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Diffusions, superdiffusions and partial differential equations
Interactions between the theory of partial differential equations of elliptic and parabolic types and the theory of stochastic processes are beneficial for both probability theory and analysis. At the beginning, mostly analytic results were used by probabilists. More recently, analysts (and physicis...
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| Lenguaje: | eng |
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American Mathematical Society
2002
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| Acceso en línea: | http://cds.cern.ch/record/2264187 |
| _version_ | 1780954333306683392 |
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| author | Dynkin, E B |
| author_facet | Dynkin, E B |
| author_sort | Dynkin, E B |
| collection | CERN |
| description | Interactions between the theory of partial differential equations of elliptic and parabolic types and the theory of stochastic processes are beneficial for both probability theory and analysis. At the beginning, mostly analytic results were used by probabilists. More recently, analysts (and physicists) took inspiration from the probabilistic approach. Of course, the development of analysis in general and of the theory of partial differential equations in particular, was motivated to a great extent by problems in physics. A difference between physics and probability is that the latter provides |
| id | cern-2264187 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2002 |
| publisher | American Mathematical Society |
| record_format | invenio |
| spelling | cern-22641872021-04-21T19:13:30Zhttp://cds.cern.ch/record/2264187engDynkin, E BDiffusions, superdiffusions and partial differential equationsMathematical Physics and MathematicsInteractions between the theory of partial differential equations of elliptic and parabolic types and the theory of stochastic processes are beneficial for both probability theory and analysis. At the beginning, mostly analytic results were used by probabilists. More recently, analysts (and physicists) took inspiration from the probabilistic approach. Of course, the development of analysis in general and of the theory of partial differential equations in particular, was motivated to a great extent by problems in physics. A difference between physics and probability is that the latter provides American Mathematical Societyoai:cds.cern.ch:22641872002 |
| spellingShingle | Mathematical Physics and Mathematics Dynkin, E B Diffusions, superdiffusions and partial differential equations |
| title | Diffusions, superdiffusions and partial differential equations |
| title_full | Diffusions, superdiffusions and partial differential equations |
| title_fullStr | Diffusions, superdiffusions and partial differential equations |
| title_full_unstemmed | Diffusions, superdiffusions and partial differential equations |
| title_short | Diffusions, superdiffusions and partial differential equations |
| title_sort | diffusions, superdiffusions and partial differential equations |
| topic | Mathematical Physics and Mathematics |
| url | http://cds.cern.ch/record/2264187 |
| work_keys_str_mv | AT dynkineb diffusionssuperdiffusionsandpartialdifferentialequations |