43 ideas
21463 | Hamann, Herder and Jacobi were key opponents of the Enlightenment [Gardner] |
Full Idea: Hamann, Herder and Jacobi are central figues in the reaction against Enlightenment. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 10 'immediate') | |
A reaction: From a British perspective I would see Hume as the leading such figure. Hamann emphasised the neglect of the role of language. Jacobi was a Christian. |
21459 | Kant halted rationalism, and forced empiricists to worry about foundations [Gardner] |
Full Idea: Kant's Critique swiftly brought rationalism to a halt, and after Kant empiricism has displayed a nervousness regarding its foundations, and been forced to assume more sophisticated forms. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 10 Intro) | |
A reaction: See the ideas of Laurence Bonjour for a modern revival of rationalism. After Kant philosophers either went existential, or stared gloomily into the obscure depths. Formal logic was seen as a possible rope ladder down. |
12330 | In ontology, logic dominated language, until logic was mathematized [Badiou] |
Full Idea: From Aristotle to Hegel, logic was the philosophical category of ontology's dominion over language. The mathematization of logic has authorized language to become that which seizes philosophy for itself. | |
From: Alain Badiou (Briefings on Existence [1998], 8) |
9808 | Philosophy aims to reveal the grandeur of mathematics [Badiou] |
Full Idea: Philosophy's role consists in informing mathematics of its own speculative grandeur. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.11) | |
A reaction: Revealing the grandeur of something sounds more like a rhetorical than a rational exercise. How would you reveal the grandeur of a sunset to someone? |
12318 | The female body, when taken in its entirety, is the Phallus itself [Badiou] |
Full Idea: The female body, when taken in its entirety, is the Phallus itself. | |
From: Alain Badiou (Briefings on Existence [1998]) | |
A reaction: Too good to pass over, too crazy to file sensibly, too creepy to have been filed under humour, my candidate for the weirdest remark I have ever read in a serious philosopher, but no doubt if you read Lacan etc for long enough it looks deeply wise. |
21460 | Only Kant and Hegel have united nature, morals, politics, aesthetics and religion [Gardner] |
Full Idea: Apart from Hegel, no later philosophical system equals in stature Kant's attempt to weld together the diverse fields of natural science, morality, politics, aesthetics and religion into a systematic overarching epistemological and metaphysical unity. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 10) | |
A reaction: Earlier candidate are Plato and Aristotle. Earlier Enlightenment figures say little about morality or aesthetics. Hobbes ranges widely. Aquinas covered most things. |
12325 | Philosophy has been relieved of physics, cosmology, politics, and now must give up ontology [Badiou] |
Full Idea: Philosophy has been released from, even relieved of, physics, cosmology, and politics, as well as many other things. It is important for it to be released from ontology per se. | |
From: Alain Badiou (Briefings on Existence [1998], 3) | |
A reaction: A startling proposal, for anyone who thought that ontology was First Philosophy. Badiou wants to hand ontology over to mathematicians, but I am unclear what remains for the philosophers to do. |
12324 | Consensus is the enemy of thought [Badiou] |
Full Idea: Consensus is the enemy of thought. | |
From: Alain Badiou (Briefings on Existence [1998], 2) | |
A reaction: A nice slogan for bringing Enlightenment optimists to a halt. I am struck. Do I allow my own thinking to always be diverted towards something which might result in a consensus? Do I actually (horror!) prefer consensus to truth? |
21443 | Transcendental proofs derive necessities from possibilities (e.g. possibility of experiencing objects) [Gardner] |
Full Idea: A transcendental proof converts a possibility into a necessity: by saying under what conditions experience of objects is possible, transcendental proofs show those conditions to be necessary for us to the extent that we have any experience of objects. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 02 'Transc') | |
A reaction: They appear to be hypothetical necessities, rather than true metaphysical necessities. Gardner is discussing Kant, but seems to be generalising. Hypothetical necessities are easy: if it is flying, it is necessarily above the ground. |
12337 | There is 'transivity' iff membership ∈ also means inclusion ⊆ [Badiou] |
Full Idea: 'Transitivity' signifies that all of the elements of the set are also parts of the set. If you have α∈Β, you also have α⊆Β. This correlation of membership and inclusion gives a stability which is the sets' natural being. | |
From: Alain Badiou (Briefings on Existence [1998], 11) |
12321 | The axiom of choice must accept an indeterminate, indefinable, unconstructible set [Badiou] |
Full Idea: The axiom of choice actually amounts to admitting an absolutely indeterminate infinite set whose existence is asserted albeit remaining linguistically indefinable. On the other hand, as a process, it is unconstructible. | |
