Constrained intervals, intervals as a mapping from [0, 1] to polynomials of degree one (linear functions) with non-negative slopes, and arithmetic on constrained intervals generate a space that turns out to be a cancellative abelian monoid albeit with a richer set of properties than the usual (standard) space of interval arithmetic. This means that not only do we have the classical embedding as developed by H. Radström, S. Markov, and the extension of E. Kaucher but the properties of these polynomials. We study the geometry of the embedding of intervals into a quasilinear space and some of the properties of the mapping of constrained intervals into a space of polynomials. It is assumed that the reader is familiar with the basic notions of i...
In interval computations, the range of each intermediate result r is described by an interval [r]. T...
[Markov Svetoslav; Марков Светослав]Algebraic systems, abstracting properties of intervals, arc disc...
We introduce and study abstract algebraic systems generalizing the arithmetic systems of intervals a...
In Interval Analysis addition of intervals is the usual Minkowski addition of sets. The fact that th...
This dissertation is devoted to solving systems of nonlinear equations. It presents a survey of vari...
An interval space is a set with a ternary relation satisfying some axioms that support the interpre...
Introduced in the 1950s as a method to deal with the uncertainty of errors, Interval Analysis, a kin...
We study interval-valued constraint satisfaction problems (CSPs), in which the aim is to find an ass...
We argue that Dedekind completeness and the Heine–Borel property should be seen as part of the “alge...
For any partially ordered abelian group G, we relate the structure of the ordered monoid ?(G) of int...
Abstract. The idea of interval arithmetic, proposed by Moore, is to enclose the exact value of a rea...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
a b s t r a c t An interval problem is a problemwhere the unknown variables take interval values. Su...
In interval computations, the range of each intermediate result r is described by an interval [r]. T...
[Markov Svetoslav; Марков Светослав]Algebraic systems, abstracting properties of intervals, arc disc...
We introduce and study abstract algebraic systems generalizing the arithmetic systems of intervals a...
In Interval Analysis addition of intervals is the usual Minkowski addition of sets. The fact that th...
This dissertation is devoted to solving systems of nonlinear equations. It presents a survey of vari...
An interval space is a set with a ternary relation satisfying some axioms that support the interpre...
Introduced in the 1950s as a method to deal with the uncertainty of errors, Interval Analysis, a kin...
We study interval-valued constraint satisfaction problems (CSPs), in which the aim is to find an ass...
We argue that Dedekind completeness and the Heine–Borel property should be seen as part of the “alge...
For any partially ordered abelian group G, we relate the structure of the ordered monoid ?(G) of int...
Abstract. The idea of interval arithmetic, proposed by Moore, is to enclose the exact value of a rea...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
International audienceThis paper organizes the topologic forms of the possible relations between gen...
a b s t r a c t An interval problem is a problemwhere the unknown variables take interval values. Su...
In interval computations, the range of each intermediate result r is described by an interval [r]. T...
[Markov Svetoslav; Марков Светослав]Algebraic systems, abstracting properties of intervals, arc disc...
We introduce and study abstract algebraic systems generalizing the arithmetic systems of intervals a...