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Generalized entropy optimization problems and the existence of their solutions

✍ Scribed by Aladdin Shamilov

Publisher
Elsevier Science
Year
2007
Tongue
English
Weight
172 KB
Volume
382
Category
Article
ISSN
0378-4371

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✦ Synopsis

In the present study we have formulated a generalization of entropy optimization problems (GEOP), proposed sufficient conditions for the existence of solution. We have suggested also a new method based on a priori evaluations and Newton's methods for calculation of Langrange multipliers. Mentioned method allows calculating Langrange multipliers by starting from arbitrary initial point for Newton's approximations of constructed auxiliary equation. The solution of auxiliary equation is chosen as initial point for second constructed auxiliary equation. The recurring mentioned process for finite time leads to achieve an initial point for Newton's approximations of given equation and allows to find its unknown solution.

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By applying the properties of the unique classical solution to the singular boundary value problem on half line -p (s) = g(p(s)); p(s) ΒΏ 0; s ∈ (0; ∞); p(0) = 0; limsβ†’βˆžp (s) = b ΒΏ 0, and constructing the new comparison functions, they show the existence and the optimal global estimates of solutions