From: Alain Badiou (Briefings on Existence [1998], 2) | |
A reaction: If only constructible sets are admitted (see 'V = L') then there is a contradiction. |
12342 | Topos theory explains the plurality of possible logics [Badiou] |
Full Idea: Topos theory explains the plurality of possible logics. | |
From: Alain Badiou (Briefings on Existence [1998], 14) | |
A reaction: This will because logic will have a distinct theory within each 'topos'. |
12341 | Logic is a mathematical account of a universe of relations [Badiou] |
Full Idea: Logic should first and foremost be a mathematical thought of what a universe of relations is. | |
From: Alain Badiou (Briefings on Existence [1998], 14) |
6007 | If you know your father, but don't recognise your father veiled, you know and don't know the same person [Eubulides, by Dancy,R] |
Full Idea: The 'undetected' or 'veiled' paradox of Eubulides says: if you know your father, and don't know the veiled person before you, but that person is your father, you both know and don't know the same person. | |
From: report of Eubulides (fragments/reports [c.390 BCE]) by R.M. Dancy - Megarian School | |
A reaction: Essentially an uninteresting equivocation on two senses of "know", but this paradox comes into its own when we try to give an account of how linguistic reference works. Frege's distinction of sense and reference tried to sort it out (Idea 4976). |
6006 | If you say truly that you are lying, you are lying [Eubulides, by Dancy,R] |
Full Idea: The liar paradox of Eubulides says 'if you state that you are lying, and state the truth, then you are lying'. | |
From: report of Eubulides (fragments/reports [c.390 BCE]) by R.M. Dancy - Megarian School | |
A reaction: (also Cic. Acad. 2.95) Don't say it, then. These kind of paradoxes of self-reference eventually lead to Russell's 'barber' paradox and his Theory of Types. |
6008 | Removing one grain doesn't destroy a heap, so a heap can't be destroyed [Eubulides, by Dancy,R] |
Full Idea: The 'sorites' paradox of Eubulides says: if you take one grain of sand from a heap (soros), what is left is still a heap; so no matter how many grains of sand you take one by one, the result is always a heap. | |
From: report of Eubulides (fragments/reports [c.390 BCE]) by R.M. Dancy - Megarian School | |
A reaction: (also Cic. Acad. 2.49) This is a very nice paradox, which goes to the heart of our bewilderment when we try to fully understand reality. It homes in on problems of identity, as best exemplified in the Ship of Theseus (Ideas 1212 + 1213). |
9812 | In mathematics, if a problem can be formulated, it will eventually be solved [Badiou] |
Full Idea: Only in mathematics can one unequivocally maintain that if thought can formulate a problem, it can and will solve it, regardless of how long it takes. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.17) | |
A reaction: I hope this includes proving the Continuum Hypothesis, and Goldbach's Conjecture. It doesn't seem quite true, but it shows why philosophers of a rationalist persuasion are drawn to mathematics. |
21444 | Modern geoemtry is either 'pure' (and formal), or 'applied' (and a posteriori) [Gardner] |
Full Idea: There is now 'pure' geometry, consisting of formal systems based on axioms for which truth is not claimed, and which are consequently not synthetic; and 'applied', a branch of physics, the truth of which is empirical, and therefore not a priori. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 03 'Maths') | |
A reaction: His point is that there is no longer any room for a priori geometry. Might the same division be asserted of arithmetic, or analysis, or set theory? |
12334 | There is no single unified definition of number [Badiou] |
Full Idea: Apparently - and this is quite unlike old Greek times - there is no single unified definition of number. | |
From: Alain Badiou (Briefings on Existence [1998], 11) |
12335 | Numbers are for measuring and for calculating (and the two must be consistent) [Badiou] |
Full Idea: Number is an instance of measuring (distinguishing the more from the less, and calibrating data), ..and a figure for calculating (one counts with numbers), ..and it ought to be a figure of consistency (the compatibility of order and calculation). | |
From: Alain Badiou (Briefings on Existence [1998], 11) |
12333 | Each type of number has its own characteristic procedure of introduction [Badiou] |
Full Idea: There is a heterogeneity of introductory procedures of different classical number types: axiomatic for natural numbers, structural for ordinals, algebraic for negative and rational numbers, topological for reals, mainly geometric for complex numbers. | |
From: Alain Badiou (Briefings on Existence [1998], 11) |
12322 | Must we accept numbers as existing when they no longer consist of units? [Badiou] |
Full Idea: Do we have to confer existence on numbers whose principle is to no longer consist of units? | |
From: Alain Badiou (Briefings on Existence [1998], 2) | |
