I was working my way through uniform convergent/point convergent sequences of functions. We don't seem to care what space we are in any more. My brain is beyond hurt with thinking. Then I saw something. I played a few games of solitaire and I think that I'm right.
There comes a point place when you can remove enough pegs so that a single peg finish isn't possible any more. I can't prove this but there's some limit condition here I'm sure. I'd love to know where that place is. Which might mean that there is always a point convergent sequence of functions under a certain limit? Mmmmm.
Dammit neil, build that app properly! It's not as if you haven't had years and years to do so.
Jumping, jumping, Neo. Still I have a shining new tool for my toolbox. And my personal madness is burning bright once again.