Downtown (Nevada gaming area)

"Downtown Las Vegas Area" is the name assigned by the Nevada Gaming Control Board NGCB which includes the Downtown Las Vegas area casinos and the Stratosphere Tower which is located 2 miles (3.2 km) from Fremont Street. The city of Las Vegas uses the term Downtown Gaming for the casinos near the Fremont Street Experience. The land is part of the 110 acres (45 ha) that were auctioned on May 15, 1905 when the city was founded.

Downtown competition

Currently downtown Las Vegas is the only place in Las Vegas where the casinos are clustered around an outdoor pedestrian zone. Caesars Entertainment has announced plans to build a similar venue with an observation wheel similar to the London Eye near the Flamingo.

In fiscal year 1988 the ratio of revenue for the Strip compared to downtown was less than 3:1. In FY2008 the ratio is over 10:1. However, downtown rode the massive increase in tourist spending from 2004 through 2007 that swelled the non-gaming revenue of the area. Non gaming revenue and income hit an all-time high in FY2006.

It's About Time (SWV album)

It's About Time is the debut studio album by American female R&B trio SWV, released by RCA Records on October 27, 1992 (see 1992 in music). It was certified triple platinum by the RIAA for more than three million copies shipped to store, and it spawned four hit singles with "I'm So into You", "Downtown", "Weak", and a remixed version of "Right Here/Human Nature." The latter two reached #1 on the R&B singles chart, with "Weak" being their biggest pop hit at #1. A remixed version of "Anything" appeared on the soundtrack of the film Above the Rim in 1994 and was released as the final single from It's About Time.

In 1993, the group earned 11 Billboard Music Award nominations for their debut album. In October 2004, I'm So into You appeared in popular videogame Grand Theft Auto: San Andreas, playing on fictional new jack swing radio station CSR 103.9.

In 1996, the album was certified 3x platinum, for shipping over 3,000,000 albums in the U.S. alone.

Track Listing

*Initially issued without track 15, but was added to all subsequent CDs in April 1993
*Copies of the album with the catalog number BMG 66074 contain "Right Here (Vibe Mix)" (4:18), as the final track

Downtown (owarai)

Downtown (ダウンタウン, Dauntaun) is a Japanese comedy duo from Amagasaki, Hyōgo consisting of Hitoshi Matsumoto and Masatoshi Hamada. Formed in 1982, they are one of the most influential and prolific comedy duos in Japan today. They are best known for their stand-up acts, hosting numerous Japanese variety shows (such as Downtown no Gaki no Tsukai ya Arahende!! and Hey! Hey! Hey! Music Champ) and their sarcastic, short-tempered stage personas.

As a result of their massive popularity and the relative domination of their employer, Yoshimoto Kogyo, the Kansai dialect (in which both performers usually speak) has come to be associated with Japanese comedy (owarai) as a whole.

Members

Background

Childhood and school years

Matsumoto and Hamada attended and met at Ushio Elementary School in Amagasaki, Hyōgo of the Kansai region. They did not become friends until their second year in Amagasaki Taisei Junior High School, where they both joined the school's broadcasting club and called each other Mattsun (まっつん) and Hama-chon (はまちょん). It is then Matsumoto joked about becoming a comedy duo together and planted the idea into their heads. At the time, Matsumoto was part of a manzai trio called "Koma Daisanshibu" with two of his classmates, Itō and Morioka.

Factor

Factor, a Latin word meaning "who/which acts", may refer to:

Commerce

Science and technology

Biology

Computer science and information technology

Factoring (finance)

Factoring is a financial transaction and a type of debtor finance in which a business sells its accounts receivable (i.e., invoices) to a third party (called a factor) at a discount. A business will sometimes factor its receivable assets to meet its present and immediate cash needs.Forfaiting is a factoring arrangement used in international trade finance by exporters who wish to sell their receivables to a forfaiter. Factoring is commonly referred to as accounts receivable factoring, invoice factoring, and sometimes accounts receivable financing. Accounts receivable financing is a term more accurately used to describe a form of asset based lending against accounts receivable.

Factoring is not the same as invoice discounting (which is called an "Assignment of Accounts Receivable" in American accounting – as propagated by FASB within GAAP). Factoring is the sale of receivables, whereas invoice discounting ("assignment of accounts receivable" in American accounting) is a borrowing that involves the use of the accounts receivable assets as collateral for the loan. However, in some other markets, such as the UK, invoice discounting is considered to be a form of factoring, involving the "assignment of receivables", that is included in official factoring statistics. It is therefore also not considered to be borrowing in the UK. In the UK the arrangement is usually confidential in that the debtor is not notified of the assignment of the receivable and the seller of the receivable collects the debt on behalf of the factor. In the UK, the main difference between factoring and invoice discounting is confidentiality.

Von Neumann algebra

In mathematics, a von Neumann algebra or W*-algebra is a *-algebra of bounded operators on a Hilbert space that is closed in the weak operator topology and contains the identity operator. They were originally introduced by John von Neumann, motivated by his study of single operators, group representations, ergodic theory and quantum mechanics. His double commutant theorem shows that the analytic definition is equivalent to a purely algebraic definition as an algebra of symmetries.

Two basic examples of von Neumann algebras are as follows. The ring L^∞(R) of essentially bounded measurable functions on the real line is a commutative von Neumann algebra, which acts by pointwise multiplication on the Hilbert space L²(R) of square integrable functions. The algebra B(H) of all bounded operators on a Hilbert space H is a von Neumann algebra, non-commutative if the Hilbert space has dimension at least 2.

Von Neumann algebras were first studied by von Neumann (1930) in 1929; he and Francis Murray developed the basic theory, under the original name of rings of operators, in a series of papers written in the 1930s and 1940s (F.J. Murray & J. von Neumann 1936, 1937, 1943; J. von Neumann 1938, 1940, 1943, 1949), reprinted in the collected works of von Neumann (1961).