- In
mathematical analysis,
microlocal analysis comprises techniques developed from the 1950s
onwards based on
Fourier transforms related to the
study of...
-
manifold of
dimension n, and let X be its complexification. The
sheaf of
microlocal functions on M is
given as H n ( μ M ( O X ) ⊗ o r M / X ) {\displaystyle...
- Tokyo.
Kashiwara made
leading contributions towards algebraic analysis,
microlocal analysis, D-module theory,
Hodge theory,
sheaf theory and representation...
- In mathematics,
generalized functions are
objects extending the
notion of
functions on real or
complex numbers.
There is more than one
recognized theory...
-
mathematician working in the
areas of
partial differential equations,
microlocal analysis,
scattering theory, and
inverse problems. He is
currently a professor...
-
mathematician working in the
areas of
partial differential equations,
microlocal analysis,
spectral theory and
mathematical physics. He is
currently a...
- of
sheaf theory. Further, it led to the
theory of
microfunctions and
microlocal analysis in
linear partial differential equations and
Fourier theory,...
-
linear differential operators, due to Lars Gårding, in the
context of
microlocal analysis.
Nonlinear differential equations are
hyperbolic if
their linearizations...
- In
mathematical analysis, more
precisely in
microlocal analysis, the wave
front (set) WF(f)
characterizes the
singularities of a
generalized function f...
- work in
mathematical analysis, and
particularly in
spectral geometry and
microlocal analysis. She is an ****ociate
professor of
mathematics at the University...
