I am extremely disappointed at the replies from (some) experts. As a mathematician who has been worrying about the state of the literature for some time, I expected trouble like this---and expect considerably more, especially from the number theory literature between the 60s and the 90s. I also wonder how well 4-manifold theory is faring.
Much worse, this nonchalant attitude is being taught to PhD students and postdocs both explicitly and implicitly: if you are worried too much, maybe you are not smart enough to understand the arguments/your mathematical sense is not good enough to perceive the essence of the work. If you explain too much, your readers will think you think they are dumb; erase this page from your paper (actual referee feedback).
Also, like Loeffler in the comments, I don't trust the "people have been using crystalline cohomology forever without trouble" argument. The basics are correct, yes, as far as I can tell (because I verified them myself, bearing in mind of course that I am very fallible).
But precisely because of that, large swathes of the theory will be correct. Errors will be rare and circumstantial, and that is part of the problem! It makes them very easy to creep into a line of work and go unnoticed for a long time, especially if the expert community of the area is tiny---as is the case in most sub-areas of research math.
One of the best things about proof assistants is that they're not convinced by how "obvious" you think something is. It's much harder for a human to resist proof by social forces such as intimidation, confidence, and "it's well known".
Are you aware of the book on [The Disc Embedding Theorem](https://academic.oup.com/book/43693) based on 12 lectures Freedman gave roughly a decade ago.
No, I am not an expert of 4-manifold theory and would not really understand most of the chapters. If this book fixes some of the literature issues in that field that is amazing! Does it finally resolve the issue of nobody understanding the construction of topological Casson handles?
Edit: I see from the MO comments "The fully topological version of the disc embedding theorem is beyond the scope of this book, since we will not discuss Quinn's proof of transversality."
Much worse, this nonchalant attitude is being taught to PhD students and postdocs both explicitly and implicitly: if you are worried too much, maybe you are not smart enough to understand the arguments/your mathematical sense is not good enough to perceive the essence of the work. If you explain too much, your readers will think you think they are dumb; erase this page from your paper (actual referee feedback).
Also, like Loeffler in the comments, I don't trust the "people have been using crystalline cohomology forever without trouble" argument. The basics are correct, yes, as far as I can tell (because I verified them myself, bearing in mind of course that I am very fallible).
But precisely because of that, large swathes of the theory will be correct. Errors will be rare and circumstantial, and that is part of the problem! It makes them very easy to creep into a line of work and go unnoticed for a long time, especially if the expert community of the area is tiny---as is the case in most sub-areas of research math.