THE EMPEROR'S NEW CLOTHES?

Usually, homological methods do not solve a problem at once, but they may tell rather precisely what has to be done for the solution. Once knowing the solution it is often possible to give a presentation which avoids the abstract homological methods and which may then look even ingenious. Perhaps, this is one of the reasons why seemingly many mathematicians dislike homological tools: it looks as if they were superfluous. Another reason certainly is that these general tools, which found applications in all parts of mathematics from algebra and topology to algebraic geometry as well as – and this is the concern of the present article – to functional analysis, have to be formulated in a very general abstract language. One might get the feeling that only trivialities can be true in such a generality, and like in Andersen's “The emperor's new clothes” one waits for a child telling that he is naked. Indeed, in his book on algebra [11, page 105], Serge Lang posed the exercise: “Take any book on homological algebra, and prove all the theorems without looking at the proofs given in that book”.