# 52572

## Автор(ов):

2

Параметры публикации

## Тип публикации:

Статья в журнале/сборнике

## Название:

Coincidence points of multivalued mappings in (q 1, q 2)-quasimetric spaces

• Moscow

2017

## Страницы:

438-441
Аннотация
The properties of (q1, q2)-quasimetric spaces are examined. Multivalued covering mappings between (q1, q2)-quasimetric spaces are investigated. Given two multivalued mappings between (q1, q2)-quasimetric spaces such that one of them is covering and the other satisfies the Lipschitz condition, sufficient conditions for these mappings to have a coincidence point are obtained. A theorem on the stability of coincidence points with respect to small perturbations in the considered mappings is proved.

## Библиографическая ссылка:

Арутюнов А.В., Грешнов А.В. Coincidence points of multivalued mappings in (q 1, q 2)-quasimetric spaces / Doklady Mathematics. Moscow: Pleades Publishing, Ltd., 2017. С. 438-441.

Да