Finitemathematics
The term finitemathematics refers either to discrete mathematics , or to a course conventionally required ... basic probability theory , an introduction to linear programming , some theory of matrix mathematics ..
Finite
wiktionary Finite is the opposite of infinite. It may refer to Having a finite number of elements finite set Being a finite number, so not equal to math pm infty math all real number s are finite In a stronger ..
Locally finite
The term locally finite has a number of different meanings in mathematics Locally finite collection of sets in a topological space Locally finite group Locally finite measure Locally finite poset disambig ..
K-finite
In mathematics , a K finite function is a type of generalized trigonometric polynomial . Here K is some ... in a finite dimensional subspace. One implication here is trivial, and the other, starting from a finite ..
Finite morphism
In algebraic geometry , a branch of mathematics , a morphism math f X rightarrow Y math of scheme theory scheme s is a finite morphism , if math Y math has an open cover by affine schemes math V i Spec ..
Mathematics
pp semi vandalism small yes dablink Maths and Math redirect here. For other uses of Mathematics or Math , see Mathematics disambiguation and Math disambiguation . Image Euclid.jpg right thumb 220px Euclid ..
Finite set
In mathematics , a Set mathematics set is called finite if there is a bijection between the set and some ... of infinite sets and thus advocate a mathematics based solely on finite sets. Mainstream mathematicians ..
Finite group
In mathematics , a finite group is a group mathematics group which has finite set finite ly many elements. Some aspects of the theory of finite groups were investigated in great depth in the twentieth ..
Finite geometry
Books by Hirschfeld on finite geometry Category Classical geometry Category Applied mathematics ...A finite geometry is any geometry geometric system that has only a finite set finite number of point ..
Finite difference
A finite difference is a mathematical expression of the form f x b &minus f x a . If a finite difference is divided by b &minus a , one gets a difference quotient . The approximation of derivatives by finite ..
Finite field mathematics field that contains only finitely many elements. Finite fields are important in number theory ..., i.e., n 1. An example of such a finite field is the Ring mathematics ring Z p Z . It is a finite ..
Finite thickness
In formal language formal language theory , a class of languages math mathcal L math has finite thickness if for every string s , there are only finite consistent languages in math mathcal L math . This condition ..
Finite verb
A finite verb is a verb that is Inflection inflected for grammatical person person and for grammatical tense tense according to the rules and categories of the languages in which it occurs. Finite verbs ..
Finite topology
It is possible for a topology to be finite in the sense that there are only finitely many open sets. This is an extreme case which has been investigated from a combinatorial point of view. The term finite ..
Locally finite group
In mathematics , in the field of group theory , a locally finite group is a type of group mathematics group that can be studied in ways analogous to a finite group . Sylow subgroup s, Carter subgroup s, and abelian ..
Point finite collection
Unreferenced date July 2008 In mathematics , a collection math mathcal U math of subsets of a topological space math X math is said to be point finite or a point finite collection if every point of math ..
Set system of finite character
A family math mathcal F math of Set mathematics sets is of finite character provided it has the following properties For each math A in mathcal F math , every finite set finite subset of math A math belongs ..
Residually finite group
In the mathematics mathematical field of group theory , a Group mathematics group G is residually finite ... h from G to a finite group, such that math h g neq 1. , math There are a number of equivalent ..
Ordinary mathematics
expert portal Mathematics In the philosophy of mathematics , ordinary mathematics is an inexact term, used to distinguish the body of most mathematical work from that of, for example, constructivism mathematics ..
Hereditarily finite set
In mathematics , hereditarily finite sets are defined recursion recursively as finite set s containing only hereditarily finite sets with the empty set as a base case . Informally, a hereditarily finite ..
Locally finite measure
In mathematics , a locally finite measure is a Measure mathematics measure for which every point of the measure space has a Neighbourhood mathematics neighbourhood of finite measure. Definition Let X , T be a Hausdorff ..
Locally finite collection
In the mathematics mathematical field of topology , local finiteness is a property of collections of subset ... dimension . A collection of subsets of a topological space X is said to be locally finite , if each ..
Finite model theory
order logic , over finite structures, such as finite group s, graph mathematics graph s, database ... A Short Course on Finite Model Theory . Department of Mathematics, University of Helsinki. Based ..
Aperiodic finite state automaton
An aperiodic finite state automaton is a finite state automaton whose transition monoid is aperiodic ... by an automaton with a finite and aperiodic transition monoid . This celebrated result of algebraic ..
?-finite measure
lowercase ? finite measure redirect In mathematics , a positive or signed measure signed measure mathematics ... finite , if &mu X is a finite real number rather than . The measure &mu is called ? finite , if X is the countable ..
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