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Connection Slough
Connection may refer to: Mathematics * Connection (algebraic framework) * Connection (mathematics), a way of specifying a derivative of a geometrical object along a vector field on a manifold * Connection (affine bundle) *Connection (composite bundle) * Connection (fibred manifold) * Connection (principal bundle), gives the derivative of a section of a principal bundle * Connection (vector bundle), differentiates a section of a vector bundle along a vector field * Cartan connection, achieved by identifying tangent spaces with the tangent space of a certain model Klein geometry * Ehresmann connection, gives a manner for differentiating sections of a general fibre bundle * Electrical connection, allows the flow of electrons *Galois connection, a type of correspondence between two partially ordered sets * Affine connection, a geometric object on a smooth manifold which connects nearby tangent spaces *Levi-Civita connection, used in differential geometry and general relativity; differ ...
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Connection (algebraic Framework)
Geometry of quantum systems (e.g., noncommutative geometry and supergeometry) is mainly phrased in algebraic terms of modules and algebras. Connections on modules are generalization of a linear connection on a smooth vector bundle E\to X written as a Koszul connection on the C^\infty(X)-module of sections of E\to X. Commutative algebra Let A be a commutative ring and M an ''A''-module. There are different equivalent definitions of a connection on M. First definition If k \to A is a ring homomorphism, a k-linear connection is a k-linear morphism : \nabla: M \to \Omega^1_ \otimes_A M which satisfies the identity : \nabla(am) = da \otimes m + a \nabla m A connection extends, for all p \geq 0 to a unique map : \nabla: \Omega^p_ \otimes_A M \to \Omega^_ \otimes_A M satisfying \nabla(\omega \otimes f) = d\omega \otimes f + (-1)^p \omega \wedge \nabla f. A connection is said to be integrable if \nabla \circ \nabla = 0, or equivalently, if the curvature \nabla^2: M \to \Omeg ...
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Kim Se-yong
Kim Se-yong (; born November 20, 1991) is a South Korean singer, rapper, and actor. Signed to H2 Media, he made his debut with idol quintet Myname in 2011. Kim began his acting career two years prior, appearing on the television series ''Green Coach''. He released his first mini-album ''Connection'' independent from Myname in Japan in May 2019. Life and career 1991–2008: Early life Kim Se-yong was born on November 20, 1991, in Busan. In his youth, he aspired to become a soccer player. A friend uploaded Kim's photos onto an ulzzang website, which resulted in him being offered to become a trainee under JYP Entertainment. A representative of the agency traveled from Seoul to convince his parents to allow him to join, which they encouraged. Kim accepted the proposal and, attributing to other circumstances at the time, stopped playing the sport. While under the company, Kim wanted to become an actor and he enrolled at Seoul Institute of the Arts with a major in theater and fi ...
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Connexion (other)
Connexion is a variant spelling of connection and may refer to: Technology and Internet * Connexion by Boeing, an in-flight online connectivity service * Connexions (now called OpenStax CNX), a repository of open educational resources started at Rice University * Connexions (website), a website for the movements for social change in Canada Religion * Connexionalism, the theological understanding and foundation of Methodist ecclesiastical polity Other uses * ''The Connexion'', a monthly English-language newspaper for English-speakers in France * ''Connexion'' (game show), a Tamil celebrity game show on Vijay TV in India * "Connexion", a track on '' Late Night Tales: Matt Helders'' DJ mix album * Connexions (agency), a support service in the United Kingdom * ConneXions Leadership Academy, a middle school in Baltimore, Maryland See also * Connection (other) * Connexxion, a transport company in the Netherlands * Connexionsbuses Harrogate Coach Travel operates local ...
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Connections (other)
Connections may refer to: Television * '' Connections: An Investigation into Organized Crime in Canada'', a documentary television series * ''Connections'' (British documentary), a documentary television series and book by science historian James Burke * ''Connections'' (game show), a British game show of the 1980s Other *''Connections'', a social network analysis journal * ''Connections'' (journal), a military/defense periodical * ''Connections'' (video game), a 1995 educational adventure video game *Connections Academy, a free US public school that students attend from home *IBM Connections HCL Connections is a Web 2.0 enterprise social software application developed originally by IBM and acquired by HCL Technologies in July 2019. Connections is an enterprise-collaboration platform which helps teams work more efficiently. Connecti ..., a Web 2.0 enterprise social software application * ''Connections'' (album), a 2008 album by A. R. Rahman See also * Connexions (disa ...
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Connecting (TV Series)
''Connecting...'' is an American television sitcom co-created and co-executive produced by Martin Gero and Brendan Gall for Universal Television. The series premiered on October 8, 2020 on NBC. In November 2020, the series was canceled after four episodes. The remaining episodes were released on NBC.com and Peacock shortly after. Premise Set against the backdrop of the COVID-19 pandemic in the United States, the series follows the lives of a group of friends who try to stay connected via videotelephony as they navigate through the various nuances of life in a lockdown. Cast Main *Otmara Marrero as Annie *Parvesh Cheena as Pradeep *Keith Powell as Garrett *Jill Knox as Michelle *Shakina Nayfack as Ellis *Ely Henry as Rufus * Preacher Lawson as Ben Recurring *Cassie Beck as Jazmin Guest *Constance Marie as Martha Episodes Production On June 26, 2020, it received a straight-to-series order of 8 episodes by NBC. The first star to be cast in the series was Otmara Marrero on J ...
