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Conference rusure::math

Title:	Mathematics at DEC

Moderator:	RUSURE::EDP

Created:	Mon Feb 03 1986
Last Modified:	Fri Jun 06 1997
Last Successful Update:	Fri Jun 06 1997
Number of topics:	2083
Total number of notes:	14613

1357.0. "Representation of cones in R^2" by GUESS::DERAMO (Sometimes they leave skid marks.) Tue Dec 18 1990 10:47

Path: ryn.mro4.dec.com!shlump.nac.dec.com!decuac!haven!uflorida!caen!zaphod.mps.ohio-state.edu!samsung!cs.utexas.edu!uunet!mcsun!ukc!icdoc!syma!simone
From: [email protected] (Simon Eveson)
Newsgroups: sci.math
Subject: Representation of cones in R^2
Message-ID: <[email protected]>
Date: 17 Dec 90 11:55:56 GMT
Organization: University of Sussex
Lines: 19

Let K be an Archimedean convex cone in R^2, by which I mean that K is a
subset of R^2 such that
	if x and y are in K then x+y is in K,
	if x is in K and t>=0 then tx is in K,
	if x and -x are both in K then x=0,
	if ty-x is in K for all t>0 then -x is in K.
Then there are vectors u and v such that K = { su + tv : s, t >= 0 }.

Does anybody know of a published proof of this result? I have a proof,
but it's rather messy; I'm sure that a more elegant proof is possible.

Thanks,
	Simon.

===============================================================================
Simon Eveson
Mathematics Division, University of Sussex, Brighton, BN1 9QH, England.
JANET:[email protected] BITNET:simone%[email protected]
===============================================================================

T.R	Title	User	Personal Name	Date	Lines
1357.1		SHIRE::ALAIND	Alain Debecker @GEO DTN 821-4912	`Thu Dec 20 1990 12:55`	37
	Let K be an Archimedean convex cone in R^2, by which I mean that K is a subset of R^2 such that (1) if x and y are in K then x+y is in K, (2) if x is in K and t>=0 then tx is in K, (3) if x and -x are both in K then x=0, (4) if ty-x is in K for all t>0 then -x is in K. Then there are vectors u and v such that K = { su + tv : s, t >= 0 }. =========================================================================== The key is connexity: the cone being convex is also connected by arc, thus connected. Consider the projection p on the unit circle defined on R�-{0} by: x p(x) = --------- \|\| x \|\| This projection being continuous, the image p(K) of the cone on the unit circle is also connected. The only connected subsets of the circle are continuous arcs. The full circle being excluded by (3), this means that p(K) is an arc of the form (u,v), where u and v are the extremities of the arc. To show that u is in K, apply (4) to y = v and x = -u. In facts the line D = { tv+u \| t>0} is such that p(D) = ]u,v[. Thus, by (2), D is contained in K and u must be in K by (4). The same applies to v, so that p(K) is the arc [u,v]. Therefore any point of the form su + tv is also in K, provided that s and t are strictly positive. Conversely, take any x in K. Its projection p(x) is on the arc (u,v), and then we can write p(x) = au + bv, with a and b positive. Let s = a \|\|x\|\| and t = b \|\|x\|\| so that x = su + tv, with s and t positive.
1357.2		GUESS::DERAMO	Dan D'Eramo	`Thu Dec 20 1990 14:38`	11
	Someone on usenet noted that the definition also allowed K to be the empty set or the singleton set containing only the origin. In the latter case K = { su + tv : s, t >= 0 } with u = v = (0,0). re .-1 You twice use "positive" where I think you mean "nonnegative", otherwise that looks right. Dan
1357.3		SHIRE::ALAIND	Alain Debecker @GEO DTN 821-4912	`Fri Dec 21 1990 06:15`	19
	> re .-2 > > You twice use "positive" where I think you mean > "nonnegative" A matter of culture. In many countries, zero is taken as a number both positive and negative, and the sentence "x is smaller than y" means x <= y. In US and UK, zero is neither positive nor negative, and "x is smaller than y" doesn't allow for equality. Nevertheless, you are right. I was lousy on the edges: Note that the condition (4) is equivalent to the fact that the cone is closed. An open set verifying condition (1) to (3) is of the form K = { su + tv \| s,t > 0 }. The same demonstration holds: this time, the intersection of K and the cone is open, thus of the form ]u,v[ instead of [u,v].
1357.4	But this is English, right?	CHOVAX::YOUNG	Give peace a chance.	`Fri Dec 21 1990 11:38`	7
	Re .4: But these are fairly precise terms in English. For instance, "Positive" in English has a precise meaning, ie. "Greater than zero." -- Barry
1357.5	Let he who is without sin(x) cast the first die	VMSDEV::HALLYB	The Smart Money was on Goliath	`Fri Dec 21 1990 12:37`	5
	Re: .4 [Re: .4 [Re: .4 [Re: .4 [Re: .4 [Re: .4 [ Re: .4 [Re: .4 [... > But these are fairly precise terms in English. For instance, As opposed to "unfairly precise"?
1357.6	Precisely!	GUESS::DERAMO	Dan D'Eramo	`Fri Dec 21 1990 13:55`	5
	More like, as in "rather precise". More precise than your usual English term, but not as precise as something like "compact Hausdorff space". Dan
1357.7	A:x [Mathematician(x) -> Life_of_Nit_Picking(x)]	CHOVAX::YOUNG	Give peace a chance.	`Fri Dec 21 1990 15:46`	12
	Yeah, what Dan said. Really though, my lousy spelling and usual fumble-fingered Notes replies aside, when you discuss mathematics, you HAVE to be precise. Mathematics more than any other field inherently relies on precise terminology and precise statements. What is, in polite conversation, merely a nit that only an irritating pest would point out, in mathematical discussions can easily become a pivotal issue or the fatal 'flaw' in a critical proof. -- Barry
1357.8		SHIRE::ALAIND	Alain Debecker @GEO DTN 821-4912	`Fri Dec 28 1990 09:03`	7
	Of course "positive" has a precise meaning in English, and I confess to make a linguistic mish-mash from time to time. You know, just like when you ask an Englishman why he is driving on the left side of the road and he answers "because it is the right side". Nevertheless in this precise case the demonstration was simpler with an open cone.