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Fast diffusion with loss at infinity—additional solutions
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Zeitschriftentitel: | The ANZIAM Journal |
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Personen und Körperschaften: | |
In: | The ANZIAM Journal, 42, 2001, 3, S. 445-450 |
Format: | E-Article |
Sprache: | Englisch |
veröffentlicht: |
Cambridge University Press (CUP)
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Schlagwörter: |
author_facet |
Brown, A. Brown, A. |
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author |
Brown, A. |
spellingShingle |
Brown, A. The ANZIAM Journal Fast diffusion with loss at infinity—additional solutions Mathematics (miscellaneous) |
author_sort |
brown, a. |
spelling |
Brown, A. 1446-1811 1446-8735 Cambridge University Press (CUP) Mathematics (miscellaneous) http://dx.doi.org/10.1017/s1446181100012050 <jats:title>Abstract</jats:title><jats:p>The paper presents some additional solutions of the diffusion equation</jats:p><jats:p><jats:disp-formula><jats:graphic xmlns:xlink="http://www.w3.org/1999/xlink" mime-subtype="gif" mimetype="image" position="float" xlink:type="simple" xlink:href="S1446181100012050_eqnU1" /></jats:disp-formula></jats:p><jats:p>for the case <jats:italic>s</jats:italic> = 2, <jats:italic>m</jats:italic> = −1, a case that was left open in a previous discussion. These solutions behave in a manner that is physically acceptable as the time, <jats:italic>t</jats:italic>, increases and as the radial coordinate, <jats:italic>r</jats:italic>, tends to infinity.</jats:p> Fast diffusion with loss at infinity—additional solutions The ANZIAM Journal |
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10.1017/s1446181100012050 |
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2001 |
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Cambridge University Press (CUP) |
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The ANZIAM Journal |
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49 |
title |
Fast diffusion with loss at infinity—additional solutions |
title_unstemmed |
Fast diffusion with loss at infinity—additional solutions |
title_full |
Fast diffusion with loss at infinity—additional solutions |
title_fullStr |
Fast diffusion with loss at infinity—additional solutions |
title_full_unstemmed |
Fast diffusion with loss at infinity—additional solutions |
title_short |
Fast diffusion with loss at infinity—additional solutions |
title_sort |
fast diffusion with loss at infinity—additional solutions |
topic |
Mathematics (miscellaneous) |
url |
http://dx.doi.org/10.1017/s1446181100012050 |
publishDate |
2001 |
physical |
445-450 |
description |
<jats:title>Abstract</jats:title><jats:p>The paper presents some additional solutions of the diffusion equation</jats:p><jats:p><jats:disp-formula><jats:graphic xmlns:xlink="http://www.w3.org/1999/xlink" mime-subtype="gif" mimetype="image" position="float" xlink:type="simple" xlink:href="S1446181100012050_eqnU1" /></jats:disp-formula></jats:p><jats:p>for the case <jats:italic>s</jats:italic> = 2, <jats:italic>m</jats:italic> = −1, a case that was left open in a previous discussion. These solutions behave in a manner that is physically acceptable as the time, <jats:italic>t</jats:italic>, increases and as the radial coordinate, <jats:italic>r</jats:italic>, tends to infinity.</jats:p> |
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author | Brown, A. |
author_facet | Brown, A., Brown, A. |
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container_issue | 3 |
container_start_page | 445 |
container_title | The ANZIAM Journal |
container_volume | 42 |
description | <jats:title>Abstract</jats:title><jats:p>The paper presents some additional solutions of the diffusion equation</jats:p><jats:p><jats:disp-formula><jats:graphic xmlns:xlink="http://www.w3.org/1999/xlink" mime-subtype="gif" mimetype="image" position="float" xlink:type="simple" xlink:href="S1446181100012050_eqnU1" /></jats:disp-formula></jats:p><jats:p>for the case <jats:italic>s</jats:italic> = 2, <jats:italic>m</jats:italic> = −1, a case that was left open in a previous discussion. These solutions behave in a manner that is physically acceptable as the time, <jats:italic>t</jats:italic>, increases and as the radial coordinate, <jats:italic>r</jats:italic>, tends to infinity.</jats:p> |
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spelling | Brown, A. 1446-1811 1446-8735 Cambridge University Press (CUP) Mathematics (miscellaneous) http://dx.doi.org/10.1017/s1446181100012050 <jats:title>Abstract</jats:title><jats:p>The paper presents some additional solutions of the diffusion equation</jats:p><jats:p><jats:disp-formula><jats:graphic xmlns:xlink="http://www.w3.org/1999/xlink" mime-subtype="gif" mimetype="image" position="float" xlink:type="simple" xlink:href="S1446181100012050_eqnU1" /></jats:disp-formula></jats:p><jats:p>for the case <jats:italic>s</jats:italic> = 2, <jats:italic>m</jats:italic> = −1, a case that was left open in a previous discussion. These solutions behave in a manner that is physically acceptable as the time, <jats:italic>t</jats:italic>, increases and as the radial coordinate, <jats:italic>r</jats:italic>, tends to infinity.</jats:p> Fast diffusion with loss at infinity—additional solutions The ANZIAM Journal |
spellingShingle | Brown, A., The ANZIAM Journal, Fast diffusion with loss at infinity—additional solutions, Mathematics (miscellaneous) |
title | Fast diffusion with loss at infinity—additional solutions |
title_full | Fast diffusion with loss at infinity—additional solutions |
title_fullStr | Fast diffusion with loss at infinity—additional solutions |
title_full_unstemmed | Fast diffusion with loss at infinity—additional solutions |
title_short | Fast diffusion with loss at infinity—additional solutions |
title_sort | fast diffusion with loss at infinity—additional solutions |
title_unstemmed | Fast diffusion with loss at infinity—additional solutions |
topic | Mathematics (miscellaneous) |
url | http://dx.doi.org/10.1017/s1446181100012050 |