Journal article
On the effectiveness of wastewater cylindrical reactors: an analysis through Steiner symmetrization
- Abstract:
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The mathematical analysis of the shape of chemical reactors is studied in this paper through the research of the optimization of its effectiveness η such as introduced by R. Aris around 1960. Although our main motivation is the consideration of reactors specially designed for the treatment of wastewaters our results are relevant also in more general frameworks. We simplify the modeling by assuming a single chemical reaction with a monotone kinetics leading to a parabolic equation with a non-necessarily differentiable function. In fact we consider here the case of a single, non-reversible catalysis reaction of chemical order q,0
0). We assume the chemical reactor of cylindrical shape Ω=G×(0,H) with G and open regular set of R2 not necessarily symmetric. We show that among all the sections G with prescribed area the ball is the set of lowest effectiveness η(t,G). The proof uses the notions of Steiner rearrangement. Finally, we show that if the height H is small enough then the effectiveness can be made as close to 1 as desired. 888 The mathematical analysis of the shape of chemical reactors is studied in this paper through the research of the optimization of its effectiveness (Formula presented.) such as introduced by R. Aris around 1960. Although our main motivation is the consideration of reactors specially designed for the treatment of wastewaters our results are relevant also in more general frameworks. We simplify the modeling by assuming a single chemical reaction with a monotone kinetics leading to a parabolic equation with a non-necessarily differentiable function. In fact we consider here the case of a single, non-reversible catalysis reaction of chemical order (Formula presented.) (i.e., the kinetics is given by (Formula presented.) for some (Formula presented.)). We assume the chemical reactor of cylindrical shape (Formula presented.) with G and open regular set of (Formula presented.) not necessarily symmetric. We show that among all the sections G with prescribed area the ball is the set of lowest effectiveness (Formula presented.). The proof uses the notions of Steiner rearrangement. Finally, we show that if the height H is small enough then the effectiveness can be made as close to 1 as desired.
- Publication status:
- Published
- Peer review status:
- Peer reviewed
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- Files:
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(Preview, Accepted manuscript, pdf, 924.8KB, Terms of use)
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- Publisher copy:
- 10.1007/s00024-015-1124-8
Authors
- Publisher:
- Springer Nature
- Journal:
- Pure and Applied Geophysics More from this journal
- Volume:
- 173
- Issue:
- 3
- Pages:
- 923-935
- Publication date:
- 2015-07-11
- Acceptance date:
- 2015-06-09
- DOI:
- EISSN:
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1420-9136
- ISSN:
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0033-4553
- Language:
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English
- Keywords:
- Pubs id:
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1137529
- Local pid:
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pubs:1137529
- Deposit date:
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2020-11-29
- ARK identifier:
Terms of use
- Copyright holder:
- Springer Basel
- Copyright date:
- 2015
- Rights statement:
- ©2015 Springer Basel
- Notes:
- This is the accepted manuscript version of the article. The final version is available from Springer at: 10.1007/s00024-015-1124-8
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