Sailor (song)

"Sailor" is the title of the English-language rendering of the 1959 schlager composition "Seemann (Deine Heimat ist das Meer)" originally written in German by Werner Scharfenberger (de) and lyricist Fini Busch (de): featuring lyrics in English by Norman Newell (writing as David West), "Sailor" would in 1961 afford Petula Clark her first UK #1 hit, simultaneously granting Top Ten success to Anne Shelton while also bringing her chart career to a close. Clark was also afforded international success with both her recording of "Sailor" and also with Marin the French-language rendering of the song.

Original German-language version

see Sailor (Your Home is the Sea)#Original German-language version.

English-language version

Composition

Lyricist Norman Newell would recall that his publisher phoned him on a Friday requesting he write English lyrics for Lolita's hit "Sailor (Your Home is the Sea)": although Newell agreed to prepare the lyrics over the weekend the assignment slipped his mind until a messenger arrived Monday morning to pick up Newell's work. "I sent [the messenger] to the canteen and wrote the lyric 'Sailor' in ten minutes." While the original German lyrics of the song had addressed a seafaring love object with an acceptance of his wanderlust the lyrics written by Newell - as David West - inverted this sentiment turning the song into a plea for the sailor to return.

Sailor (album)

Sailor is the second studio album by American rock band The Steve Miller Band, released in October 1968 by Capitol Records. Like The Steve Miller Band's previous album, Children of the Future, Sailor was produced by Glyn Johns; but unlike its predecessor which was recorded in London, England, Sailor was recorded in Los Angeles, California. It was the last Steve Miller Band album to feature contributions by original members Boz Scaggs and Jim Peterman.

"Living in the U.S.A." was covered in 1969 by Wilmer & the Dukes.

Track listing

Personnel

Sailor (disambiguation)

A sailor is part of a crew on a ship or boat.

Sailor may also refer to:

Entertainment

People

Surname

Nickname

Dimension (song)

"Dimension" is a song by Australian hard rock band Wolfmother, featured on their 2005 debut studio album Wolfmother. Written by band members Andrew Stockdale, Chris Ross and Myles Heskett, it was released as the second single from the album in Europe (and the third single overall) on 17 April 2006, charting at number 49 on the UK Singles Chart.

Music video

Directed by The Malloys, the music video for "Dimension" was first aired in the week of 13 February 2006. Prior to this, the video was featured on the 2006 extended play (EP) Dimensions.

Critical reception

In a review of Wolfmother for Blender, writer Jonah Weiner identified "Dimension" as an example of the band "at [their] hardest", describing it as an "acid anthem".NME reviewer James Jam described the song as "a throb of gonzo metal not unlike Black Sabbath playing Motown".

Track listing

All songs written and composed by Andrew Stockdale, Chris Ross, Myles Heskett. 

References

Dimensional analysis

In engineering and science, dimensional analysis is the analysis of the relationships between different physical quantities by identifying their fundamental dimensions (such as length, mass, time, and electric charge) and units of measure (such as miles vs. kilometers, or pounds vs. kilograms vs. grams) and tracking these dimensions as calculations or comparisons are performed. Converting from one dimensional unit to another is often somewhat complex. Dimensional analysis, or more specifically the factor-label method, also known as the unit-factor method, is a widely used technique for such conversions using the rules of algebra.

The concept of physical dimension was introduced by Joseph Fourier in 1822. Physical quantities that are commensurable have the same dimension; if they have different dimensions, they are incommensurable. For example, it is meaningless to ask whether a kilogram is less, the same, or more than an hour.

Any physically meaningful equation (and likewise any inequality and inequation) will have the same dimensions on the left and right sides, a property known as "dimensional homogeneity". Checking this is a common application of dimensional analysis. Dimensional analysis is also routinely used as a check on the plausibility of derived equations and computations. It is generally used to categorize types of physical quantities and units based on their relationship to or dependence on other units.

Krull dimension

In commutative algebra, the Krull dimension of a commutative ring R, named after Wolfgang Krull, is the supremum of the lengths of all chains of prime ideals. The Krull dimension need not be finite even for a Noetherian ring. More generally the Krull dimension can be defined for modules over possibly non-commutative rings as the deviation of the poset of submodules.

The Krull dimension has been introduced to provide an algebraic definition of the dimension of an algebraic variety: the dimension of the affine variety defined by an ideal I in a polynomial ring R is the Krull dimension of R/I.

A field k has Krull dimension 0; more generally, k[x₁, ..., x_n] has Krull dimension n. A principal ideal domain that is not a field has Krull dimension 1. A local ring has Krull dimension 0 if and only if every element of its maximal ideal is nilpotent.

Explanation

We say that a chain of prime ideals of the form has length n. That is, the length is the number of strict inclusions, not the number of primes; these differ by 1. We define the Krull dimension of to be the supremum of the lengths of all chains of prime ideals in .