Sets, Infinity, and Mappings - University of Southern California
Sets, Infinity, and Mappings - University of Southern California

... the lecture on countably and uncountably infinite sets in the EE 503 probability class. The material is useful because probability theory is defined over abstract sets, probabilities are defined as measures on subsets, and random variables are defined by mappings from an abstract set to a real numbe ...
preprint - Open Science Framework
preprint - Open Science Framework

Completeness theorems and lambda
Completeness theorems and lambda

A Partially Truth Functional Approach to
A Partially Truth Functional Approach to

minimum models: reasoning and automation
minimum models: reasoning and automation

... large, and so it may not be practical to do such thing when a simple state description suffices. Another reason for not specifying negative observations is that applications of systems whose states are representable by facts usually involve the state description being changed dynamically due to the ...
A SURVEY OF NIELSEN PERIODIC POINT THEORY (FIXED n)
A SURVEY OF NIELSEN PERIODIC POINT THEORY (FIXED n)

... 1. Definitions, examples and properties. Since the definitions of the numbers N Φn (f ) and N Pn (f ) are not entirely straightforward we spend this section giving and motivating the definitions, giving examples and the elementary properties of these numbers. We indicate clearly, for example, why th ...
PDF
PDF

Barwise: Infinitary Logic and Admissible Sets
Barwise: Infinitary Logic and Admissible Sets

full text (.pdf)
full text (.pdf)

The Dedekind Reals in Abstract Stone Duality
The Dedekind Reals in Abstract Stone Duality

... We shall use a lot of ideas from interval analysis. However, instead of defining an interval [d, u] as the set {x ∈ R | d ≤ x ≤ u} or as a pair hd, ui of real numbers, as is usually done, we see it as a weaker form of Dedekind cut, defined in terms of the rationals. Real numbers (genuine cuts) are s ...
A THEOREM-PROVER FOR A DECIDABLE SUBSET OF DEFAULT
A THEOREM-PROVER FOR A DECIDABLE SUBSET OF DEFAULT

YABLO WITHOUT GODEL
YABLO WITHOUT GODEL

A Concise Introduction to Mathematical Logic
A Concise Introduction to Mathematical Logic

manembu - William Stein
manembu - William Stein

... Introduction. Continued fractions provide a unique method of expressing numbers or functions, different from the more commonly used forms introduced throughout grade school math classes and beyond. At first glance, continued fractions may seem like they are just a more complex way to say something s ...
The Science of Proof - University of Arizona Math
The Science of Proof - University of Arizona Math

... The thesis of this book is that there is a science of proof. Mathematics prides itself on making its assumptions explicit, but most mathematicians learn to construct proofs in an unsystematic way, by example. This is in spite of the known fact that there is an organized way of creating proofs using ...
CSE 20 - Lecture 14: Logic and Proof Techniques
CSE 20 - Lecture 14: Logic and Proof Techniques

An Abridged Report - Association for the Advancement of Artificial
An Abridged Report - Association for the Advancement of Artificial

Math 320 Course Notes Chapter 7
Math 320 Course Notes Chapter 7

Complexity of Recursive Normal Default Logic 1. Introduction
Complexity of Recursive Normal Default Logic 1. Introduction

... is a minimal condition to have a viable theory of belief revision in many applications. There are several such conditions in the published literature. Some of these will be used below. These include the notion of stratification [ABW88] and its generalization, local stratification [Prz88]. These cond ...
Equality in the Presence of Apartness: An Application of Structural
Equality in the Presence of Apartness: An Application of Structural

Carnap and Quine on the analytic-synthetic - Philsci
Carnap and Quine on the analytic-synthetic - Philsci

... used in favour of these frameworks. These pragmatic arguments for choosing particular linguistic frameworks have immediate repercussions for the analyticity of the non-factual statements in these frameworks. It will transpire that the class of statements Quine would accept as analytic is much more ...
Natural Numbers and Natural Cardinals as Abstract Objects
Natural Numbers and Natural Cardinals as Abstract Objects

An introduction to ampleness
An introduction to ampleness

The Development of Mathematical Logic from Russell to Tarski
The Development of Mathematical Logic from Russell to Tarski

On Countable Chains Having Decidable Monadic Theory.
On Countable Chains Having Decidable Monadic Theory.

... is not MSO definable in M , and such that the MSO theory of M  is recursive in the one of M . In this paper we prove that this property holds for every infinite countable chain, namely that no infinite countable chain is maximal with respect to MSO logic. The proof relies on the composition method dev ...

Set theory



Set theory is the branch of mathematical logic that studies sets, which informally are collections of objects. Although any type of object can be collected into a set, set theory is applied most often to objects that are relevant to mathematics. The language of set theory can be used in the definitions of nearly all mathematical objects.The modern study of set theory was initiated by Georg Cantor and Richard Dedekind in the 1870s. After the discovery of paradoxes in naive set theory, numerous axiom systems were proposed in the early twentieth century, of which the Zermelo–Fraenkel axioms, with the axiom of choice, are the best-known.Set theory is commonly employed as a foundational system for mathematics, particularly in the form of Zermelo–Fraenkel set theory with the axiom of choice. Beyond its foundational role, set theory is a branch of mathematics in its own right, with an active research community. Contemporary research into set theory includes a diverse collection of topics, ranging from the structure of the real number line to the study of the consistency of large cardinals.