Add to ORKGThe naıve idea of “size” for collections seems to obey both to Aristotle’s Principle: “the whole is greater than its parts” and to Cantor’s Principle: “1-to-1 correspondences preserve size”. Notoriously, Aristotle’s and Cantor’s principles are incompatible for infinite collections. Cantor’s theory of cardinalities weakens the former principle to “the part is not greater than the whole”, but the outcoming cardinal arith- metic is very unusual. It does not allow for inverse operations, and so there is no direct way of introducing infinitesimal numbers. (Sizes are added by means of disjoint unions and multiplied by means of disjoint unions of equinumerous collections.) Here we maintain Aristotle’s principle, halving instead Cantor’s prin...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
Richard Kimberly Heck and Paolo Mancosu have claimed that the possibility of non-Cantorian assignmen...
The nave idea of \size " for collections seems to obey both to Aris-totle's Principle: \th...
AbstractThe naïve idea of “size” for collections seems to obey both Aristotle’s Principle: “the whol...
Abstract. Recent work has defended “Euclidean ” theories of set size, in which Cantor’s Principle (t...
Gödel argued that Cantor’s notion of cardinal number is uniquely correct. More recent work has defe...
We discuss two main ways in comparing and evaluating the size of sets: the "Cantorian" way, grounded...
We introduce a "Euclidean" notion of size (numerosity) for "Punktmengen", i.e. sets of points of Euc...
Abstract. It is popularly believed that Cantor's diagonal argument proves that there are more r...
At the heart of mathematics is the quest to find patterns and order in some set of similar structures...
We axiomatize a notion of size for collections (numerosity) that satisfies the five com-mon notions ...
zAbstract Cantor's theory of cardinality violates common sense. It says. for example. that all ...
We show that a measure of size satisfying the five common notions of Euclid’s Elements can be consis...
We show that a measure of size satisfying the ve common notions of Euclid's Elements can be consist...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
Richard Kimberly Heck and Paolo Mancosu have claimed that the possibility of non-Cantorian assignmen...
The nave idea of \size " for collections seems to obey both to Aris-totle's Principle: \th...
AbstractThe naïve idea of “size” for collections seems to obey both Aristotle’s Principle: “the whol...
Abstract. Recent work has defended “Euclidean ” theories of set size, in which Cantor’s Principle (t...
Gödel argued that Cantor’s notion of cardinal number is uniquely correct. More recent work has defe...
We discuss two main ways in comparing and evaluating the size of sets: the "Cantorian" way, grounded...
We introduce a "Euclidean" notion of size (numerosity) for "Punktmengen", i.e. sets of points of Euc...
Abstract. It is popularly believed that Cantor's diagonal argument proves that there are more r...
At the heart of mathematics is the quest to find patterns and order in some set of similar structures...
We axiomatize a notion of size for collections (numerosity) that satisfies the five com-mon notions ...
zAbstract Cantor's theory of cardinality violates common sense. It says. for example. that all ...
We show that a measure of size satisfying the five common notions of Euclid’s Elements can be consis...
We show that a measure of size satisfying the ve common notions of Euclid's Elements can be consist...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
In set theory [1], two sets are considered to have the same cardinality, if a one-to-one corresponde...
Richard Kimberly Heck and Paolo Mancosu have claimed that the possibility of non-Cantorian assignmen...