A Measure Associated with a Convex Surface and Its Limit Cone

This discussion explores the measure associated with a convex surface and its limit cone. In three-dimensional Euclidean space, a convex surface at infinity tends toward a cone of rotation, referred to as the limit cone. The boundedness of the difference between the area of the convex surface and that of the limit cone is established as a whole. The proof utilizes the flat sections of the surface, formed by intersecting planes that pass through the cone’s axis of symmetry. © Pleiades Publishing, Ltd. 2025.

Авторы
Ashyralyev Allaberen 1, 2, 3 , Artykbaev A. 4
Журнал
Lobachevskii Journal of Mathematics
Издательство
Pleiades Publishing
Номер выпуска
5
Язык
Английский
Страницы
2312-2316
Статус
Опубликовано
Ссылка
Внешняя ссылка
DOI
10.1134/S1995080224607987
Том
46
Год
2025
Организации
  • 1 Department of Mathematics, Bahçeşehir Üniversitesi, Istanbul, Turkey
  • 2 Institute of Mathematics and Mathematical Modeling, Almaty, Kazakhstan
  • 3 RUDN University, Moscow, Moscow Oblast, Russian Federation
  • 4 Tashkent State Transport University, Tashkent, Uzbekistan
Ключевые слова
arc length; asymptote; convex surface; improper integral; limit; limit cone; support plane; surface area
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