I have read 1 book( M. R. HOLMES, Elementary #SetTheory with a Universal Set -ISBN 2-87209-488-1)and one thesis ( #Constructivity and #Predicativity: Philosophical Foundations: crosella -2016) thoroughly . Among other things . Now I want to build up on these conceptual foundations, by pursuing this direction, could you suggest me , the relevent literature for this purpose?
#typetheory #categoryttheory

Are coherent categories same as pretopos?
#categoryttheory

Afaik so far what one TT gives is more like measuring instruments like a tape or a weighing balance for properties ( as units ) and proofs, verification or checks ( as boolean measurements)except that, laws formulating them can be provable and not empirical at least. To get advance from there we need something like modern physic... I guess, that ll be #categoryttheory

Tried to bootstrap a qna on the slides I very recently read* and posted here, let's see where it goes
Related to - #categoryttheory #presheafs #haskell #agda #coq #TopologicalSpace

Tried to bootstrap a qna session on the slides i recently read and posted here , let's see where it goes
#functor #presheafs #categoryttheory #agda #coq #haskell
Will mention the credits if op of those parts are okay with it
L( my answers) to ( questions in left), feedback comments criticism are welcome

ct.category theory - How does it End? - MathOverflow Iterating, let BN^{⊕∞} denote the category with one object, whose morphisms are the abelian monoid (under addition) of finite (but arbitrarily long) sequences of nonnegative integers. There is an isomorphism BN×BN^⊕∞, giving an isomorphism of categories End(hom(BN⊕∞,C))=hom(BN⊕∞,C
does it relate #categoryttheory to #hott ?
https://mathoverflow.net/questions/136195/how-does-it-end