Login
 Forum
 
 
Personal data sheet
 Print preview
personal data approved: 2023. I. 05.
Personal data
Gábor Szabó
name Gábor Szabó
name of institution
doctoral school
ELTE Doctoral School of Philosophy (Announcer of research topic)
accreditation statement submitted to: Károli Gáspár University of the Reformed Church, Budapest
Contact details
E-mail address gszszig.hu
phone number +36 30 556-2224
own web page
Academic title
scientific degree, title Ph.D.
year degree was obtained 2001
discipline to which degree belongs philosophy
institution granting the degree Budapest University of Technology and Economics
scientific degree, title DSc
year degree was obtained 2020
discipline to which degree belongs philosophy
institution granting the degree HAS
Employment
2012 - MTA BTK Filozófiai Intézet (research institute, not university)
other (not specified) (tudományos tanácsadó)
Thesis topic supervisor
number of doctoral students supervised until now 0
number of students who fulfilled course requirements 0
students who obtained their degrees:
  Thesis topic proposals
Research
research area philosophy of physics
research field in which current research is conducted philosophy
Publications
2021

Fazekas Peter, Gyenis Balázs, Hofer-Szabó Gábor, Kertész Gergely: A dynamical systems approach to causation, SYNTHESE 198: (7) pp. 6065-6087.
type of document: Journal paper/Article
language: English
URL 
2021

Hofer-Szabó Gábor: Commutativity, Comeasurability, and Contextuality in the Kochen-Specker Arguments, PHILOSOPHY OF SCIENCE 88: (3) pp. 483-510.
type of document: Journal paper/Article
language: English
URL 
2021

Hofer-Szabó Gábor: Three noncontextual hidden variable models for the Peres-Mermin square, EUROPEAN JOURNAL FOR PHILOSOPHY OF SCIENCE 11: (1) 30
type of document: Journal paper/Article
number of independent citations: 1
language: English
URL 
2021

Hofer-Szabó Gábor: Causal contextuality and contextuality-by-default are different concepts, JOURNAL OF MATHEMATICAL PSYCHOLOGY 104: 102590
type of document: Journal paper/Article
language: English
URL 
2020

Szabó Gábor: On the three types of Bell's inaequality, In: Meir, Hemmo; Orly, Shenker (szerk.) Quantum, Probability, Logic, Springer Publishing Company (2020) pp. 353-374.
type of document: Part of book/Könyvfejezet (to be translated)
language: English
2017

Leszek Wroński, Szabó Gábor: Making it Formally Explicit, Springer International Publishing
type of document:
language: English
URL 
2017

Gyenis Z, Hofer-Szabó G, Rédei M: Conditioning using conditional expectations: the Borel–Kolmogorov Paradox, SYNTHESE 194: (7) pp. 2595-2630.
type of document: Journal paper/Article
number of independent citations: 11
language: English
URL 
2017

Gyenis Balázs, Gömöri Márton, Szabó Gábor: How do macrostates come about?, In: Leszek, Wroński; Szabó, Gábor (szerk.) Making it Formally Explicit, Springer International Publishing (2017) pp. 213-229.
type of document: Part of book/Szaktanulmány (to be translated)
number of independent citations: 3
language: English
URL 
2016

Hofer-Szabó G, Vecsernyés P: A generalized definition of Bell’s local causality, SYNTHESE 193: (10) pp. 3195-3207.
type of document: Journal paper/Article
language: English
Full text 
2015

Szabó Gábor: On the relation between the probabilistic characterization of the common cause and Bell's notion of local causality, STUDIES IN HISTORY AND PHILOSOPHY OF MODERN PHYSICS 49: pp. 32-41.
type of document: Journal paper/Article
language: English
URL 
Number of independent citations to these publications:15 
Scientometric data
list of publications and citations
number of scientific publications that meet accreditation criteria:
61
number of scientific publications:
67
monographs and professional books:
1
monographs/books in which chapters/sections were contributed:
0 
number of independent citations to scientific publications and creative works:
301

 
All rights reserved © 2007, Hungarian Doctoral Council. Doctoral Council registration number at commissioner for data protection: 02003/0001. Program version: 2.2358 ( 2017. X. 31. )