Languages
Suzuki, Takashi.
Overview
| Works: | 1 works in 4 publications in 1 languages | |
|---|---|---|
Titles
Chemotaxis, reaction, network = mathematics for self-organization /
by:
Suzuki, Takashi.
(Electronic resources)
Mean field theories and dual variation - mathematical structures of the Mesoscopic model
by:
Suzuki, Takashi.; SpringerLink (Online service)
(Electronic resources)
General equilibrium analysis of production and increasing returns
by:
Suzuki, Takashi.; World Scientific (Firm)
(Electronic resources)
Methods of mathematical oncology = Fusion of Mathematics and Biology, Osaka, Japan, October 26-28, 2020 /
by:
Fusion of Mathematics and Biology ((2020 :); Suzuki, Takashi.; SpringerLink (Online service)
(Electronic resources)
Non-local partial differential equations for engineering and biology = mathematical modeling and analysis /
by:
Kavallaris, Nikos I.; Suzuki, Takashi.; SpringerLink (Online service)
(Electronic resources)
Applied analysis = mathematical methods in natural science /
by:
Suzuki, Takashi.; NetLibrary, Inc.; Senba, Takasi.
(Language materials, printed)
Free Energy and Self-Interacting Particles
by:
SpringerLink (Online service); Suzuki, Takashi.
(Electronic resources)
Subjects
Appl.Mathematics/Computational Methods of Engineering.
Mathematical Biology in General.
Computer Appl. in Life Sciences.
Self-organizing systems.
Geometry, Differential.
Applications of Mathematics.
Chemotaxis.
Calculus of variations.
Genetics and Population Dynamics.
Industrial Chemistry/Chemical Engineering.
Chemical kinetics.
Lattice dynamics.
Mathematics.
Mathematical Methods in Physics.
Equilibrium (Economics)- Mathematical models.
Mathematical physics.
Analysis.
Thermodynamics.
Math. Applications in Chemistry.
Physiological, Cellular and Medical Topics.
Mathematical analysis.
Differential equations, Parabolic.
Partial Differential Equations.
Biomathematics.
Statistical mechanics.
Calculus of Variations and Optimal Control; Optimization.
Engineering.
Theoretical and Applied Mechanics.
Oncology- Mathematics
Mathematical Modeling and Industrial Mathematics.
Differential equations, Partial.
Mathematical Applications in the Physical Sciences.
Mathematical Models of Cognitive Processes and Neural Networks.