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# The isometry group of a compact Riemannian manifold with negative Ricci curvature is discrete.
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# and isometry
# and group
# The eimeriorins are a diverse group that includes one host species of invertebrates, two-host species of invertebrates, one-host species of vertebrates and two-host species of vertebrates.
In 1990, Andersson scored a Swedish # 1 hit with " Lassie ", sung by female cabaret group Ainbusk, for whom he also wrote the Svensktoppen hits " Älska Mig " and " Drömmarnas Golv ".
* Honey Cone, an American R & B and soul singing girl group who was most famous for the # 1 hit " Want Ads "
# Communities of culture: range from the local clique, sub-culture, ethnic group, religious, multicultural or pluralistic civilisation, or the global community cultures of today.
Progressive rock group Pink Floyd, when creating their rock opera The Wall, used disco-style components in their song, " Another Brick in the Wall, Part 2 " ( 1979 )— which became the group's only # 1 hit single ( in both the US and UK ).
* Comedy Band The Barron Knights ' 1978 UK # 3 hit single A Taste Of Aggro, a medley of parodies, included a version of The Smurf Song featuring, in place of the Smurfs, a group of bank robbers from Catford who have escaped from Dartmoor Prison.
# Cumulated dienes have the double bonds sharing a common atom as in a group of compounds called allenes.
The song " Boadicea ", also from this album, would later be sampled by The Fugees on their single " Ready or Not " ( 1996 ), causing a brief stir because the group neither sought permission from Enya nor gave her credit initially, and by Mario Winans, who did give her credit ( the Winans track, " I Don't Wanna Know " which features a rap by P. Diddy and is officially credited to all three artists, became Enya's highest charting single in the US, when it peaked at # 2 on the Hot 100 in 2004 ).
The primary benefit promised by ECC is a smaller key size, reducing storage and transmission requirements — i. e., that an elliptic curve group could provide the same level of security afforded by an RSA-based system with a large modulus and correspondingly larger key — e. g., a 256bit ECC public key should provide comparable security to a 3072bit RSA public key ( see # Key sizes ).
# Kerguelen (), a group of volcanic islands in the southern Indian Ocean, southeast of Africa, approximately equidistant between Africa, Antarctica and Australia ;
# soleá, within the cantiñas group of palos which includes the alegrías, cantiñas, mirabras, romera, caracoles and soleá por bulería ( also " bulería por soleá "): 1 2 3 4 5 6 7 8 9 10 11 12.
# and compact
# Chromatin undergoes condensation into compact patches against the nuclear envelope ( also known as the perinuclear envelope ) in a process known as pyknosis, a hallmark of apoptosis.
# Multiple histones wrap into a 30 nm fibre consisting of nucleosome arrays in their most compact form ( heterochromatin ).
The # 1 has always been sought after by shooters who appreciate the compact size of a single shot rifle, and the falling block action cuts about four inches off the length of the rifle for a given barrel length.
# A simpler system for compact storage of energy — a small volume of liquid converts to a large volume of pressurized gas.
# the algebras, sp ( p, n − p ), which are the Lie algebras of Sp ( p, n − p ), the indefinite signature equivalent to the compact form,
# Gauss – Bonnet theorem The integral of the Gauss curvature on a compact 2-dimensional Riemannian manifold is equal to 2πχ ( M ) where χ ( M ) denotes the Euler characteristic of M. This theorem has a generalization to any compact even-dimensional Riemannian manifold, see generalized Gauss-Bonnet theorem.
# The geodesic flow of any compact Riemannian manifold with negative sectional curvature is ergodic.
# If the injectivity radius of a compact n-dimensional Riemannian manifold is ≥ π then the average scalar curvature is at most n ( n-1 ).
# Myers ' theorem states that if the Ricci curvature is bounded from below on a complete Riemannian manifold by, then the manifold has diameter, with equality only if the manifold is isometric to a sphere of a constant curvature k. By a covering-space argument, it follows that any compact manifold of positive Ricci curvature must have finite fundamental group.
# A torus C < sup > n </ sup >/ Λ ( Λ a full lattice ) inherits a flat metric from the Euclidean metric on C < sup > n </ sup >, and is therefore a compact Kähler manifold.
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