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If consensus equals truth, then truth can be made by forcing or organizing a consensus, rather than being discovered through experiment or observation, or existing separately from consensus. The principles of mathematics also do not hold under consensus truth because mathematical propositions build on each other.
It is part of a broad class of indispensability arguments most commonly applied in the philosophy of mathematics, but which also includes arguments in the philosophy of language and ethics. [14] In the most general sense, indispensability arguments aim to support their conclusion based on the claim that the truth of the conclusion is ...
Special functions are mathematical functions that have well-established names and mathematical notations due to their significance in mathematics and other scientific fields. There is no formal definition of what makes a function a special function; instead, the term special function is defined by consensus.
Among the current advocates of consensus theory as a useful accounting of the concept of "truth" is the philosopher Jürgen Habermas. [33] Habermas maintains that truth is what would be agreed upon in an ideal speech situation. [34] Among the current strong critics of consensus theory is the philosopher Nicholas Rescher. [35]
John Stuart Mill, discussing the fallibility of the moral consensus in his essay "On Liberty" (1859) refers scornfully to the odium theologicum, saying that, in a sincere bigot, it is one of the most unequivocal cases of moral feeling. In this essay, he takes issue with those who rely on moral feeling rather than reasoned argument to justify ...
Dual process theory within moral psychology is an influential theory of human moral judgement that posits that human beings possess two distinct cognitive subsystems that compete in moral reasoning processes: one fast, intuitive and emotionally-driven, the other slow, requiring conscious deliberation and a higher cognitive load.
A related field is the ethics of artificial intelligence, which addresses such problems as the existence of moral personhood of AIs, the possibility of moral obligations to AIs (for instance, the right of a possibly sentient computer system to not be turned off), and the question of making AIs that behave ethically towards humans and others.
Western philosophies of mathematics go as far back as Pythagoras, who described the theory "everything is mathematics" (mathematicism), Plato, who paraphrased Pythagoras, and studied the ontological status of mathematical objects, and Aristotle, who studied logic and issues related to infinity (actual versus potential).