Ali: There can’t be real paradoxes, can there? Those that purport to be paradoxes actually contain ambiguities in meaning, neglected information, hidden assumptions… In short, it’s all smoke and mirrors.
Bev: You might think so. However, Russell’s Paradox in set theory has attracted a lot of serious attention in the literature. In fact, Gottlob Frege, a leading logician and mathematician at the time, felt that this paradox devastated his fundamental work on set theory and the foundations of mathematics.
Ali: So if Russell’s Paradox holds up, it would, rather worryingly, shake the foundations of mathematics?
Bev: Right. So let’s see what is involved. We all know – or think we know – what a ‘set’ is: a collection of all those and only those entities with a defined property. A set’s members can be simple objects, or can be sets themselves. It’s the last possibility we’re interested in here. Sets can also be non-self-membered, or self-membered: they can belong to themselves, or not. Examples of the former would include the set of all finite sets, which is infinite and hence non-self-membered. On the other hand, the set of all infinite sets is itself infinite and so must be included in itself, so it is self-membered. All sets either are non-self-membered or self-membered.
Ali: OK… But I feel like I’m about to be trapped, or perhaps conned.
Bev: Well consider the set of all non-self-membered sets, which for the sake of argument, let’s call ‘N’.
Ali: Hang on! Does such a set even exist?
This story is from the {{IssueName}} edition of {{MagazineName}}.
Start your 7-day Magzter GOLD free trial to access thousands of curated premium stories, and 9,000+ magazines and newspapers.
Already a subscriber ? Sign In
This story is from the {{IssueName}} edition of {{MagazineName}}.
Start your 7-day Magzter GOLD free trial to access thousands of curated premium stories, and 9,000+ magazines and newspapers.
Already a subscriber? Sign In
Anselm (1033-1109)
Martin Jenkins recalls the being of the creator of the ontological argument.
Is Brillo Box an Illustration?
Thomas E. Wartenberg uses Warhol's work to illustrate his theory of illustration.
Why is Freedom So Important To Us?
John Shand explains why free will is basic to humanity.
The Funnel of Righteousness
Peter Worley tells us how to be right, righter, rightest.
We're as Smart as the Universe Gets
James Miles argues, among other things, that E.T. will be like Kim Kardashian, and that the real threat of advanced AI has been misunderstood.
Managing the Mind
Roger Haines contemplates how we consciously manage our minds.
lain McGilchrist's Naturalized Metaphysics
Rogério Severo looks at the brain to see the world anew.
Love & Metaphysics
Peter Graarup Westergaard explains why love is never just physical, with the aid of Donald Davidson's anomalous monism.
Mary Leaves Her Room
Nigel Hems asks, does Mary see colours differently outside her room?
From Birds To Brains
Jonathan Moens considers whether emergence can explain minds from brains.