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   <ow:Publication rdf:about="oai:digibug.ugr.es:10481/81863">
      <dc:title>Traveling waves for a fisher-type reaction-diffusion equation with a flux in divergence form</dc:title>
      <dc:creator>Arias López, Margarita</dc:creator>
      <dc:creator>Campos Rodríguez, Juan</dc:creator>
      <dc:description>Abstract. Analysis of the speed of propagation in parabolic operators is frequently&#xd;
carried out considering the minimal speed at which its traveling waves&#xd;
move. This value depends on the solution concept being considered.&#xd;
We analyze an extensive class of Fisher-type reaction-di usion equations&#xd;
with &#xd;
ows in divergence form. We work with regular &#xd;
ows, which may not meet&#xd;
the standard elliptical conditions, but without other types of singularities.&#xd;
We show that the range of speeds at which classic traveling waves move is&#xd;
an interval unbounded to the right. Contrary to classic examples, the in mum&#xd;
may not be reached. When the &#xd;
ow is elliptic or over-elliptic, the minimum&#xd;
speed of propagation is achieved.&#xd;
The classic traveling wave speed threshold is complemented by another&#xd;
value by analyzing an extension of the  rst order boundary value problem to&#xd;
which the classic case is reduced. This singular minimum speed can be justi ed&#xd;
as a viscous limit of classic minimal speeds in elliptic or over-elliptic &#xd;
ows.&#xd;
We construct a singular pro le for each speed between the minimum singular&#xd;
speed and the speeds at which classic traveling waves move. Under&#xd;
additional assumptions, the constructed pro le can be justi ed as that of a&#xd;
traveling wave of the starting equation in the framework of bounded variation&#xd;
functions.&#xd;
We also show that saturated fronts verifying the Rankine-Hugoniot condition&#xd;
can appear for strictly lower speeds even in the framework of bounded&#xd;
variation functions.</dc:description>
      <dc:date>2023-05-26T11:00:06Z</dc:date>
      <dc:date>2023-05-26T11:00:06Z</dc:date>
      <dc:date>2022-07-13</dc:date>
      <dc:type>info:eu-repo/semantics/article</dc:type>
      <dc:identifier>Published version: Arias, M., &amp; Campos, J. (2022). Traveling waves for a Fisher-type reaction-diffusion equation with a flux in divergence form. Mathematical Models and Methods in Applied Sciences[https://doi.org/10.1142/S0218202523500318]</dc:identifier>
      <dc:identifier>https://hdl.handle.net/10481/81863</dc:identifier>
      <dc:identifier>10.1142/S0218202523500318</dc:identifier>
      <dc:language>eng</dc:language>
      <dc:rights>http://creativecommons.org/licenses/by-nc-nd/4.0/</dc:rights>
      <dc:rights>info:eu-repo/semantics/openAccess</dc:rights>
      <dc:rights>Attribution-NonCommercial-NoDerivatives 4.0 Internacional</dc:rights>
      <dc:publisher>World scientific publ co pte ltd</dc:publisher>
   </ow:Publication>
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