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Milman Parry ( June 20, 1902 – December 3, 1935 ) was a scholar of epic poetry and the founder of the discipline of oral tradition.
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Milman and Parry
Milman Parry rigorously defended the observation that the extant Homeric poems are largely formulaic, and was led to postulate that they could be shown entirely formulaic if the complete corpus of Greek epic survived ; ;
Oral poetry may qualify as an epic, and Albert Lord and Milman Parry have argued that classical epics were fundamentally an oral poetic form.
Early twentieth-century study of living oral epic traditions in the Balkans by Milman Parry and Albert Lord demonstrated the paratactic model used for composing these poems.
Independent of the question of single authorship is the near-universal agreement, after the work of Milman Parry, that the Homeric poems are dependent on an oral tradition, a generations-old technique that was the collective inheritance of many singer-poets ( aoidoi ).
Albert Bates Lord examined oral narratives from field transcripts of Yugoslav oral bards collected by Milman Parry in the 1930s, and the texts of epics such as the Odyssey and Beowulf.
* The Milman Parry Collection of Oral Literature Online
Parry's collected papers were published posthumously: The Making of Homeric Verse: The Collected Papers of Milman Parry, edited by Adam Parry, his son ( Oxford University Press, 1971 ).
The Milman Parry collection of records and transcriptions of South Slavic heroic poetry is now in the Widener Library of Harvard University.
* The Milman Parry Collection at Harvard University
* The On-Line Database of Harvard's Milman Parry Collection of Oral Literature ( MPCOL )
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Albert Bates Lord ( September 15, 1912 – July 29, 1991 ) was a professor of Slavic and comparative literature at Harvard University who, after the death of Milman Parry, carried on that scholar's research into epic literature.
Nagy is known for extending Milman Parry and Albert Lord's theories about the oral composition-in-performance of the Iliad and Odyssey.
Milman and –
More generally: all uniformly convex Banach spaces are reflexive according to the Milman – Pettis theorem.
The Very Reverend Henry Hart Milman ( 10 February 1791 – 24 September 1868 ) was an English historian and ecclesiastic.
His nephew, Robert Milman ( 1816 – 1876 ), was Bishop of Calcutta from 1867 until his death, and was the author of a Life of Torquato Tasso ( 1850 ).
* W. M. Parker, ' Dean Milman and the Quarterly Review ', Quarterly Review, 293 ( 1955 ), 30 – 43
By the Krein – Milman theorem one can show without too much difficulty that for x an element of the Banach *- algebra A having an approximate identity:
* The Krein – Milman theorem states that if S is convex and compact in a locally convex space, then S is the closed convex hull of its extreme points: In particular, such a set has extreme points.
The Krein – Milman theorem is stated for locally convex topological vector spaces.
* Louisa Mary Milman, 15th Baroness Berkeley ( by birth: Berkeley ) ( 1840 – 1899 )
* Eva Mary Foley, 16th Baroness Berkeley ( by birth: Milman ) ( 1875 – 1964 ) ( abeyant 1964 )
The Axiom of Choice is equivalent to a fundamental result of point-set topology, Tychonoff's theorem, and also to the conjunction of two fundamental results of functional analysis, the Banach – Alaoglu theorem and the Krein – Milman theorem.
Chamber – Tchaikovsky: String Quartets No. 1-No. 3 / Souvenir de Florence ; Yuri Yurov ( va ), Mikhail Milman ( vc ), Borodin Quartet ; Teldec
* Ramsey – Dvoretzky – Milman phenomenon
2000, Special Volume, Part I, 118 – 161 .</ ref > It was further developed in the works of Milman and Gromov, Maurey, Pisier, Shechtman, Talagrand, Ledoux, and others.
* 1849 – 1868 Henry Milman
* 1821 – 1831 Henry Hart Milman
Here is a brilliancy illustrating White's attacking chances when the players castle on opposite sides in the Classical Variation: Lev Milman – Joseph Fang, Foxwoods Open, 2005
The proof is based on the Krein – Milman theorem.
Henry Hart Milman ( 1791 – 1868 ): 1818-1835
* Krein – Milman theorem
** Krein – Milman theorem
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