In short, it isn't obvious that mathematical platonism necessitates a commitment to only one construal (one use of ∃) of what it means to exist. — J
The question was much more ordinary: What are the concrete contents or data of which Husserl speaks, that allow us to form our idealization of numbers? Can you give an example of how this might work? — J
all other numbers — frank
What I do say is that material objects are perceived by the senses and so can’t be truly mind-independent, because sense data must be interpreted by the mind for any object to be cognised. — Wayfarer
What interests me about the passage I quoted, is that mathematical functions and the like are not the product of your or my mind, but can only be grasped by a mind. — Wayfarer
The underlying argument is very simple - it is that number is real but not materially existent. And reason Platonism is so strongly resisted is because it is incompatible with materialism naturalism on those grounds, as per the passage from the Smithsonian article upthread, ‘What is Math?’: 'The idea of something existing “outside of space and time” makes empiricists nervous.' — Wayfarer
The first step of constitution of a multiplicity is the awareness of the temporal succession of parts, each of which we are made aware of as elements “separately and specifically noticed”. In the case of numbers, one must abstract away everything else about those elements (color, size, texture) other than that they have been individually noticed as an empty ‘unit’. — Joshs
So . . . can this process take place with any physical series? Would Husserl countenance using an apple, say, as the starting part or element? Does it matter where we start? I think the answer is, "Sure, anything at all will do, as long as its perception counts as a 'sense act'," but I want to get your take on it. — J
We have already indicated the concreta on which the abstracting activity is based. They are totalities of determinate objects. We now add: "completely arbitrary" objects. For the formation of concrete totalities there actually are no restrictions at all with respect to the particular contents to be embraced. Any imaginable object, whether physical or psychical, abstract or concrete, whether given through sensation or phantasy, can be united with any and arbitrarily many others to form a totality, and accordingly can also be counted. For example, certain trees, the Sun, the Moon, Earth and Mars; or a feeling, an angel, the Moon, and Italy, etc. In these examples we can always speak of a totality, a multiplicity, and of a determinate number. The nature of the particular contents therefore makes no difference at all. This fact, as rudimentary as it is incontestable, already rules out a certain class of views concerning the origination of the number concepts: namely, the ones which restrict those concepts to special content domains, e.g., that of physical contents.
(Philosophy of Arithmetic)
number is real and materially instantiated in the diversity of forms given to our perceptions. — Janus
The nature of the particular contents therefore makes no difference at all. This fact, as rudimentary as it is incontestable, already rules out a certain class of views concerning the origination of the number concepts: namely, the ones which restrict those concepts to special content domains, e.g., that of physical contents.
I think that is to greatly underestimate the intelligence and intellectual honesty of those you disagree with — Janus
I’m not criticizing individuals but ideas. In this case, empiricist philosophy which can’t admit the reality of number because of it being ‘outside time and space’. If you take that as any kind of ad hom, it’s on you. — Wayfarer
The idea of autonomy is central to my theory of the third world: although the third world is a human product, a human creation, it creates in its turn . . . its own domain of autonomy. — Objective Knowledge, 118
The sequence of natural numbers is a human construction. But although we create this sequence, it creates its own autonomous problems in its turn. The distinction between odd and even numbers is not created by us; it is an unintended and unavoidable consequence of our creation. — Objective Knowledge, 118
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