Downset
Downset may refer to: * Downset lattice * Down set *Downset., an American rap metal band *''downset.'', the 1994 self-titled debut studio album *"Downset Downset may refer to: * Downset lattice * Down set * Downset., an American rap metal band *'' downset.'', the 1994 self-titled debut studio album *" Downset", the title track of the self-titled 1994 album by downset. {{disambiguation ...", the title track of the self-titled 1994 album by downset. {{disambiguation ...
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Downset (song)
''downset.'' is the debut studio album by American rapcore band downset. The band's major label debut, it was released on July 12, 1994 by Mercury Records.According to Rey Oropeza, the album has sold 275,000 copies worldwide. Track listing Personnel Adapted from Tidal{{Cite web , title=Credits / Downset / Downset - TIDAL , url=https://listen.tidal.com/album/3892830/credits , website=Tidal and liner notes. downset. * Rey Oropeza – vocals, songwriting * James Morris – bass guitar, songwriting * Chris Lee – drums, songwriting * Brian "Ares" Schwarger – guitar, songwriting * Rogelio "Roy" Lozano – guitar, songwriting Production * Roy Z. – production, mixing, engineering, songwriting (2–4, 6–10) * Joe Floyd – mixing, engineering (on tracks 1, 3–5, 10) * Sean Kenesie – mixing, engineering (on tracks 1, 3–5, 10) * Shay Bay – mixing, engineering (on tracks 2, 6–9) Artwork Barry Greenhut – artwork, design A design is a plan or specification fo ...
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Downset
Downset may refer to: * Downset lattice * Down set *Downset., an American rap metal band *''downset.'', the 1994 self-titled debut studio album *"Downset Downset may refer to: * Downset lattice * Down set * Downset., an American rap metal band *'' downset.'', the 1994 self-titled debut studio album *" Downset", the title track of the self-titled 1994 album by downset. {{disambiguation ...", the title track of the self-titled 1994 album by downset. {{disambiguation ...
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Downset Lattice
In mathematics, an upper set (also called an upward closed set, an upset, or an isotone set in ''X'') of a partially ordered set (X, \leq) is a subset S \subseteq X with the following property: if ''s'' is in ''S'' and if ''x'' in ''X'' is larger than ''s'' (that is, if s \leq x), then ''x'' is in ''S''. In words, this means that any ''x'' element of ''X'' that is \,\geq\, to some element of ''S'' is necessarily also an element of ''S''. The term lower set (also called a downward closed set, down set, decreasing set, initial segment, or semi-ideal) is defined similarly as being a subset ''S'' of ''X'' with the property that any element ''x'' of ''X'' that is \,\leq\, to some element of ''S'' is necessarily also an element of ''S''. Definition Let (X, \leq) be a preordered set. An in X (also called an , an , or an set) is a subset U \subseteq X that is "closed under going up", in the sense that :for all u \in U and all x \in X, if u \leq x then x \in U. The dual notion is a ( ...
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Down Set
In mathematics, an upper set (also called an upward closed set, an upset, or an isotone set in ''X'') of a partially ordered set (X, \leq) is a subset S \subseteq X with the following property: if ''s'' is in ''S'' and if ''x'' in ''X'' is larger than ''s'' (that is, if s \leq x), then ''x'' is in ''S''. In words, this means that any ''x'' element of ''X'' that is \,\geq\, to some element of ''S'' is necessarily also an element of ''S''. The term lower set (also called a downward closed set, down set, decreasing set, initial segment, or semi-ideal) is defined similarly as being a subset ''S'' of ''X'' with the property that any element ''x'' of ''X'' that is \,\leq\, to some element of ''S'' is necessarily also an element of ''S''. Definition Let (X, \leq) be a preordered set. An in X (also called an , an , or an set) is a subset U \subseteq X that is "closed under going up", in the sense that :for all u \in U and all x \in X, if u \leq x then x \in U. The dual notion is a ( ...
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