention specifically to the Superstructure approach, perhaps best ...
- 330