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Bloomberg Barclays Global Aggregate Float-Adjusted and Scaled Index (AUD hedged) AUS 0.2 VCF Vanguard: Vanguard International Credit Securities Index Fund (Hedged) Bloomberg Barclays Global Aggregate Corporate and Government-Related Scaled Index (AUD hedged) AUS 0.3 VEFI Vanguard: Vanguard Ethically Conscious Global Aggregate Bond Index Fund
Bloomberg Barclays Global Aggregate Bond Index; Citi World Broad Investment-Grade Bond Index (WorldBIG) ... First Boston High-Yield II Index; S&P US Issued High-Yield ...
The iBoxx bond index family, which launched in 2001, was the first comprehensive suite of independent, transparent and multiple-contributor priced bond indices. iBoxx was ) created by the International Index Company Limited (IIC), which was acquired by Markit Group Limited in 2007. [1]
The index includes all fixed-rate bonds with a remaining maturity of one year or longer and with amounts outstanding of at least the equivalent of US$25 million. Government securities typically exclude floating or variable rate bonds, US/Canadian savings bonds and private placements. It is not possible to invest directly in such an index.
An external debt version, the EMBI+ is the JPMorgan EMBI Global Index [1] In addition to serving as a benchmark, the EMBI+ provides investors with a definition of the market for emerging markets external-currency debt, a list of the instruments traded, and a compilation of their terms.
The index was subsequently renamed the Bloomberg Barclays US Aggregate Bond Index. Upon its acquisition, Bloomberg and Barclays announced that the index would be co-branded for an initial term of five years. [5] In August 2021, Bloomberg announced the renaming of the index as the Bloomberg US Aggregate Bond Index. [2]
If the template has a separate documentation page (usually called "Template:template name/doc"), add [[Category:Stock market index templates]] to the <includeonly> section at the bottom of that page.
An index can rigorously apply microeconomic- and aggregation-theoretic foundations in the construction of monetary aggregates. That approach to monetary aggregation was derived and advocated by William A. Barnett (1980) and has led to the construction of monetary aggregates based on Diewert's (1976) class of superlative quantity index numbers.