Sergio Albeverio
Sergio Albeverio (born 17 January 1939) is a Swiss mathematician and mathematical physicist working in numerous fields of mathematics and its applications. In particular he is known for his work in probability theory, analysis (including infinite dimensional, non-standard, and stochastic analysis), mathematical physics, and in the areas algebra, geometry, number theory, as well as in applications, from natural to social-economic sciences.He initiated (with Raphael Høegh-Krohn) a systematic mathematical theory of Feynman path integrals and of infinite dimensional Dirichlet forms and associated stochastic processes (with applications particularly in quantum mechanics, statistical mechanics and quantum field theory). He also gave essential contributions to the development of areas such as ''p''-adic functional and stochastic analysis as well as to the singular perturbation theory for differential operators. Other important contributions concern constructive quantum field theory and representation theory of infinite dimensional groups. He also initiated a new approach to the study of galaxy and planets formation inspired by stochastic mechanics. Provided by Wikipedia
Showing 1 - 12 results of 12
Refine Results
-
1EbookCall Number: Loading...
Located: Loading... -
2EbookCall Number: Loading...
Located: Loading... -
3Published 2008EbookCall Number: Loading...
Located: Loading... -
4EbookCall Number: Loading...
Located: Loading... -
5Published 2014EbookCall Number: Loading...
Located: Loading... -
6Published 2021EbookCall Number: Loading...
Located: Loading... -
7Published 2021EbookCall Number: Loading...
Located: Loading... -
8Published 2022EbookCall Number: Loading...
Located: Loading... -
9Published 2007EbookCall Number: Loading...
Located: Loading... -
10Published 2017EbookCall Number: Loading...
Located: Loading... -
11Published 2008EbookCall Number: Loading...
Located: Loading... -
12Published 2021EbookCall Number: Loading...
Located: Loading...
Search Tools:
RSS Feed
–
Email Search
Related Subjects
Mathematical models
Cities and towns
Stochastic processes
Complexity (Philosophy)
Computational complexity
Differentiable dynamical systems
Dimensional analysis
Dirichlet forms
Dynamics
Feynman integrals
Fluid dynamics
Geometry, Analytic
Growth
Hydrodynamics
Mathematical analysis
Mathematical physics
Navier-Stokes equations
Number theory
Numerical solutions
Quantum theory
Spectral theory (Mathematics)
Stochastic analysis
Stochastic differential equations
Systems and standards
Time
Urbanization