 About 2,250 results  books.google.com (referred to in: Jordan–Dedekind space) (refers to: Chain; JordanDedekind
lattice; Partially ordered set) Jordan–Dedekind property of a partially ordered set [
06Bxx; 06Bxx] (see: Jordan—Dedekind property) Jordan—Dedekind space (
05B35, ... 

 books.google.com ... the Korteweg — de VriesLandauGinsburg model see: Hurwitzspace
Korteweg de Vries solution see: gap Korteweg death process ... Abstract analytic
number theory) Dedekind zetafunction see: Hadamard factorization of the —
deductiondetachment system [03Gxx, ... nmoves see: skein module based on
relations — degenerate Jordan pair see: non — degree see: additivityexcision of
the Brouwer ... 

 books.google.com Nieminen [1990] investigated the connection between the JordanDedekind chain
condition and annihilators in finite ... the JordanDedekind chain condition (also
called JordanDedekind spaces) has also increasingly been found important. 

 books.google.com We prove theorems 2 and 3 in sections 2 and 3 respectively. In section 4 we
make some remarks about independence and also about what conditions are
needed for a JordanDedekind space to be a matroid. 2. Proof of theorem 2. The
proof ... 

 books.google.com For the other direction, we show that a system S satisfying the axioms of theorem
2 is a closure space of finite rank satisfying the JordanDedekind chain condition.
Rl follows from the definition of p in a JordanDedekind space, and R2 is ... 

 books.google.com The set Lb(L,M) of all order bounded operators (from L into M ) is a Dedekind
complete Riesz space (Theorem 83.4). ... Itis 1 Z 1 2 possible, therefore, that the
vector space of all T = T T with T and T2 positive (called the space of Jordan ... 

 books.google.com Щ Jordan decomposition ÏÏfo^iftfâ* Jordan decomposition of signed measure
JordanDedekind chain condition JordanDedekind ... JordanDedekind space ft
fa Ч Jordan domain £&ЗК# Jordan form Jordan form matrix Jordan half interval 3
? 

 books.google.com In section 3 we consider the case of a closure space with the JordanDedekind
chain condition (J.D. C. condition). That is all maximal chains In the lattice have
the same length. Matroids have this property, but the condition on its own is not ... 

 books.google.com Given a finite set X and a linearly ordered set L, a valued set A on X is a function
A: X — > L. A space of valued sets is a .... and Jordan Dedekind orders (all
maximal chains with the same endpoints have the same length) are recognizable
. 

 books.google.com Note that the name combinatorial geometry is often used for finitary DLS, the
name independence space is used for finitary ... JordanDedekind's condition,
independence sets and bases If S is an FDLS, then the lattice Lat S satisfies the ... 

 