| Type of Material: | Thesis |
| Title: | Mathematical modelling of an aqueous electrolyte solution by incorporating the variation of dielectric constant |
| Researcher: | Rajendra Padidhapu |
| Guide: | Shahnaz Bathul | Brahmajirao V. |
| Department: | Department of Mathematics |
| Publisher: | Jawaharlal Nehru Technological University, Hyderabad |
| Place: | Hyderabad |
| Year: | 2015 |
| Language: | English |
| Subject: | Dielectric constant | Mathematics | Mathematics Interdisciplinary Applications | Physical Sciences | Mathematical Sciences | Engineering and Technology |
| Dissertation/Thesis Note: | PhD; Department of Mathematics, Jawaharlal Nehru Technological University, Hyderabad, Hyderabad; 2015 |
| Fulltext: | Shodhganga |
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| 040 | __ | |aJNTU_500028|dIN-AhILN |
| 041 | __ | |aeng |
| 100 | __ | |aRajendra Padidhapu|eResearcher |
| 110 | __ | |aDepartment of Mathematics|bJawaharlal Nehru Technological University, Hyderabad|dHyderabad|ein|0U-0017 |
| 245 | __ | |aMathematical modelling of an aqueous electrolyte solution by incorporating the variation of dielectric constant |
| 260 | __ | |aHyderabad|bJawaharlal Nehru Technological University, Hyderabad|c2015 |
| 300 | __ | |a181p.|dDVD |
| 502 | __ | |cDepartment of Mathematics, Jawaharlal Nehru Technological University, Hyderabad, Hyderabad|d2015|bPhD |
| 518 | __ | |dAugust 2015|oDate of Award |
| 520 | __ | |aThe important lapse in the failure of Debye-Huckel theory was established during the last century by detailed theoretical and experimental work of Glueckauff, Pitzer, Buchner, Barthel and the Nobel newlinePrize winners Eigen and Tamm. The omission of incorporation of dielectric permittivity variation with concentration is attributed to be sole cause for several interesting mechanisms observed in electrolytic solutions. This dissertation developed a model to fill the void. A nonlinear equation for Dielectric constant as a function of three different powers of newlineconcentration was proposed. Gauss-Newton method was used in curve fitting the Dielectric data. The Poisson-Boltzmann equation provided access to apply the proposed correction to the Debye-Huckel theory. The governing equations for an electro-osmatic flow of an aqueous electrolyte solution were developed by fully coupled Navier Stokes, Maxwell newlineStefan, Poisson - Boltzmann equations. The Finite difference method and Finite element method |
| 650 | __ | |aMathematical Sciences|2UGC |
| 650 | __ | |aEngineering and Technology|2AIU |
| 653 | __ | |aDielectric constant |
| 653 | __ | |aMathematics |
| 653 | __ | |aMathematics Interdisciplinary Applications |
| 653 | __ | |aPhysical Sciences |
| 700 | __ | |aShahnaz Bathul|eGuide |
| 700 | __ | |eCo-Guide|aBrahmajirao V. |
| 856 | __ | |uhttp://shodhganga.inflibnet.ac.in/handle/10603/291070|yShodhganga |
| 905 | __ | |afromsg |
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