dc.contributor.author |
Salakhudinov R. |
|
dc.date.accessioned |
2019-01-22T20:51:43Z |
|
dc.date.available |
2019-01-22T20:51:43Z |
|
dc.date.issued |
2018 |
|
dc.identifier.issn |
1995-0802 |
|
dc.identifier.uri |
https://dspace.kpfu.ru/xmlui/handle/net/149143 |
|
dc.description.abstract |
© 2018, Pleiades Publishing, Ltd. Denote by P(G) the torsional rigidity of a simply connected plane domain G, and by I2(G) the Euclidean moment of inertia of G. In 1995 F.G. Avkhadiev proved that P(G) and I2(G) are comparable quantities in sense of Pólya and Szegö. Moreover, it was shown that the ratio P(G) /I2(G) belongs to the segment [1, 64]. We investigate the following conjecture P(G) ≥ 3I2(G), where G is a simply connected domain. We prove that the conjecture is true for polygonal domains circumscribed about a circle. For convex domains we show sharp isoperimetric inequalities, which justify the conjecture, in particular, we prove that P(G) > 2I2(G). Some aspects of approximate formulas for P(G) are also discussed. |
|
dc.relation.ispartofseries |
Lobachevskii Journal of Mathematics |
|
dc.subject |
Convex domain |
|
dc.subject |
Euclidean moments of a domain with respect to its boundary |
|
dc.subject |
Inradius of a domain |
|
dc.subject |
Isoperimetric inequality |
|
dc.subject |
Modified torsional rigidity |
|
dc.subject |
Torsional rigidity |
|
dc.subject |
Warping function |
|
dc.title |
A Note about Torsional Rigidity and Euclidean Moment of Inertia of Plane Domains |
|
dc.type |
Article |
|
dc.relation.ispartofseries-issue |
6 |
|
dc.relation.ispartofseries-volume |
39 |
|
dc.collection |
Публикации сотрудников КФУ |
|
dc.relation.startpage |
826 |
|
dc.source.id |
SCOPUS19950802-2018-39-6-SID85051076154 |
|