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On the differential structure of metric measure spaces and applications
The main goals of this paper are: (i) To develop an abstract differential calculus on metric measure spaces by investigating the duality relations between differentials and gradients of Sobolev functions. This will be achieved without calling into play any sort of analysis in charts, our assumptions...
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| Lenguaje: | eng |
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American Mathematical Society
2015
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| Acceso en línea: | http://cds.cern.ch/record/2264064 |
| _version_ | 1780954287514320896 |
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| author | Gigli, Nicola |
| author_facet | Gigli, Nicola |
| author_sort | Gigli, Nicola |
| collection | CERN |
| description | The main goals of this paper are: (i) To develop an abstract differential calculus on metric measure spaces by investigating the duality relations between differentials and gradients of Sobolev functions. This will be achieved without calling into play any sort of analysis in charts, our assumptions being: the metric space is complete and separable and the measure is Radon and non-negative. (ii) To employ these notions of calculus to provide, via integration by parts, a general definition of distributional Laplacian, thus giving a meaning to an expression like \Delta g=\mu, where g is a functi |
| id | cern-2264064 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2015 |
| publisher | American Mathematical Society |
| record_format | invenio |
| spelling | cern-22640642021-04-21T19:13:55Zhttp://cds.cern.ch/record/2264064engGigli, NicolaOn the differential structure of metric measure spaces and applicationsMathematical Physics and MathematicsThe main goals of this paper are: (i) To develop an abstract differential calculus on metric measure spaces by investigating the duality relations between differentials and gradients of Sobolev functions. This will be achieved without calling into play any sort of analysis in charts, our assumptions being: the metric space is complete and separable and the measure is Radon and non-negative. (ii) To employ these notions of calculus to provide, via integration by parts, a general definition of distributional Laplacian, thus giving a meaning to an expression like \Delta g=\mu, where g is a functiAmerican Mathematical Societyoai:cds.cern.ch:22640642015 |
| spellingShingle | Mathematical Physics and Mathematics Gigli, Nicola On the differential structure of metric measure spaces and applications |
| title | On the differential structure of metric measure spaces and applications |
| title_full | On the differential structure of metric measure spaces and applications |
| title_fullStr | On the differential structure of metric measure spaces and applications |
| title_full_unstemmed | On the differential structure of metric measure spaces and applications |
| title_short | On the differential structure of metric measure spaces and applications |
| title_sort | on the differential structure of metric measure spaces and applications |
| topic | Mathematical Physics and Mathematics |
| url | http://cds.cern.ch/record/2264064 |
| work_keys_str_mv | AT giglinicola onthedifferentialstructureofmetricmeasurespacesandapplications |