John Barleycorn Must Die

John Barleycorn Must Die is the fourth studio album by the English rock band Traffic, released in 1970, on Island Records in the United Kingdom, and United Artists in the United States, catalogue UAS 5504. It peaked at number 5 on the Billboard 200, their highest charting album in the US, and has been certified a gold record by the RIAA. In addition, the single "Empty Pages" spent eight weeks on the Billboard Hot 100, peaking at number 74. The album was marginally less successful in the UK, reaching number 11 on the UK Albums Chart.

Background and content

In late 1968, Traffic disbanded, guitarist Dave Mason having left the group for the second time prior to the completion of the Traffic album. In 1969, Steve Winwood joined the supergroup Blind Faith, while drummer/lyricist Jim Capaldi and woodwinds player Chris Wood turned to session work. Wood and Winwood also joined Blind Faith's drummer Ginger Baker in his post-Blind Faith group Ginger Baker's Air Force for their first album.

Gay & Lesbian Advocates & Defenders

Gay & Lesbian Advocates & Defenders (GLAD) is a non-profit legal rights organization in the United States. The organization works to end discrimination based on sexual orientation, HIV status, and gender identity and expression. The organization primarily achieves this goal through litigation, advocacy, and education work in all areas of LGBT (lesbian, gay, bisexual, transgender) rights and the rights of people living with HIV. In addition, GLAD operates a legal information line, GLAD Answers, where LGBTQ & HIV+ residents of New England can receive attorney referrals and information about their rights.

Background

GLAD is based in Boston, Massachusetts, and serves the New England area of the United States. John Ward founded GLAD in 1978 in response to a sting operation conducted by Boston police that resulted in the arrest of more than a hundred men in the men's rooms of the main building of the Boston Public Library. GLAD filed its first case, Doe v. McNiff, that same year and eventually all those arrested were either found not guilty or had the charges against them dismissed. An early victory came in Fricke v. Lynch (1980), in which GLAD represented Aaron Fricke, an 18-year-old student at Cumberland High School in Rhode Island, who won the right to bring a same-sex date to a high school dance.

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).