Glossary of order theory explained

This is a glossary of some terms used in various branches of mathematics that are related to the fields of order, lattice, and domain theory. Note that there is a structured list of order topics available as well. Other helpful resources might be the following overview articles:

In the following, partial orders will usually just be denoted by their carrier sets. As long as the intended meaning is clear from the context,

\leq

will suffice to denote the corresponding relational symbol, even without prior introduction. Furthermore, < will denote the strict order induced by

\leq.

A

B

XandY

is a subset of their Cartesian product

X x Y.

C

D

E

F

vee

Y =

vee

holds. Frames are also known as locales and as complete Heyting algebras.

G

H

X

is a subset of

X x X.

Said differently, it is a binary relation over

X

and itself.

I

wedge

X. The infimum of two elements may be written as inf or xy. If the set X is finite, one speaks of a finite infimum. The dual notion is called supremum. Interval finite poset. A partially ordered set P is interval finite if every interval of the form is a finite set.

J

L

M

O

P

(P,\leq),

or for short, is a set

P

together with a partial order

\leq

on

P.

(P,\leq)

is a set

P

together with a preorder

\leq

on

P.

Q

R

S

vee

X. The supremum of two elements may be written as sup or xy. If the set X is finite, one speaks of a finite supremum. The dual notion is called infimum.

T

U

V

X

, a valuation

\nu:X\to[0,1]

is strict (that is,

\nu(\varnothing)=0

), monotone, modular (that is,

\nu(U)+\nu(V)=\nu(U\cupV)+\nu(U\capV)

) and positive. Continuous valuations are a generalization of measures.

W

Z

References

The definitions given here are consistent with those that can be found in the following standard reference books:

Specific definitions:

Notes and References

  1. Book: Consistency, choice and rationality . Walter . Bossert . Kōtarō . Suzumura . Harvard University Press . 2010 . 978-0674052994 .