Formulation and linearization of boundary value problems: From observables to a mathematical model

Design of the Blast Furnace Wall Structure Made of Efficient Materials. Part 4. Calculation Examples

Stroitel nye Materialy ◽

10.31659/0585-430x-2020-786-11-30-34 ◽

2020 ◽

Vol 786 (11) ◽

pp. 30-34

Author(s):

A.M. IBRAGIMOV ◽

◽

L.Yu. GNEDINA ◽

Keyword(s):

Heat Transfer ◽

Mathematical Model ◽

Blast Furnace ◽

Boundary Value Problems ◽

Transfer Process ◽

Rational Design ◽

Boundary Value ◽

Heat Transfer Process ◽

Furnace Wall ◽

Time Interval

This work is part of a series of articles under the general title The structural design of the blast furnace wall from efficient materials [1–3]. In part 1, Problem statement and calculation prerequisites, typical multilayer enclosing structures of a blast furnace are considered. The layers that make up these structures are described. The main attention is paid to the lining layer. The process of iron smelting and temperature conditions in the characteristic layers of the internal environment of the furnace is briefly described. Based on the theory of A.V. Lykov, the initial equations describing the interrelated transfer of heat and mass in a solid are analyzed in relation to the task – an adequate description of the processes for the purpose of further rational design of the multilayer enclosing structure of the blast furnace. A priori the enclosing structure is considered from a mathematical point of view as the unlimited plate. In part 2, Solving boundary value problems of heat transfer, boundary value problems of heat transfer in individual layers of a structure with different boundary conditions are considered, their solutions, which are basic when developing a mathematical model of a non-stationary heat transfer process in a multi-layer enclosing structure, are given. Part 3 presents a mathematical model of the heat transfer process in the enclosing structure and an algorithm for its implementation. The proposed mathematical model makes it possible to solve a large number of problems. Part 4 presents a number of examples of calculating the heat transfer process in a multilayer blast furnace enclosing structure. The results obtained correlate with the results obtained by other authors, this makes it possible to conclude that the new mathematical model is suitable for solving the problem of rational design of the enclosing structure, as well as to simulate situations that occur at any time interval of operation of the blast furnace enclosure.

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Mathematical model implementation in conditions of uncertainty and possible risks

Energy and automation ◽

10.31548/energiya2021.04.137 ◽

2021 ◽

pp. 137-145

Author(s):

A. Kravtsov ◽

◽

D. Levkin ◽

O. Makarov ◽

◽

...

Keyword(s):

Thermal Conductivity ◽

Mathematical Model ◽

Differential Equations ◽

Boundary Value Problem ◽

Boundary Value Problems ◽

Layer Structure ◽

Boundary Value ◽

Goal Function ◽

Cauchy Problems ◽

System Of Differential Equations

The article presents the theoretical and methodological principles for forecasting and mathematical modeling of possible risks in technological and biotechnological systems. The authors investigated in details the possible approach to the calculation of the goal function and its parameters. Considerable attention is paid to substantiating the correctness of boundary value problems and Cauchy problems. In mechanics, engineering, and biology, Cauchy problems and boundary value problems of differential equations are used to model physical processes. It is important that differential equations have a single physically sound solution. The authors of this article investigate the specific features of boundary value problems and Cauchy problems with boundary conditions in a two-point medium, and determine the conditions for the correctness of such problems in the spaces of power growth functions. The theory of pseudo-differential operators in the space of generalized functions was used to prove the correctness of boundary value problems. The application of the obtained results will make it possible to guarantee the correctness of mathematical models built in conditions of uncertainty and possible risks. As an example of a computational mathematical model that describes the state of the studied object of non-standard shape, the authors considered the boundary value problem of the system of differential equations of thermal conductivity for the embryo under the action of a laser beam. For such a boundary value problem, it is impossible to guarantee the existence and uniqueness of the solution of the system of differential equations. To be sure of the existence of a single solution, it is necessary either not to take into account the three-layer structure of the microbiological object, or to determine the conditions for the correctness of the boundary value problem. Applying the results obtained by the authors, the correctness of the boundary value problem of systems of differential equations of thermal conductivity for the embryo is proved taking into account the three-layer structure of the microbiological object. This makes it possible to increase the accuracy and speed of its implementation on the computer. Key words: forecasting, risk, correctness, boundary value problems, conditions of uncertainty

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Experimental Implications of Bochner-Levy-Riesz Diffusion

Fractional Calculus and Applied Analysis ◽

10.1515/fca-2015-0022 ◽

2015 ◽

Vol 18 (2) ◽

Cited By ~ 3

Author(s):

Rudolf Hilfer

Keyword(s):

Mathematical Model ◽

Boundary Value Problems ◽

Boundary Value ◽

Nonlocal Boundary ◽

Transport Processes ◽

Nonlocal Boundary Value Problems

AbstractFractional Bochner-Levy-Riesz diffusion arises from ordinary diffusion by replacing the Laplacean with a noninteger power of itself. Bochner- Levy-Riesz diffusion as a mathematical model leads to nonlocal boundary value problems. As a model for physical transport processes it seems to predict phenomena that have yet to be observed in experiment.

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