A poset (i.e., partially ordered set) P is called A-inductive iff every nonempty well ordered subset W of P has a supremum (i.e., least upper bound) wich need not be an element of W
Abstract The theory of partially ordered sets (posets, for short) proved to have crucial application...
summary:It is consistent with the axioms of set theory that there are two co-dense partial orders, o...
AbstractLet P be a ranked partially ordered set. An h-family is a subset of P such that no h + 1 ele...
A poset (i.e., partially ordered set) P is called A-inductive iff every nonempty well ordered subset...
AbstractThe definition scheme, “A poset P is Z-inductive if it has a subposet B of Z-compact lements...
Abstract. In this paper some aspects of the fixedpoint theory of posets are studied. A new type of s...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
Several` “classical” results on algebraic complete lattices extend to algebraic posets and, more gen...
Gives the basic definitions and theorems of similar partially ordered sets; studies finite partially...
It may be said of certain pairs of elements of a set that one element precedes the other. If the col...
© 2020, PleiadesT Publishing,T Ltd. Abstract: We survey the research on the inductive systems of C*-...
The main topics of this dissertation are devoted to the study of the partially ordered sets (posets,...
This article extends a paper of Abraham and Bonnet which generalised the famous Hausdorff characteri...
In this paper, the notion of derivation on partially ordered sets or posets is introduced and studie...
1 Starting from a supercompact cardinal κ, we force and construct a model in which κ is both the lea...
Abstract The theory of partially ordered sets (posets, for short) proved to have crucial application...
summary:It is consistent with the axioms of set theory that there are two co-dense partial orders, o...
AbstractLet P be a ranked partially ordered set. An h-family is a subset of P such that no h + 1 ele...
A poset (i.e., partially ordered set) P is called A-inductive iff every nonempty well ordered subset...
AbstractThe definition scheme, “A poset P is Z-inductive if it has a subposet B of Z-compact lements...
Abstract. In this paper some aspects of the fixedpoint theory of posets are studied. A new type of s...
AbstractThe principle of inclusion-exclusion on semilattices is extended on partially ordered sets a...
Several` “classical” results on algebraic complete lattices extend to algebraic posets and, more gen...
Gives the basic definitions and theorems of similar partially ordered sets; studies finite partially...
It may be said of certain pairs of elements of a set that one element precedes the other. If the col...
© 2020, PleiadesT Publishing,T Ltd. Abstract: We survey the research on the inductive systems of C*-...
The main topics of this dissertation are devoted to the study of the partially ordered sets (posets,...
This article extends a paper of Abraham and Bonnet which generalised the famous Hausdorff characteri...
In this paper, the notion of derivation on partially ordered sets or posets is introduced and studie...
1 Starting from a supercompact cardinal κ, we force and construct a model in which κ is both the lea...
Abstract The theory of partially ordered sets (posets, for short) proved to have crucial application...
summary:It is consistent with the axioms of set theory that there are two co-dense partial orders, o...
AbstractLet P be a ranked partially ordered set. An h-family is a subset of P such that no h + 1 ele...