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Connectedness
In mathematics, connectedness is used to refer to various properties meaning, in some sense, "all one piece". When a mathematical object has such a property, we say it is connected; otherwise it is disconnected. When a disconnected object can be split naturally into connected pieces, each piece is usually called a ''component'' (or ''connected component''). Connectedness in topology A topological space is said to be ''connected'' if it is not the union of two disjoint nonempty open sets. A set is open if it contains no point lying on its boundary; thus, in an informal, intuitive sense, the fact that a space can be partitioned into disjoint open sets suggests that the boundary between the two sets is not part of the space, and thus splits it into two separate pieces. Other notions of connectedness Fields of mathematics are typically concerned with special kinds of objects. Often such an object is said to be ''connected'' if, when it is considered as a topological space, it is a ...
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Connected Sum
In mathematics, specifically in topology, the operation of connected sum is a geometric modification on manifolds. Its effect is to join two given manifolds together near a chosen point on each. This construction plays a key role in the classification of closed surfaces. More generally, one can also join manifolds together along identical submanifolds; this generalization is often called the fiber sum. There is also a closely related notion of a connected sum on knots, called the knot sum or composition of knots. Connected sum at a point A connected sum of two ''m''-dimensional manifolds is a manifold formed by deleting a ball inside each manifold and gluing together the resulting boundary spheres. If both manifolds are oriented, there is a unique connected sum defined by having the gluing map reverse orientation. Although the construction uses the choice of the balls, the result is unique up to homeomorphism. One can also make this operation work in the smooth categor ...
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Layover
250px, Layover for buses at LACMTA's Warner Center Transit Hub, Los Angeles ">Los_Angeles.html" ;"title="Warner Center Transit Hub, Los Angeles">Warner Center Transit Hub, Los Angeles In scheduled transportation, a layover (also waypoint, way station, or connection) is a point where a vehicle stops, with passengers possibly changing vehicles. In public transit, this typically takes a few minutes at a trip terminal. For air travel, where layovers are longer, passengers will exit the vehicle and wait in the terminal, often to board another vehicle traveling elsewhere. A stopover is a longer form of layover, allowing time to leave the transport system for sightseeing or overnight accommodation. History Historically, a way station was a facility for resting or changing a team of horses drawing a stagecoach. Typically a simple meal was available to passengers, who were also able to use Public toilet, restrooms. Basic overnight accommodations were sometimes available in remote ins ...
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Connection (dance)
In partner dancing, connection is a term that refers to physical, non-verbal communication between dancers to facilitate synchronized or coordinated dance movements. Some forms of connection involve "lead/follow" in which one dancer (the "lead") directs the movements of the other dancer (the "follower") by means of non-verbal directions conveyed through a physical connection between the dancers. In other forms, connection involves multiple dancers (more than two) without a distinct leader or follower (e.g. contact improvisation). Connection refers to a host of different techniques in many types of partner dancing, especially (but not exclusively) those that feature significant physical contact between the dancers, including the Argentine Tango, Lindy Hop, Balboa, East Coast Swing, West Coast Swing, Salsa, and other ballroom dances. Other forms of communication, such as visual cues or spoken cues, sometimes aid in connecting with one's partner, but are often used in specific circ ...
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Connection (film)
''Connection'' is a 2017 Indian film in Konkani, written and directed by Christ Sunjo Silva and produced by Sylvester Fernandes. This is Silva's third feature film, after ''Limits'' and ''Action''. The film utilizes a non-linear storytelling technique and flashbacks and is a thriller. It features Prince Jacob in the lead role of Father A father is the male parent of a child. Besides the paternal bonds of a father to his children, the father may have a parental, legal, and social relationship with the child that carries with it certain rights and obligations. An adoptive fathe ... Mark. The film also features Silva's father, tiatrist John D'Silva, in a role. Plot Father Mark ( Prince Jacob) is a kind priest who is very pious. He also loves books and is an author. One day, a prisoner approaches him to write a biography of his life. It is then revealed that Father Mark has a dark past which haunts him. Cast * Prince Jacob as Father Mark * John D’Silva * Benhur Silva ...
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Satiate
''Satiate'' is the debut album released by Avail in 1992. ''Satiate'' was originally released on the band's own Catheter-Assembly Records, then re-released on Old Glory Records later that year. In 1994, Lookout! Records Lookout Records (stylized as Lookout! Records) was an independent record label, initially based in Laytonville, California and later in Berkeley, focusing on punk rock. Established in 1987, the label is best known for having released Operation ... issued the album on CD with two additional tracks, taken from Avail's 7" release Attempt to Regress. Track listing The song "Mr. Morgan" is named after an elderly Richmond resident who was beaten to death for a few dollars. References {{Authority control 1992 debut albums Avail albums ...
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Unlimited Edition (album)
''Unlimited Edition'' is a compilation album by the band Can. Released in 1976 as a double album, it was an expanded version of the 1974 LP ''Limited Edition'' on United Artists Records which, as the name suggests, was a limited release of 15,000 copies (tracks 14–19 were added). The album collects unreleased music from throughout the band's history from 1968 until 1976, and both the band's major singers (Damo Suzuki and Malcolm Mooney) are featured. The cover photos were taken among the Elgin Marbles in the Duveen Gallery of the British Museum. Track notes The abbreviation "E.F.S.", appearing in several of the track titles, refers to ''Ethnological Forgery Series'', a series of songs in which Can self-consciously imitated various "world music" genres. "Mother Upduff" is a retelling of an urban legend involving a family whose grandmother dies while they are on holiday together, and whose corpse – left wrapped up on the roof of the family car – is later stolen along w ...
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