There are a number of methods of assigning sums to series that do not necessarily converge, e.g. Cesàro summation, Abel summation, Ramanujan summation, etc. (There is also the trivial method of only allowing convergent series in the first place.)
Is there anywhere one can find a good summary of the various methods, their properties (linearity, stability...), and the relations between them? (That is to say, does method A extend method B? Does method A ever disagree with method B?)
Obviously it's impossible for such a thing to be comprehensive, but something including at least the most common ones and their variations would be nice.
(Note: I'm assuming all series are of real numbers.)
Thank you!