Objekt bezogen - traduction vers Anglais
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Objekt bezogen - traduction vers Anglais

ALGEBRAIC STRUCTURE OF OBJECTS AND MORPHISMS BETWEEN OBJECTS, WHICH CAN BE ASSOCIATIVELY COMPOSED IF THE (CO)DOMAINS AGREE
Object (category theory); Small category; Category (category theory); Large category; Locally small category; Category (math); Category (maths); Mathematical objekt; Locally small; Abstract category
  • A directed graph.

Objekt bezogen      
object oriented, operated or divided into objects and entities
object oriented         
  • C]] (black) competed for the top position.
PROGRAMMING PARADIGM BASED ON THE CONCEPT OF OBJECTS
Object-oriented; Object-oriented language; Object oriented; Object-oriented (programming); Object oriented programming; Object oriented language; Object orientated programming; Object-orientated programming; Object-oriented computer programming; Object-oriented languages; Object-Oriented Programming; Object-oriented SQL; Object-Oriented programming; Checking type instead of membership; Object system; Object Orientated; Object-oriented technology; Object orientated; Object Oriented; OOPL; Objected-oriented programming language; Object technology; Object oriented programming language; Object orentation; Object-oriented code; Obect-oriented programming; Object-oriented programming language; Object oriented programing; History of object oriented programming; Object Oriented Programming; Principles of OOP; Object-oriented Programming; Object-Oriented Software Engineering; Object decoupling; Object-oriented computing; Criticism of object-oriented programming; Object-oriented programming languages; OOSE; Dot notation (object-oriented programming); Object-oriented programming system; Object-oriented design patterns; Object-oriented software engineering; Formal semantics of object-oriented languages
Objekt bezogen (gerichtet nach bestimmten Objekten)
object oriented analysis         
  • The [[Waterfall Model]].
TECHNICAL APPROACH FOR ANALYZING AND DESIGNING AN APPLICATION, SYSTEM, OR BUSINESS
OOAD; OOA&D; Object Oriented Class Design Principles; Object Oriented Analysis; Object-Oriented Analysis and Design; Object oriented analysis and design
objekt-bezogenene Analyse, methodische Analyse die die einzelnen Teile und die verbindenden Gemeinsamkeiten der Objekte definiert

Wikipédia

Category (mathematics)

In mathematics, a category (sometimes called an abstract category to distinguish it from a concrete category) is a collection of "objects" that are linked by "arrows". A category has two basic properties: the ability to compose the arrows associatively and the existence of an identity arrow for each object. A simple example is the category of sets, whose objects are sets and whose arrows are functions.

Category theory is a branch of mathematics that seeks to generalize all of mathematics in terms of categories, independent of what their objects and arrows represent. Virtually every branch of modern mathematics can be described in terms of categories, and doing so often reveals deep insights and similarities between seemingly different areas of mathematics. As such, category theory provides an alternative foundation for mathematics to set theory and other proposed axiomatic foundations. In general, the objects and arrows may be abstract entities of any kind, and the notion of category provides a fundamental and abstract way to describe mathematical entities and their relationships.

In addition to formalizing mathematics, category theory is also used to formalize many other systems in computer science, such as the semantics of programming languages.

Two categories are the same if they have the same collection of objects, the same collection of arrows, and the same associative method of composing any pair of arrows. Two different categories may also be considered "equivalent" for purposes of category theory, even if they do not have precisely the same structure.

Well-known categories are denoted by a short capitalized word or abbreviation in bold or italics: examples include Set, the category of sets and set functions; Ring, the category of rings and ring homomorphisms; and Top, the category of topological spaces and continuous maps. All of the preceding categories have the identity map as identity arrows and composition as the associative operation on arrows.

The classic and still much used text on category theory is Categories for the Working Mathematician by Saunders Mac Lane. Other references are given in the References below. The basic definitions in this article are contained within the first few chapters of any of these books.

Any monoid can be understood as a special sort of category (with a single object whose self-morphisms are represented by the elements of the monoid), and so can any preorder.