Choice of the regularization parameter for the Cauchy problem for the Laplace equation

Joachimiak, Magda

doi:10.1108/hff-10-2019-0730

Cited by 16 publications

(9 citation statements)

References 54 publications

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“…Recently, the stochastic epidemic models are increasingly investigated by many authors (Zhou and Zhang, 2016;Zhang et al, 2017;Liu et al, 2020;Seraphin Djaoue et al, 2020;Applebaum, 2009;Duan, 2015;Bao and Zhang, 2017;Tilahun et al, 2020;Tesfay et al, 2020) and different methods are adopted for the solution of non-linear systems in integer and fractional order see (Abbasbandy et al, 2017;Arqub, 2019;Joachimiak, 2020;Alchikh and Khuri, 2019;Bougoffa et al, 2016;Djilali, 2019;Djilali, 2018;Djilali, 2020a;Djilali, 2020b;Djilali et al, XXXX;Bentout et al, 2021;Djilali and Ghanbari, 2021). Moreover, moment closure techniques, supported by precise determinacy criteria and evolutive partial differential equations, are as well suitable instruments used in the analysis of similar systems see (Feng and Jin, 2018;Infusino and Kuna, 2020;Infusino et al, 2021;Li et al, 2019;Li and Viglialoro, 2021;Viglialoro and Woolley, 2020).…”

Section: Introductionmentioning

confidence: 99%

A stability analysis on a smoking model with stochastic perturbation

Zeb

Kumar

Tesfay

et al. 2021

HFF

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Purpose The purpose of this paper is to investigate the effects of irregular unsettling on the smoking model in form of the stochastic model as in the deterministic model these effects are neglected for simplicity. Design/methodology/approach In this research, the authors investigate a stochastic smoking system in which the contact rate is perturbed by Lévy noise to control the trend of smoking. First, present the formulation of the stochastic model and study the dynamics of the deterministic model. Then the global positive solution of the stochastic system is discussed. Further, extinction and the persistence of the proposed system are presented on the base of the reproductive number. Findings The authors discuss the dynamics of the deterministic smoking model form and further present the existence and uniqueness of non-negative global solutions for the stochastic system. Some previous study’s mentioned in the Introduction can be improved with the help of obtaining results, graphically present in this manuscript. In this regard, the authors present the sufficient conditions for the extinction of smoking for reproductive number is less than 1. Research limitations/implications In this work, the authors investigated the dynamic stochastic smoking model with non-Gaussian noise. The authors discussed the dynamics of the deterministic smoking model form and further showed for the stochastic system the existence and uniqueness of the non-negative global solution. Some previous study’s mentioned in the Introduction can be improved with the help of obtained results, clearly shown graphically in this manuscript. In this regard, the authors presented the sufficient conditions for the extinction of smoking, if <1, which can help in the control of smoking. Motivated from this research soon, the authors will extent the results to propose new mathematical models for the smoking epidemic in the form of fractional stochastic modeling. Especially, will investigate the effective strategies for control smoking throughout the world. Originality/value This study is helpful in the control of smoking throughout the world.

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Section: Introductionmentioning

confidence: 99%

A stability analysis on a smoking model with stochastic perturbation

Zeb

Kumar

Tesfay

et al. 2021

HFF

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“…In papers [10,11] the optimal choice of the geometry of the straight through seal to minimize the leakage was investigated. The search for the optimal seal geometry is an inverse problem of the geometric type [12][13][14] [15]. In this paper some considerations related to the impact of the tooth thickness on the leakage are presented.…”

Section: Introductionmentioning

confidence: 99%

Analysis of the impact of the labyrinth seal geometric parameters on the leakage

Joachimiak

Krzyślak

2021

E3S Web Conf.

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This paper includes results of experimental research and CFD calculations concerning gas flow in segments of straight through labyrinth seals of fixed length and varying number of teeth. Relation between the number of teeth and the leakage is analyzed in this paper. Authors determined the range of teeth number for which the minimum leakage was achieved. They focused particularly on the analysis of geometry with maximum number of teeth which fell within the range of the minimum leakage. For this geometry they examined the relation between the thickness of the teeth and the distribution of gas pressure and velocity along the seal and the leakage size. Data presented in this paper indicate that the teeth thickness has a significant impact on the flow parameters.

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“…Straight through labyrinth seals are applied in steam turbines in spots far from the thrust bearings [1][2][3]. Inverse problems are widely applied to solve engineering problems [4][5][6][7][8][9][10][11][12]. In this paper the inverse problem related to the choice of the seal geometry to obtain minimal leakage is presented.…”

Section: Introductionmentioning

confidence: 99%

Method for the reduction of leakage in labyrinth seals by adapting the seal geometry to match the flow conditions

Joachimiak

2021

E3S Web Conf.

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In this paper a method for reducing leakage in labyrinth seals is presented. This method is based on CFD calculations and consists in the analysis of the phenomenon of gas kinetic energy carry-over in chambers of the seal between gaps. It belongs to the group of geometrical inverse problems and is designed for seals of given outside dimensions. For straight through labyrinth seals it enables determining the number of teeth and their optimal arrangement. This method was developed based on numerical and experimental tests. Examples of numerical calculations presented in this paper prove that this method is effective for straight through seals. We obtained the reduction of leakage ranging from 8.7 to 9.4% relative to the initial geometry with no change in the outside dimensions of the seal.

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Choice of the regularization parameter for the Cauchy problem for the Laplace equation

Cited by 16 publications

References 54 publications

A stability analysis on a smoking model with stochastic perturbation

A stability analysis on a smoking model with stochastic perturbation

Analysis of the impact of the labyrinth seal geometric parameters on the leakage

Method for the reduction of leakage in labyrinth seals by adapting the seal geometry to match the flow conditions

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