In mathematics, Puiseux series are a generalization of power series that allow for negative and fractional exponents of the indeterminate. For example...
Puiseux may refer to Geography Puiseux, Ardennes, a French commune in the Ardennes department Puiseux, Eure-et-Loir, a French commune in the Eure-et-Loir...
Pierre Henri Puiseux (French: [pɥizø]; 20 July 1855 – 28 September 1928) was a French astronomer. Born in Paris, son of Victor Puiseux, he was educated...
Victor Alexandre Puiseux (French: [pɥizø]; 16 April 1820 – 9 September 1883) was a French mathematician and astronomer. Puiseux series are named after...
seen from the Durance valley. The summit of the mountain is called Pointe Puiseux (French: [pwɛ̃t pɥizø]). There are three subpeaks: Pointe Durand (3,932 m...
kissing number problem Newton's quotient Parallelogram of force Newton–Puiseux theorem Absolute space and time Luminiferous aether Newtonian series table...
France, he plays for the Cameroon national team. Wooh is a youth product of Puiseux Louvres, Chantilly and Nancy. He made his professional debut with Nancy...
series, the exponents of a monomial may be negative, and in the context of Puiseux series, the exponents may be rational numbers. Since the word "monomial"...
field of the Puiseux series in x. Thus f may be factored in factors of the form y − P ( x ) , {\displaystyle y-P(x),} where P is a Puiseux series. These...
geometrical entities by Felix Klein in 1893. In 1850 Victor Alexandre Puiseux took the key step of distinguishing between poles and branch points, and...
department of physical astronomy. He further spent a decade working with Pierre Puiseux on an atlas of the Moon composed of 10,000 photographs, L’Atlas photographique...
advantages for cell biology". European Journal of Cell Biology. 44: 349–370. Puiseux-Dao S (1970). Acetabularia and Cell Biology. New York: Springer Verlag...
C {\displaystyle \mathbb {C} } is isomorphic to the field of complex Puiseux series. However, specifying an isomorphism requires the axiom of choice...
series K ( ( t ) ) {\displaystyle K((t))} (integer powers), or the field of Puiseux series K { { t } } {\displaystyle K\{\{t\}\}} , or the field of Hahn series...
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