scholarly journals The unreasonable effectiveness of Nonstandard Analysis

2020 ◽  
Vol 30 (1) ◽  
pp. 459-524
Author(s):  
Sam Sanders
Keyword(s):  
Big Five ◽  
Nonstandard Analysis ◽  
Reverse Mathematics ◽  
Unreasonable Effectiveness ◽  
Original Theorem

Abstract As suggested by the title, the aim of this paper is to uncover the vast computational content of classical Nonstandard Analysis. To this end, we formulate a template ${\mathfrak{C}\mathfrak{I}}$ which converts a theorem of ‘pure’ Nonstandard Analysis, i.e. formulated solely with the nonstandard definitions (of continuity, integration, differentiability, convergence, compactness, etc.), into the associated effective theorem. The latter constitutes a theorem of computable mathematics no longer involving Nonstandard Analysis. To establish the huge scope of ${\mathfrak{C}\mathfrak{I}}$, we apply this template to representative theorems from the Big Five categories from Reverse Mathematics. The latter foundational program provides a classification of the majority of theorems from ‘ordinary’, i.e. non-set theoretical, mathematics into the aforementioned five categories. The Reverse Mathematics zoo gathers exceptions to this classification, and is studied in [ 74, 77] using ${\mathfrak{C}\mathfrak{I}}$. Hence, the template ${\mathfrak{C}\mathfrak{I}}$ is seen to apply to essentially all of ordinary mathematics, thanks to the Big Five classification (and associated zoo) from Reverse Mathematics. Finally, we establish that certain ‘highly constructive’ theorems, called Herbrandizations, also imply the original theorem of Nonstandard Analysis from which they were obtained via ${\mathfrak{C}\mathfrak{I}}$.

scholarly journals ERNA and Friedman's Reverse Mathematics

2011 ◽  
Vol 76 (2) ◽  
pp. 637-664 ◽  
Author(s):  
Sam Sanders
Keyword(s):  
Nonstandard Analysis ◽  
Reverse Mathematics ◽  
Consistency Proof ◽  
Transfer Principles ◽  
Weak König’S Lemma ◽  
König’S Lemma

AbstractElementary Recursive Nonstandard Analysis, in short ERNA, is a constructive system of nonstandard analysis with a PRA consistency proof, proposed around 1995 by Patrick Suppes and Richard Sommer. Recently, the author showed the consistency of ERNA with several transfer principles and proved results of nonstandard analysis in the resulting theories (see [12] and [13]). Here, we show that Weak König's lemma (WKL) and many of its equivalent formulations over RCA0 from Reverse Mathematics (see [21] and [22]) can be ‘pushed down’ into the weak theory ERNA, while preserving the equivalences, but at the price of replacing equality with equality ‘up to infinitesimals’. It turns out that ERNA plays the role of RCA0 and that transfer for universal formulas corresponds to WKL.

scholarly journals SEPARATING PRINCIPLES BELOW RAMSEY'S THEOREM FOR PAIRS

2013 ◽  
Vol 13 (02) ◽  
pp. 1350007 ◽  
Author(s):  
MANUEL LERMAN ◽  
REED SOLOMON ◽  
HENRY TOWSNER
Keyword(s):  
Big Five ◽  
Reverse Mathematics ◽  
Ramsey's Theorem ◽  
Open Questions ◽  
Ramsey’S Theorem

In recent years, there has been a substantial amount of work in reverse mathematics concerning natural mathematical principles that are provable from RT, Ramsey's Theorem for Pairs. These principles tend to fall outside of the "big five" systems of reverse mathematics and a complicated picture of subsystems below RT has emerged. In this paper, we answer two open questions concerning these subsystems, specifically that ADS is not equivalent to CAC and that EM is not equivalent to RT.

