This Interval arithmetic or interval mathematics developed in 1950’s and 1960’s by mathematicians as an approach to putting bounds on rounding errors and measurement error in mathematical computations. However no proper interval algebraic structures have been defined or studies. In this book we for the first time introduce several types of interval linear algebras and study them. <br
Interval arithmetic is a fundamental and reliable mathematical machinery for scientific computing an...
The arithmetic on the extended set of proper and improper intervals is an algebraic completion of th...
The mathematical models of physical systems may be only approximations, because the characteristics ...
The purpose of this article is to put the concept of interval linear algebra on a sound algebraic se...
Interval arithmetic is the mathematical structure, which for real intervals defines operations analo...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
By using a new set of arithmetic operations on interval numbers, we discuss some arithmetic properti...
First, basic aspects of interval analysis, roles of intervals and their applications are addressed. ...
The arithmetic on the extended set of proper and improper intervals is an algebraic completion of th...
Many application-oriented mathematical models deal with real numbers. In real life, due to the inevi...
AbstractWe give an overview on applications of interval arithmetic. Among others we discuss verifica...
Abstract: Many application-oriented mathematical models deal with real numbers. In real life, due to...
Interval arithmetic is a fundamental and reliable mathematical machinery for scientific computing an...
The arithmetic on the extended set of proper and improper intervals is an algebraic completion of th...
The mathematical models of physical systems may be only approximations, because the characteristics ...
The purpose of this article is to put the concept of interval linear algebra on a sound algebraic se...
Interval arithmetic is the mathematical structure, which for real intervals defines operations analo...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
By using a new set of arithmetic operations on interval numbers, we discuss some arithmetic properti...
First, basic aspects of interval analysis, roles of intervals and their applications are addressed. ...
The arithmetic on the extended set of proper and improper intervals is an algebraic completion of th...
Many application-oriented mathematical models deal with real numbers. In real life, due to the inevi...
AbstractWe give an overview on applications of interval arithmetic. Among others we discuss verifica...
Abstract: Many application-oriented mathematical models deal with real numbers. In real life, due to...
Interval arithmetic is a fundamental and reliable mathematical machinery for scientific computing an...
The arithmetic on the extended set of proper and improper intervals is an algebraic completion of th...
The mathematical models of physical systems may be only approximations, because the characteristics ...
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