In complex analysis, the Blaschke product is a bounded analytic function in the open unit disc constructed to have zeros at a (finite or infinite) sequence of prescribed complex numbers
- a0, a1, ...
inside the unit disc.
Blaschke products were introduced by Wilhelm Blaschke (1915). They are related to Hardy spaces.
Read more about Blaschke Product: Definition, Szegő Theorem, Finite Blaschke Products
Famous quotes containing the word product:
“Poetry, whose material is language, is perhaps the most human and least worldly of the arts, the one in which the end product remains closest to the thought that inspired it.... Of all things of thought, poetry is the closest to thought, and a poem is less a thing than any other work of art ...”
—Hannah Arendt (1906–1975)
Related Phrases
Related Words