A reaction: This very nicely expresses what seems to me perhaps the most important question in the philosophy of mathematics. I am reluctant to accept such 'unitless' numbers, but I then feel hopelessly old-fashioned and naïve. What to do? |
9813 | Mathematics shows that thinking is not confined to the finite [Badiou] |
Full Idea: Mathematics teaches us that there is no reason whatsoever to confne thinking within the ambit of finitude. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.19) | |
A reaction: This would perhaps make Cantor the greatest thinker who ever lived. It is an exhilarating idea, but we should ward the reader against romping of into unrestrained philosophical thought about infinities. You may be jumping without your Cantorian parachute. |
12327 | The undecidability of the Continuum Hypothesis may have ruined or fragmented set theory [Badiou] |
Full Idea: As we have known since Paul Cohen's theorem, the Continuum Hypothesis is intrinsically undecidable. Many believe Cohen's discovery has driven the set-theoretic project into ruin, or 'pluralized' what was once presented as a unified construct. | |
From: Alain Badiou (Briefings on Existence [1998], 6) | |
A reaction: Badiou thinks the theorem completes set theory, by (roughly) finalising its map. |
12329 | If mathematics is a logic of the possible, then questions of existence are not intrinsic to it [Badiou] |
Full Idea: If mathematics is a logic of the possible, then questions of existence are not intrinsic to it (as they are for the Platonist). | |
From: Alain Badiou (Briefings on Existence [1998], 7) | |
A reaction: See also Idea 12328. I file this to connect it with Hellman's modal (and nominalist) version of structuralism. Could it be that mathematics and modal logic are identical? |
12328 | Platonists like axioms and decisions, Aristotelians like definitions, possibilities and logic [Badiou] |
Full Idea: A Platonist's interest focuses on axioms in which the decision of thought is played out, where an Aristotelian or Leibnizian interest focuses on definitions laying out the representation of possibilities (...and the essence of mathematics is logic). | |
From: Alain Badiou (Briefings on Existence [1998], 7) | |
A reaction: See Idea 12323 for the significance of the Platonist approach. So logicism is an Aristotelian project? Frege is not a true platonist? I like the notion of 'the representation of possibilities', so will vote for the Aristotelians, against Badiou. |
12331 | Logic is definitional, but real mathematics is axiomatic [Badiou] |
Full Idea: Logic is definitional, whereas real mathematics is axiomatic. | |
From: Alain Badiou (Briefings on Existence [1998], 10) |
12340 | There is no Being as a whole, because there is no set of all sets [Badiou] |
Full Idea: The fundamental theorem that 'there does not exist a set of all sets' designates the inexistence of Being as a whole. ...A crucial consequence of this property is that any ontological investigation is irremediably local. | |
From: Alain Badiou (Briefings on Existence [1998], 14) | |
A reaction: The second thought pushes Badiou into Topos Theory, where the real numbers (for example) have a separate theory in each 'topos'. |
9809 | Mathematics inscribes being as such [Badiou] |
Full Idea: Mathematics inscribes being as such. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.12) | |
A reaction: I don't pretend to understand that, but there is something about the purity and certainty of mathematics that makes us feel we are grappling with the core of existence. Perhaps. The same might be said of stubbing your toe on a bedpost. |
12323 | Existence is Being itself, but only as our thought decides it [Badiou] |
Full Idea: Existence is precisely Being itself in as much as thought decides it. And that decision orients thought essentially. ...It is when you decide upon what exists that you bind your thought to Being. | |
From: Alain Badiou (Briefings on Existence [1998], 2) | |
A reaction: [2nd half p.57] Helpful for us non-Heideggerians to see what is going on. Does this mean that Being is Kant's noumenon? |
12332 | The modern view of Being comes when we reject numbers as merely successions of One [Badiou] |
Full Idea: The saturation and collapse of the Euclidean idea of the being of number as One's procession signs the entry of the thought of Being into modern times. | |
From: Alain Badiou (Briefings on Existence [1998], 11) | |
A reaction: That is, by allowing that not all numbers are built of units, numbers expand widely enough to embrace everything we think of as Being. The landmark event is the acceptance of the infinite as a number. |
12326 | The primitive name of Being is the empty set; in a sense, only the empty set 'is' [Badiou] |
Full Idea: In Set Theory, the primitive name of Being is the void, the empty set. The whole hierarchy takes root in it. In a certain sense, it alone 'is'. | |
From: Alain Badiou (Briefings on Existence [1998], 6) | |
A reaction: This is the key to Badiou's view that ontology is mathematics. David Lewis pursued interesting enquiries in this area. |
9811 | It is of the essence of being to appear [Badiou] |
Full Idea: It is of the essence of being to appear. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.16) | |
