so here's what irks me
consider you have a memory storage, say a hard disk
and an expected life span of a given amount of time t the exact estimate of t is inprecise you are to optimize the memory usage, as with the following constraints 1) there are vital programs the existance of which is to be ensured at all times 2) the storage always needs to have sufficient empty storage to store new stuff over the period t 3) unnecessary information cannot be deleted at will; instead, un-used programs that are not class 1) are only removed through expiry processes (consider half-life) 4) there is no way of improving compression 5) input stream of new information can be made selective as desired, as a function of any of the above constraints but not of any external item see by the time you've reached halfway of the storage, it's full of crap you can't wait to get rid of but you can't just ****ing delete because of constraint 2), the input stream 5) must ultimately be a function of the empty storage space (and a monotonously decreasing a function). because of constraint 3), the higher the early age t-n input stream is, the steeper the (decreasing) input stream curve must be now at the hyperbole situation of t being infinite, the input stream function can only equal the function of half-lifes of all previously storaged input, excluding those constrained by 1) this yields a system that is doomed to self-destruct asymptotically, or at least become more or less paralyzed (say, as a random process of input streams fills the disk with items with higher and higher half-lives; by this i mean that since shorter half-life information decays faster and is replaced by say normally distributed half-life the half-lifes of the system will gradually increase), the input stream asymptotically approaches zero, since the half-lifes asymptotically approach infinite; this is of course only if there are items in the input stream with half-lifes approaching infinity, because ultimately all the information in the storage will have either half-lifes approaching infinity or are constrained) its a vegetable doomed to become one |
Re: so here's what irks me
it's impossible to solve it right, when taking into account the hyperbole situation where the input stream curve is so tight that essentially no new information gets in to the storage but just a tiny fraction approaching zero of free storage space remains to satisfy constraints
any solutions are dependent on the precision of the estimate t. |
Re: so here's what irks me
What's the purpose of this? a theoretical exercise?
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Re: so here's what irks me
i thought you'd be clever enough to guess
does the purpose of this bear any relevance to the answer the primary purpose is of course to reinvigorate general discussions with something else than your shitty four word stories |
Re: so here's what irks me
to be precise, in fact, constraint 1) is futile. they're just pieces of storage with an infinite half-life
so maybe it'd be more elegant if there were fewer variables and constraints, ie. just the half-life of the stored unit, depending on how high it exceeds some threshold, and then refresh the half-life each time the memory unit is activated to represent decay you should be able to fit this in one equation |
Re: so here's what irks me
You're being kind of dickish these days.
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Re: so here's what irks me
you're so dull. it's more difficult than it seems.
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Re: so here's what irks me
Upload to the internet
I win |
Re: so here's what irks me
yeah i know you do
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Re: so here's what irks me
Quote:
<3 |
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