Add to ORKGWe study the reverse mathematics of countable analogues of several maximality principles that are equivalent to the axiom of choice in set theory. Among these are the principle asserting that every family of sets has a ⊆-maximal subfamily with the finite intersection property and the principle asserting that if P is a property of finite character then every set has a ⊆-maximal subset of which P holds. We show that these principles and their variations have a wide range of strengths in the context of second-order arithmetic, from being equivalent to Z2 to being weaker than ACA0 and incomparable with WKL0. In particular, we identify a choice principle that, modulo \Sigma^0_2 induction, lies strictly below the atomic model theorem principle AM...
We analyze the precise modal commitments of several natural varieties of set-theoretic potentialism,...
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
While power Kripke–Platek set theory, KP(P), shares many properties with ordinary Kripke–Platek set...
AbstractWe study the reverse mathematics of the principle stating that, for every property of finite...
AbstractWe study the reverse mathematics of the principle stating that, for every property of finite...
We study the logical content of several maximality principles related to the finite intersection pri...
We study the reverse mathematics of the principle stating that,for every property of finite characte...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
This paper presents applications of the Axiom of Infinite Choice: Given any set P, there exist at le...
In set theory, the Axiom of Choice (AC) was formulated in 1904 by Ernst Zermelo. It is an addition ...
This book, now in a thoroughly revised second edition, provides a comprehensive and accessible intro...
Abstract. We consider several weak forms of the Axiom of Choice obtained debilitating some well know...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
This dissertation explores the justification of strong theories of sets extending Zeremelo-Fraenkel s...
We analyze the precise modal commitments of several natural varieties of set-theoretic potentialism,...
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
While power Kripke–Platek set theory, KP(P), shares many properties with ordinary Kripke–Platek set...
AbstractWe study the reverse mathematics of the principle stating that, for every property of finite...
AbstractWe study the reverse mathematics of the principle stating that, for every property of finite...
We study the logical content of several maximality principles related to the finite intersection pri...
We study the reverse mathematics of the principle stating that,for every property of finite characte...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
This paper presents applications of the Axiom of Infinite Choice: Given any set P, there exist at le...
In set theory, the Axiom of Choice (AC) was formulated in 1904 by Ernst Zermelo. It is an addition ...
This book, now in a thoroughly revised second edition, provides a comprehensive and accessible intro...
Abstract. We consider several weak forms of the Axiom of Choice obtained debilitating some well know...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
This dissertation explores the justification of strong theories of sets extending Zeremelo-Fraenkel s...
We analyze the precise modal commitments of several natural varieties of set-theoretic potentialism,...
summary:\font\jeden=rsfs7 \font\dva=rsfs10 We study several choice principles for systems of finite ...
While power Kripke–Platek set theory, KP(P), shares many properties with ordinary Kripke–Platek set...