A reaction: Nice slogan. In my humble opinion 'continental' philosophy is well worth reading because, despite the fluffy rhetoric and the shameless egotism and the desire to shock the bourgeoisie, they occasionally make wonderfully thought-provoking remarks. |
21453 | Leibnizian monads qualify as Kantian noumena [Gardner] |
Full Idea: Leibnizian monads clearly satisfy Kant's definition of noumena. | |
From: Sebastian Gardner (Kant and the Critique of Pure Reason [1999], 06 'Noumena') | |
A reaction: This needs qualifying, because Leibniz clearly specifies the main attributes of monads, where Kant is adamant that we can saying virtually nothing about noumena. |
12320 | Ontology is (and always has been) Cantorian mathematics [Badiou] |
Full Idea: Enlightened by the Cantorian grounding of mathematics, we can assert ontology to be nothing other than mathematics itself. This has been the case ever since its Greek origin. | |
From: Alain Badiou (Briefings on Existence [1998], 1) | |
A reaction: There seems to be quite a strong feeling among mathematicians that new 'realms of being' are emerging from their researches. Only a Platonist, of course, is likely to find this idea sympathetic. |
12338 | We must either assert or deny any single predicate of any single subject [Badiou] |
Full Idea: There can be nothing intermediate to an assertion and a denial. We must either assert or deny any single predicate of any single subject. | |
From: Alain Badiou (Briefings on Existence [1998], 1011b24) | |
A reaction: The first sentence seems to be bivalence, and the second sentence excluded middle. |
8108 | Aesthetics presupposes a distinctive sort of experience, and a unified essence for art [Gardner] |
Full Idea: Aesthetics traditionally has two presuppositions: the first is that there is a distinctive form of experience which is common to the appreciation of art and natural beauty; the second is that art has an essence or some sort of underlying unity. | |
From: Sebastian Gardner (Aesthetics [1995], Intro) | |
A reaction: Both must come up for discussion. I think the biggest problem for the first one is the place of sexual attraction, or even fancying a prawn sandwich. The second has been weakened by Marcel Duchamp's urinal, and modern fringe arts. |
8112 | Art works originate in the artist's mind, and appreciation is re-creating this mental object [Gardner] |
Full Idea: A strong tradition in aesthetics (the 'idealist' view) regards works of art as existing originally in the artist's mind, and the appreciation of art as a matter of re-creating the artist's mental object. | |
From: Sebastian Gardner (Aesthetics [1995], 2.2) | |
A reaction: He mentions Collingwood and Croce. Against this is the view (Idea 7268) that what goes on in the artist's mind is just irrelevant. Freud is important here, suggesting that the artist doesn't quite know what he or she is doing. |
9814 | All great poetry is engaged in rivalry with mathematics [Badiou] |
Full Idea: Like every great poet, Mallarmé was engaged in a tacit rivalry with mathematics. | |
From: Alain Badiou (Mathematics and Philosophy: grand and little [2004], p.20) | |
A reaction: I love these French pronouncements! Would Mallarmé have agreed? If poetry and mathematics are the poles, where is philosophy to be found? |
8111 | Aesthetic objectivists must explain pleasure being essential, but not in the object [Gardner] |
Full Idea: The aesthetic objectivist faces the difficulty of accounting for the fact that pleasure is not in the object, and is necessary for, and not just a contingent accompaniment to, aesthetic response. | |
From: Sebastian Gardner (Aesthetics [1995], 1.2.3) | |
A reaction: The objectivist has to claim, not utterly implausibly, that if you don't get pleasure from certain works, then you 'ought' to. You can ignore a good work, but to deny that it gives pleasure is a failing in you. |
8109 | Aesthetic judgements necessarily require first-hand experience, unlike moral judgements [Gardner] |
Full Idea: I am not within my rights to declare an object beautiful until I have seen it myself, ..unlike moral judgement, which (arguably) does not presuppose either a felt response or personal acquaintance. | |
From: Sebastian Gardner (Aesthetics [1995], 1.1) | |
A reaction: Particularists might argue that moral judgements also require exposure to the actual situation, if they are to be authentic and authoritative. We can also discuss principles of aesthetics in the absence of examples. |
12316 | For Enlightenment philosophers, God was no longer involved in politics [Badiou] |
Full Idea: For the philosophers of the Enlightenment politics is strictly the affair of humankind, an immanent practice from which recourse to the All Mighty's providential organization had to be discarded. | |
From: Alain Badiou (Briefings on Existence [1998], Prol) |
12317 | The God of religion results from an encounter, not from a proof [Badiou] |
Full Idea: The God of metaphysics makes sense of existing according to a proof, while the God of religion makes sense of living according to an encounter | |
From: Alain Badiou (Briefings on Existence [1998], Prol) |