The Development of a Short Measure of Character Strength

2012 ◽  
Vol 28 (2) ◽  
pp. 95-101 ◽  
Author(s):  
Adrian Furnham ◽  
David Lester
Keyword(s):  
Factor Analysis ◽  
Big Five ◽  
Character Strengths ◽  
The United States ◽  
Personality Factors ◽  
Big Five Personality ◽  
Theoretical Formulation ◽  
Self Evaluation ◽  
Core Self

A total of 366 participants from Great Britain and the United States completed a new, short questionnaire to measure respondents’ self-assessed character strengths based on the Values in Action Inventory of Strengths (VIA) ( Peterson & Seligman, 2004 ). They also completed a core self-evaluation ( Judge, Erez, Bono, & Thorensen, 2003 ) and a Big Five personality trait ( McManus & Furnham, 2006 ) measure. The study investigated the factor structure of character strengths measure as well as demographic (particularly sex), ideological, personality, and core self-evaluation correlates of the six virtues that represent the “higher-order” classification of the strengths. Exploratory factor analysis provided evidence for the six virtues, though somewhat different from the theoretical formulation. Regressions looking at demographic (sex, age, education), ideological (religion, politics), and personality (Big Five plus core self-evaluations) determinant of these strengths (using factor scores from the factor analysis) showed personality factors (particularly extraversion) were always most powerful predictors of the self-rated strength and virtues. Limitations of the scale are discussed.

On residuals of finite groups

2021 ◽  
Vol 0 (0) ◽  
Author(s):  
Stefanos Aivazidis ◽  
Thomas Müller
Keyword(s):  
Finite Group ◽  
Finite Groups ◽  
Nilpotent Groups ◽  
Simple Groups ◽  
Fitting Subgroup ◽  
Soluble Groups ◽  
A Finite Group ◽  
Fitting Formation ◽  
Original Theorem

Abstract Theorem C in [S. Dolfi, M. Herzog, G. Kaplan and A. Lev, The size of the solvable residual in finite groups, Groups Geom. Dyn. 1 (2007), 4, 401–407] asserts that, in a finite group with trivial Fitting subgroup, the size of the soluble residual of the group is bounded from below by a certain power of the group order and that the inequality is sharp. Inspired by this result and some of the arguments in the above article, we establish the following generalisation: if 𝔛 is a subgroup-closed Fitting formation of full characteristic which does not contain all finite groups and X ¯ \overline{\mathfrak{X}} is the extension-closure of 𝔛, then there exists an (explicitly known and optimal) constant 𝛾 depending only on 𝔛 such that, for all non-trivial finite groups 𝐺 with trivial 𝔛-radical, | G X ¯ | > | G | γ \lvert G^{\overline{\mathfrak{X}}}\rvert>\lvert G\rvert^{\gamma} , where G X ¯ G^{\overline{\mathfrak{X}}} is the X ¯ \overline{\mathfrak{X}} -residual of 𝐺. When X = N \mathfrak{X}=\mathfrak{N} , the class of finite nilpotent groups, it follows that X ¯ = S \overline{\mathfrak{X}}=\mathfrak{S} , the class of finite soluble groups; thus we recover the original theorem of Dolfi, Herzog, Kaplan, and Lev. In the last section of our paper, building on J. G. Thompson’s classification of minimal simple groups, we exhibit a family of subgroup-closed Fitting formations 𝔛 of full characteristic such that S ⊂ X ¯ ⊂ E \mathfrak{S}\subset\overline{\mathfrak{X}}\subset\mathfrak{E} , where 𝔈 denotes the class of all finite groups, thus providing applications of our main result beyond the reach of the above theorem.

scholarly journals The Pathological Big Five: An attempt to build a bridge between the psychiatric classification of personality disorders and the trait model of normal personality

2017 ◽  
Vol 20 (2) ◽  
pp. 451-472 ◽  
Author(s):  
Włodzimierz Strus ◽  
Tomasz Rowiński ◽  
Jan Cieciuch ◽  
Monika Kowalska-Dąbrowska ◽  
Iwona Czuma ◽  
...  
Keyword(s):  
Personality Disorders ◽  
Big Five ◽  
Psychiatric Classification ◽  
Normal Personality ◽  
Trait Model

The multiple classification of acts and the big five factors of personality

1988 ◽  
Vol 22 (3) ◽  
pp. 337-352 ◽  
Author(s):  
Peter Borkenau
Keyword(s):  
Big Five ◽  
Five Factors ◽  
Multiple Classification ◽  
Big Five Factors
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