Languages
Ruzhansky, Michael.
Overview
| Works: | 1 works in 8 publications in 1 languages | |
|---|---|---|
Titles
Methods of Fourier analysis and approximation theory
by:
Ruzhansky, Michael.; SpringerLink (Online service); Tikhonov, Sergey.
(Electronic resources)
Evolution equations of hyperbolic and schrodinger typeasymptotics, estimates and nonlinearities /
by:
Ruzhansky, Michael.; SpringerLink (Online service); Sugimoto, Mitsuru.; Wirth, Jens.
(Electronic resources)
Hardy inequalities on homogeneous groups100 years of Hardy inequalities /
by:
Ruzhansky, Michael.; SpringerLink (Online service); Suragan, Durvudkhan.
(Electronic resources)
Analysis and partial differential equationsperspectives from developing countries : Imperial College London, UK, 2016 /
by:
Delgado, Julio.; Ruzhansky, Michael.; SpringerLink (Online service)
(Electronic resources)
Advances in real and complex analysis with applications
by:
Ruzhansky, Michael.; SpringerLink (Online service)
(Electronic resources)
Modern aspects of the theory of partial differential equations
by:
Ruzhansky, Michael.; SpringerLink (Online service); Wirth, Jens.
(Electronic resources)
Pseudo-differential operators and symmetriesbackground analysis and advanced topics /
by:
Ruzhansky, Michael.; SpringerLink (Online service); Turunen, Ville.
(Electronic resources)
Fourier analysispseudo-differential operators, time-frequency analysis and partial differential equations /
by:
Ruzhansky, Michael.; SpringerLink (Online service); Turunen, Ville.
(Electronic resources)
Quantization on Nilpotent lie groups
by:
Fischer, Veronique.; Ruzhansky, Michael.; SpringerLink (Online service)
(Electronic resources)
Analytic methods in interdisciplinary applications
by:
Mityushev, Vladimir V.; Ruzhansky, Michael.; SpringerLink (Online service)
(Electronic resources)
Subjects
Schrodinger equation.
Operator Theory.
Numerical Analysis.
Potential theory (Mathematics)
Pseudodifferential operators.
Global Analysis and Analysis on Manifolds.
Evolution equations.
Real Functions.
Nilpotent Lie groups.
Topological Groups, Lie Groups.
Mathematics.
Analysis.
Approximation theory.
Potential Theory.
Functional Analysis.
Fourier Analysis.
Numbers, Complex.
Harmonic analysis.
Global differential geometry.
Partial Differential Equations.
Fourier analysis.
Mathematical analysis.
Mathematical Physics.
Calculus of Variations and Optimal Control; Optimization.
Abstract Harmonic Analysis.
Sequences, Series, Summability.
Functional analysis.
Differential Geometry.
Differential equations, Partial.
Differential equations, Hyperbolic.
Mathematical Applications in the Physical Sciences.
Topological groups.