- In mathematics,
hyperfunctions are
generalizations of functions, as a 'jump' from one
holomorphic function to
another at a boundary, and can be thought...
-
mathematician known for
founding the
fields of
algebraic analysis,
hyperfunctions, and
holonomic quantum fields. He was a
professor at the
Research Institute...
-
microfunction can be used to
define a Sato's
hyperfunction. By definition, the
sheaf of Sato's
hyperfunctions on M is the
restriction of the
sheaf of microfunctions...
- hypofunction/hyposecretion (leading to
hormone deficiency)
Endocrine gland hyperfunction/hy****cretion (leading to
hormone excess)
Tumours (benign or malignant)...
- edge-of-the-wedge
theorem has a
natural interpretation in the
language of
hyperfunctions. A
hyperfunction is
roughly a sum of
boundary values of
holomorphic functions...
- and
derived categories.
Schapira received his
doctorate for work on
hyperfunctions.
Although these were
already in use in
France by André Martineau, they...
- (such as in
hemolytic anemias),
which suggests that it is a
response to
hyperfunction. It is
therefore not
surprising that
splenomegaly is ****ociated with...
-
Jonathan Cape. p. 471. Penrose, R (2004). "9:
Fourier decompositions and
hyperfunctions". The Road to Reality.
Jonathan Cape.
Physical Sciences. Encyclopædia...
-
convolution algebras that are
integral domains; and the
theories of
hyperfunctions,
based (in
their initial conception) on
boundary values of analytic...
- 546–551.
Original French text. Komatsu,
Hikosaburo (2002). "Fourier's
hyperfunctions and Heaviside's
pseudodifferential operators". In
Takahiro Kawai; Keiko...