Local regularity properties of almost- and quasiminimal sets with a sliding boundary condition /
We study the boundary regularity of almost minimal and quasiminimal sets that satisfy sliding boundary conditions. The competitors of a set E are defined as F=?1(E), where {{u03C6}t} is a one parameter family of continuous mappings defined on E, and that preserve a given collection of boundary piece...
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| Format: | Book |
| Language: | English |
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Paris :
Société Mathématique de France,
2019
Paris : Société Mathématique de France, [2019] Paris : 2019 |
| Series: | Astérisque ;
411 Astérisque ; 411 Astérisque 411 Astérisque ; 411 Astérisque 411 |
| Subjects: |
Internet
Stanford University
| Call Number: |
ISIL:US-CST QA1 .A78 V.411 |
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University of Chicago
| Call Number: |
QA379.D38 2019 |
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Johns Hopkins University
| Call Number: |
QA379.D38 2019 |
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Harvard University
| Call Number: |
N 142 no. 411 QA1 .S6 no.411 |
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Duke University
| Call Number: |
QA379 .D38 2019 |
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Dartmouth College
| Call Number: |
QA1 .A85 no.411 |
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Princeton University
| Call Number: |
QA379 .D38 2019 |
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Columbia University
| Call Number: |
QA1 .A82 v.411 |
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University of Pennsylvania
| Call Number: |
QA1 .A85 v.411 |
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Brown University
| Call Number: |
QA379 .D38 2019 |
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