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|(referred to in: Jordan–Dedekind space) (refers to: Chain; Jordan-Dedekind |
lattice; Partially ordered set) Jordan–Dedekind property of a partially ordered set [
06Bxx; 06Bxx] (see: Jordan—Dedekind property) Jordan—Dedekind space (
|... the Korteweg — de Vries-Landau-Ginsburg model see: Hurwitz-space |
Korteweg de Vries solution see: gap Korteweg death process ... Abstract analytic
number theory) Dedekind zeta-function see: Hadamard factorization of the —
deduction-detachment system [03Gxx, ... n-moves see: skein module based on
relations — degenerate Jordan pair see: non — degree see: additivity-excision of
the Brouwer ...
|Nieminen  investigated the connection between the JordanDedekind chain |
condition and annihilators in finite ... the Jordan-Dedekind chain condition (also
called Jordan-Dedekind spaces) has also increasingly been found important.
|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 Jordan-Dedekind space to be a matroid. 2. Proof of theorem 2. The
|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 Jordan-Dedekind chain condition.
Rl follows from the definition of p in a Jordan-Dedekind space, and R2 is ...
|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 ...
|Щ Jordan decomposition ÏÏfo^iftfâ* Jordan decomposition of signed measure |
Jordan-Dedekind chain condition Jordan-Dedekind ... Jordan-Dedekind space ft
fa Ч Jordan domain £-&ЗК# Jordan form Jordan form matrix Jordan half interval 3
|In section 3 we consider the case of a closure space with the Jordan-Dedekind |
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 ...
|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
|Note that the name combinatorial geometry is often used for finitary DLS, the |
name independence space is used for finitary ... Jordan-Dedekind's condition,
independence sets and bases If S is an FDLS, then the lattice Lat S satisfies the ...