# general+or+abstract+notion

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**Abstract algebra**— This article is about the branch of mathematics. For the Swedish band, see Abstrakt Algebra. The permutations of Rubik s Cube have a group structure; the group is a fundamental concept within abstract algebra. Abstract algebra is the subject area …2

**General relativity**— For a generally accessible and less technical introduction to the topic, see Introduction to general relativity. General relativity Introduction Mathematical formulation Resources …3

**Abstract nonsense**— Abstract nonsense, or general abstract nonsense, alternatively general nonsense, is a popular term used by mathematicians to describe certain kinds of arguments and concepts in category theory or applications.HistoryThe term predates the… …4

**Abstract rewriting system**— In mathematical logic and theoretical computer science, an abstract rewriting system (also (abstract) reduction system or abstract rewrite system; abbreviation ARS) is a formalism that captures the quintessential notion and properties of… …5

**Abstract labour and concrete labour**— Part of a series on Marxism …6

**Abstract idea**— Idea I*de a, n.; pl. {Ideas}. [L. idea, Gr. ?, fr. ? to see; akin to E. wit: cf. F. id[ e]e. See {Wit}.] 1. The transcript, image, or picture of a visible object, that is formed by the mind; also, a similar image of any object whatever, whether… …7

**General position**— In algebraic geometry, general position in a notion of genericity for a set of points, or other geometric objects. It means the general case situation, as opposed to some more special or coincidental cases that are possible. Its precise meaning… …8

**abstract**— ab|stract1 [ æb,strækt, æb strækt ] adjective ** 1. ) abstract ideas exist as thoughts in the mind, and are not related to physical objects or real events and actions: abstract idea/concept/principle/notion: Mathematics is concerned with… …9

**General Formal Ontology**— The General Formal Ontology (GFO) is an upper ontology integrating processes and objects. [ Herre, H.; Heller, B.; Burek, P.; Hoehndorf, R.; Loebe, F. Michalek, H.. General Formal Ontology (GFO): A Foundational Ontology Integrating Objects and… …10

**Mathematics of general relativity**— For a generally accessible and less technical introduction to the topic, see Introduction to mathematics of general relativity. General relativity Introduction Mathematical formulation Resources …11

**American Abstract Artists**— (AAA) was formed in 1936 in New York City, to promote and foster public understanding of abstract art. American Abstract Artists exhibitions, publications, and lectures helped to establish the organization as a major forum for the exchange and… …12

**Alternatives to general relativity**— are physical theories that attempt to describe the phenomena of gravitation in competition to Einstein s theory of general relativity.There have been many different attempts at constructing an ideal theory of gravity. These attempts can be split… …13

**Course in General Linguistics**— (Cours de linguistique générale) is an influential book compiled by Charles Bally and Albert Sechehaye that is based on notes taken from Ferdinand de Saussure s lectures at the University of Geneva between the years 1906 and 1911. It was… …14

**The General Theory of Employment, Interest, and Money**— infobox Book | name = The General Theory of Employment, Interest and Money author = John Maynard Keynes country = United Kingdom language = English genre = Nonfiction publisher = Palgrave Macmillan release date = 1936 media type = Print Paperback …15

**concept**— n. Universal, general or abstract notion, conception. See idea …16

**algebra**— /al jeuh breuh/, n. 1. the branch of mathematics that deals with general statements of relations, utilizing letters and other symbols to represent specific sets of numbers, values, vectors, etc., in the description of such relations. 2. any of… …17

**Henry of Ghent and Duns Scotus**— Stephen Dumont LIFE AND WORKS Henry of Ghent Henry of Ghent was arguably the most influential Latin theologian between Thomas Aquinas and Duns Scotus, regent as a leading master of theology at the University of Paris for the better part of the… …18

**Character mask**— Part of a series on Marxism …19

**Hegelians (The Young), Feuerbach, and Marx**— The Young Hegelians, Feuerbach, and Marx Robert Nola Largely through lectures delivered at the University of Berlin, Hegel built up a circle of followers, mainly contemporaries or pupils, who were intent on working out aspects of the… …20

**Philosophy of mathematics**— The philosophy of mathematics is the branch of philosophy that studies the philosophical assumptions, foundations, and implications of mathematics. The aim of the philosophy of mathematics is to provide an account of the nature and methodology of …