Date: Wed, 18 Oct 1995 10:36:21 -0300 (ADT) Subject: a question Date: Wed, 18 Oct 1995 09:33:34 +0100 From: TONOLO@PDMAT1.MATH.UNIPD.IT Dear Professors, I wish to know if complete lattices with the following property have been considered and named: h < sup a_i ==> h = sup( h : a_i) (I use : for the binary meet) for each h and each directed family {a_i | i\in I} of elements of the lattice. Thanking for the attention, with my best regards Alberto Tonolo Date: Wed, 18 Oct 1995 11:43:43 -0300 (ADT) Subject: Re: a question Date: Wed, 18 Oct 1995 14:22:17 +0000 From: Steve Vickers >I wish to know if complete lattices with the following property have >been considered and named: > > h < sup a_i ==> h = sup( h : a_i) (I use : for the binary >meet) >for each h and each directed family {a_i | i\in I} of elements of the lattice. The condition is equivalent to binary meets distributing over directed joins, and it's well known (e.g. Johnstone's "Stone Spaces" Lemma VII.4.1) that this holds for all continuous lattices. Posets that have finite meets and directed joins and this distributivity have been called "preframes" by Banaschewski, so if you are genuinely interested in complete lattices with preframe distributivity you might plausibly call them complete preframes. Steve Vickers. Date: Wed, 18 Oct 1995 16:03:07 -0300 (ADT) Subject: Re: a question Date: Wed, 18 Oct 1995 14:34:11 -0400 (EDT) From: MTHISBEL@ubvms.cc.buffalo.edu < h = sup( h : a_i) (I use : for the binary meet) for each h and each directed family {a_i | i\in I} of elements of the lattice.>> You have the meet-continuous lattices introduced in 1948 by G. Birkhoff and O. Frink. The usual definition is, for each up-directed family {a_i} and each h,h : sup a_i = sup h : a_i (in your notation). This is easily seen to be equivalent. There is a lot known about them by now. Yours, John Isbell Date: Fri, 20 Oct 1995 10:37:15 -0300 (ADT) Subject: Re: "a question" Date: 19-OCT-1995 19:34:07.42 From: Fred E.J. Linton Alberto Tonolo asks about complete lattices with the following property (I replace his meet-symbol ":" with the symbol "^" instead): > h < sup a_i ==> > > h = sup( h ^ a_i) (*_h) > > for each h and each directed family {a_i | i in I} of elements of the lattice. I can point out only that, in any lattice (complete or not) in which the family a_i (i in I) has a sup, to require (*_h) for each h < sup a_i is the same as to require the distributivity h ^ sup a_i = sup (h ^ a_i) (d_h) for just all h . Indeed, the relations (d_h) and (*_h) coincide, and are trivial, when h < sup a_i ; and when h = sup a_i they not only coincide but are tautologous. In particular, (d_h) for all h guarantees (*_h) for h < sup a_i , and (*_h) for h < sup a_i guarantees (d_h) at least for all h that are < or = to sup a_i . For general h' , let h = h' ^ sup a_i . Then either h < sup a_i or h = sup a_i ; in either case, (d_h) holds. To see that (d_h') holds as well, just calculate: since h = h' ^ sup a_i , either h < or h = sup a_i ; and, by (*_h) , h' ^ sup a_i = h = sup (h ^ a_i) = sup ((h' ^ sup a_i) ^ a_i) = = sup (h' ^ ((sup a_i) ^ a_i)) = sup (h' ^ a_i) . In particular, *every* h ^ (-) will distribute through whatever joins happen to satisfy (*_h) for just all smaller h than the join; if the lattice is complete and satisfies the (*_h) condition for all joins and all h smaller than them, it is a frame; and, I guess, if I'm not utterly confused by what the term "continuous lattice" means, if the lattice has directed joins and the (*_h) condition holds for all directed joins and all h smaller than them, then it's a continuous lattice (or, anyway, *every* h ^ (-) distributes through every directed join). Hope this helps. And I'm sure someone will correct me if I've misunderstood the meaning of "continuous lattice" :-) . -- FEJ [PS: Address change: please make a note of it -- the address fejlinton @ attmail.com is officially dead (AT&T Mail's recent trebling of their monthly fee made me leave their service). Still valid are FLinton @ Wesleyan.EDU , the older and more complicated FLinton @ eagle.Wesleyan.EDU , the still older FLinton @ WESLEYAN.bitnet , and fejlinton @ mcimail.com . Thanks for your attention. - FEJ ] Date: Mon, 23 Oct 1995 11:34:26 -0300 (ADT) Subject: Re: "a question" Date: Mon, 23 Oct 1995 09:36:12 EDT5EST From: Philipp Sunderhauf Fred E.J. Linton in an answer to the question of Alberto Tonolo: > I guess, if > I'm not utterly confused by what the term "continuous lattice" means, > if the lattice has directed joins and the (*_h) condition holds for all > directed joins and all h smaller than them, then it's a continuous lattice > (or, anyway, *every* h ^ (-) distributes through every directed > join). > Hope this helps. And I'm sure someone will correct me if I've misunderstood > the meaning of "continuous lattice" :-) . 1) "continuous lattice" refers to complete lattices only, so the condition of existing directed sups is obsolete. 2) The equational characterisation of continuous lattices is directed sups distributing over *arbitrary* infs. As pointed out by John Isbell, the lattices referred to by Alberto Tonolo are known as "meet- continuous". 3) Detailed answers to this and related questions may be found in The Compendium: G Gierz, KH Hofmann, K Keimel, JD Lawson, M Mislove, D Scott: A Compendium of Continuous Lattices. Springer 1980. Philipp. ------ Philipp S"underhauf Department of Mathematics and Statistics University of Southern Maine Portland, ME 04103 psunder@usm.maine.edu Date: Mon, 23 Oct 1995 11:33:27 -0300 (ADT) Subject: Re: a question Date: Sun, 22 Oct 1995 11:20:07 -0700 From: William H. Rowan Dear Alberto, It would seem your property is implied by one form of continuity, I think it is upper continuity. I think algebraic lattices also have your property. Best, Bill Rowan