2. Уровень распределения (пограничный)
Следующим рассматриваемым уровнем является промежуточный или пограничный уровень. Основной задачей пограничной сети является доставка мультимедийного трафика от оборудования пользовательского доступа по различным интерфейсам с обеспечением необходимого качества сервиса. Для решения этой задачи необходимо использовать специальные "мультимедийные" мультиплексоры, позволяющие использовать традиционные сети передачи данных для одновременной передачи данных различной природы.
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)
Рис. 5. Построение пограничной сети
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