MEASUREMENT AND 3D VISUALIZATION OF THE HUMAN INTERNAL HEAT FIELD BY MEANS OF MICROWAVE RADIOMETRY
Статья
Sensors (Switzerland).
MDPI AG.
Том 21.
2021.
Sherman’s Operator Inequality
In this paper we deal with Sherman’s inequality and its complementary inequalities for operator convex functions, whose arguments are the bounded self-adjoint operators from C* -algebra on a Hilbert space and positive linear mappings between C* -algebras. We introduce the so called Sherman’s operator and study its properties. Applying an extended idea of convexity to operator functions of several variables, we obtain multidimensional Sherman’s operator inequality. We define multidimensional Sherman’s operator and study its properties. At the end, we observe applications to some operator inequalities related to connections, solidarities, and multidimensional weighted geometric mean. © Zagreb Paper JMI-15-49
Авторы
Bradanović S.I.1
,
Mićić J.2
,
Pečarić J.
2,
3
Издательство
Element D.O.O.
Номер выпуска
2
Язык
Английский
Страницы
675-699
Статус
Опубликовано
Ссылка
Том
15
Год
2021
Организации
- 1 Faculty of Civil Engineering Architecture and Geodesy, University of Split, Matice hrvatske 15, Split, 21000, Croatia
- 2 Zagreb, Croatia
- 3 RUDN University, Moscow, Russian Federation
Ключевые слова
complementary to Sherman’s operator inequality; multidimensional Sherman’s operator inequality; multidimensional weighted geometric mean; Operator convex function; positive linear mapping; Sherman’s inequality; Sherman’s operator
Дата создания
20.07.2021
Дата изменения
20.07.2021
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Другие записи
Journal of Mathematical Inequalities.
Element D.O.O..
Том 15.
2021.
С. 491-509