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RC
1998

When Is the Product of Intervals Also an Interval?

13 years 11 months ago
When Is the Product of Intervals Also an Interval?
Interval arithmetic is based on the fact that for intervals on the real line, the element-wise product of two intervals is also an interval. This property is not always true: e.g., it is not true if we consider intervals on the set of integers instead of intervals on the set of real numbers. When is an element-wise product or a sum of two intervals always an interval? In this paper, we analyze this problem in a general algebraic setting: we need the corresponding algebraic structures to have (related) addition, multiplication, and order; thus, we consider (consistently) ordered rings. We describe all consistently ordered rings for which the element-wise product and sum of two intervals are always intervals.
Olga Kosheleva, Piet G. Vroegindeweij
Added 23 Dec 2010
Updated 23 Dec 2010
Type Journal
Year 1998
Where RC
Authors Olga Kosheleva, Piet G. Vroegindeweij
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