My point regarding Kant was this: He should have seen statements like “All bachelors are unmarried” as evidence regarding how humans decide to use words, not as evidence for the existence of certain categories in reality’s most fundamental ontology.
By “certain categories in reality’s most fundamental ontology”, do you mean the synthetic/analytic distinction? He wouldn’t consider that distinction to be part of reality’s most fundamental ontology. He would disavow any ability to get at “fundamental reality”, which he would consider to be intrinsically out of reach, locked away in the inaccessible numinous.
Actually, he would say something very close to what you wrote when you said that he “should have seen statements like ‘All bachelors are unmarried’ as evidence regarding how humans decide to use words”. What he would say is that the statement is evidence regarding how humans have decided to build a certain concept out of other concepts.
If you affirm the assertion “All bachelors are unmarried” to yourself, then what you are doing, on Kant’s view, is inspecting the concept “bachelor” in your own mind and finding the concept “unmarried” to be among its building blocks. The assertion is analytic because one confirms it to oneself in this way.
Analyticity doesn’t have to do with what the things you call bachelors are like in and of themselves. So it’s not about fundamental reality. Rather, analysis is the act of inspecting how a concept is put together in your mind, and analytic assertions are just assertions that analysis can justify, such as that one concept is part of another concept.
Kant would even allow that you could make a mistake while carrying out this inspection. You might think that “unmarried” was one of the original pieces out of which you had built “bachelor”, when in fact you just now snuck in “unmarried” to form some new concept without realizing it. That is, you might have just unknowingly carried out an act of synthesis. Kant would say, though, that you can reach effective certainty if you are sufficiently careful, just as you can reach effective certainty about a simple arithmetical sum if you perform the sum with sufficient care.
[The above is just to clarify Kant’s claims, not to endorse them.]
By “certain categories in reality’s most fundamental ontology”, do you mean the synthetic/analytic distinction? He wouldn’t consider that distinction to be part of reality’s most fundamental ontology. He would disavow any ability to get at “fundamental reality”, which he would consider to be intrinsically out of reach, locked away in the inaccessible numinous.
Actually, he would say something very close to what you wrote when you said that he “should have seen statements like ‘All bachelors are unmarried’ as evidence regarding how humans decide to use words”. What he would say is that the statement is evidence regarding how humans have decided to build a certain concept out of other concepts.
If you affirm the assertion “All bachelors are unmarried” to yourself, then what you are doing, on Kant’s view, is inspecting the concept “bachelor” in your own mind and finding the concept “unmarried” to be among its building blocks. The assertion is analytic because one confirms it to oneself in this way.
Analyticity doesn’t have to do with what the things you call bachelors are like in and of themselves. So it’s not about fundamental reality. Rather, analysis is the act of inspecting how a concept is put together in your mind, and analytic assertions are just assertions that analysis can justify, such as that one concept is part of another concept.
Kant would even allow that you could make a mistake while carrying out this inspection. You might think that “unmarried” was one of the original pieces out of which you had built “bachelor”, when in fact you just now snuck in “unmarried” to form some new concept without realizing it. That is, you might have just unknowingly carried out an act of synthesis. Kant would say, though, that you can reach effective certainty if you are sufficiently careful, just as you can reach effective certainty about a simple arithmetical sum if you perform the sum with sufficient care.
[The above is just to clarify Kant’s claims, not to endorse them.]