spaces -> sequences in title

Anonymous

]]>renaming this to conditional convergence of spectral spaces, will create another article for conditional convergence in real analysis.

Anonymous

]]>so there is also the more common notion of conditional convergence in real analysis:

]]>Yes.

]]>I guess *coctalos* stands for this?

added the actual definition of conditional convergence and the statement of the main theorem (a conditionally convergent spectral sequence coming from an exhaustive exact couple converges strongly if the lim^1 over its pages vanishes).

]]>stub for *conditional convergence* (of spectral sequences) for the moment just so as to record the references. (even *coctalos* says at some point “…I think this is what conditional convergence means…”)