- Neil
Sidney Trudinger (born 20 June 1942) is an
Australian mathematician,
known particularly for his work in the
field of
nonlinear elliptic partial differential...
- In
mathematical analysis,
Trudinger's theorem or the
Trudinger inequality (also
sometimes called the Moser–
Trudinger inequality) is a
result of functional...
- 2443. doi:10.1109/34.368173. S2CID 9505101.
Gilbarg &
Trudinger 1983,
Lemma 14.16.
Gilbarg &
Trudinger 1983,
Equation (14.98). Zhao Hongkai. A fast sweeping...
-
number of
closely related dialects which together,
according to
Ronald Trudinger were "spoken over a
wider area of
Australia than any
other Aboriginal...
-
Moser found the
sharp constant in
Trudinger's inequality, with the
corresponding result often known as the Moser–
Trudinger inequality. In the late 1950s,...
- Formula". YouTube.
Retrieved 9
January 2018.
Gilbarg &
Trudinger 2001,
Theorem 8.6
Gilbarg &
Trudinger 2001,
Corollary 8.11 MathWorld. "Vector Laplacian"...
-
developments in the
works of Olga Ladyzhenskaya,
James Serrin, and Neil
Trudinger,
among others.
Their work,
based primarily on the
judicious choice of...
- general.
Compare Evans (2010, p. 311) and
Gilbarg &
Trudinger (2001, pp. 31, 441).
Gilbarg &
Trudinger 2001,
Chapter 17. John 1982,
Chapter 6; Ladyzhenskaya...
- 1962, pp. 273–274;
Gilbarg &
Trudinger 2001,
Theorem 2.9;
Protter &
Weinberger 1984,
Section 2.10.
Gilbarg &
Trudinger 2001,
Theorems 2.7 and 2.8. Sources...
- (sometimes sign
conventions may vary;
compare (Evans 1998) and (Gilbarg &
Trudinger 1983)). For example, for d = 3 {\displaystyle d=3} we have Γ ( x ) = −...
