SRadders (November 30, 1999 at 12:00 am)

Genius! :-D

tenniscraze (November 30, 1999 at 12:00 am)

Love it!

SanguisDulcis (November 30, 1999 at 12:00 am)

GREAT!

CassyCoo (November 30, 1999 at 12:00 am)

::sigh::...a song that every math major dreams of being serenaded with...

richardfreyman13 (November 30, 1999 at 12:00 am)

The lyrics were on the side under "More Info.."just a heads up...

dsfrogs (November 30, 1999 at 12:00 am)

5I've proved my proposition now, as you can see,So let's both be associative and freeAnd by corollary, this shows you and I to bePurely inseparable. Q. E. D.

dsfrogs (November 30, 1999 at 12:00 am)

4I'm living in the kernel of a rank-one mapFrom my domain, its image looks so blue,'Cause all I see are zeroes, it's a cruel trapBut we're a finite simple group of order twoI'm not the smoothest operator in my class,But we're a mirror pair, me and you,So let's apply forgetful functors to the pastAnd be a finite simple group, a finite simple group,Let's be a finite simple group of order two(Oughter: "Why not three?")

dsfrogs (November 30, 1999 at 12:00 am)

3Our equivalence was stable,A principal love bundle sitting deep insideBut then you drove a wedge between our two-formsNow everything is so complexifiedWhen we first met, we simply connectedMy heart was open but too denseOur system was already directedTo have a finite limit, in some sense

dsfrogs (November 30, 1999 at 12:00 am)

2I'm losing my identityI'm getting tensor every dayAnd without loss of generalityI will assume that you feel the same waySince every time I see you, you just quotient outThe faithful image that I map intoBut when we're one-to-one you'll see what I'm about'Cause we're a finite simple group of order two

dsfrogs (November 30, 1999 at 12:00 am)

whoops, found it.1Finite Simple Group (of order two)A Klein Four original by Matt SalomoneThe path of love is never smoothBut mine's continuous for youYou're the upper bound in the chains of my heartYou're my Axiom of Choice, you know it's trueBut lately our relation's not so well-definedAnd I just can't function without youI'll prove my proposition and I'm sure you'll findWe're a finite simple group of order two