Search results
Results from the WOW.Com Content Network
A clique (AusE, CanE, UK: / ˈ k l iː k / or US: / ˈ k l ɪ k /; French:), in the social sciences, is a small group of individuals who interact with one another and share similar interests rather than include others. [1]
The idea of a "group mind" or "mob behavior" was first put forward by 19th-century social psychologists Gabriel Tarde and Gustave Le Bon.Herd behavior in human societies has also been studied by Sigmund Freud and Wilfred Trotter, whose book Instincts of the Herd in Peace and War is a classic in the field of social psychology.
A thesaurus (pl.: thesauri or thesauruses), sometimes called a synonym dictionary or dictionary of synonyms, is a reference work which arranges words by their meanings (or in simpler terms, a book where one can find different words with similar meanings to other words), [1] [2] sometimes as a hierarchy of broader and narrower terms, sometimes simply as lists of synonyms and antonyms.
Adolescent cliques are cliques that develop amongst adolescents.In the social sciences, the word "clique" is used to describe a group of 3 to 12 "who interact with each other more regularly and intensely than others in the same setting". [1]
The Clique (series) by Lisi Harrison The Clique, a novel in the series; The Clique, based on the series; Music groups. The Clique (American band), a late 1960s U.S. sunshine pop band from Houston; The Clique (British band), a 1990s mod band; Skeleton Clique, or the Clique, the fan base of American musical duo Twenty One Pilots
The company experienced a system issue that affected multiple products including account withdrawals, peer-to-peer payment service Venmo, online checkout and crypto. PayPal said the issue, which ...
The Getty Vocabulary Program is a department within the Getty Research Institute at the Getty Center in Los Angeles, California.It produces and maintains the Getty controlled vocabulary databases, Art and Architecture Thesaurus, Union List of Artist Names, and Getty Thesaurus of Geographic Names.
The characterization of cographs by the property that every clique and maximal independent set have a nonempty intersection is a stronger version of the defining property of strongly perfect graphs, in which there every induced subgraph contains an independent set that intersects all maximal cliques. In a cograph, every maximal independent set ...