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   	<dc:title>Surjectivity of Convolution Operators on Harmonic NA Groups</dc:title>
   	<dc:creator>Papageorgiou, Efthymia</dc:creator>
   	<dc:description>&lt;jats:title&gt;Abstract&lt;/jats:title&gt;
          &lt;jats:p&gt;Let &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\mu $$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;μ&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt; be a radial compactly supported distribution on a harmonic &lt;jats:italic&gt;NA&lt;/jats:italic&gt; group. We prove that the right convolution operator &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$c_{\mu }:f \mapsto f* \mu $$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mrow&gt;
                    &lt;mml:msub&gt;
                      &lt;mml:mi&gt;c&lt;/mml:mi&gt;
                      &lt;mml:mi&gt;μ&lt;/mml:mi&gt;
                    &lt;/mml:msub&gt;
                    &lt;mml:mo&gt;:&lt;/mml:mo&gt;
                    &lt;mml:mi&gt;f&lt;/mml:mi&gt;
                    &lt;mml:mo&gt;↦&lt;/mml:mo&gt;
                    &lt;mml:mi&gt;f&lt;/mml:mi&gt;
                    &lt;mml:mrow/&gt;
                    &lt;mml:mo&gt;∗&lt;/mml:mo&gt;
                    &lt;mml:mi&gt;μ&lt;/mml:mi&gt;
                  &lt;/mml:mrow&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt; maps the space of smooth &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\mathfrak {v}$$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;v&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt;-radial functions onto itself if and only if the spherical Fourier transform &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\widetilde{\mu }(\lambda )$$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mrow&gt;
                    &lt;mml:mover&gt;
                      &lt;mml:mi&gt;μ&lt;/mml:mi&gt;
                      &lt;mml:mo&gt;~&lt;/mml:mo&gt;
                    &lt;/mml:mover&gt;
                    &lt;mml:mrow&gt;
                      &lt;mml:mo&gt;(&lt;/mml:mo&gt;
                      &lt;mml:mi&gt;λ&lt;/mml:mi&gt;
                      &lt;mml:mo&gt;)&lt;/mml:mo&gt;
                    &lt;/mml:mrow&gt;
                  &lt;/mml:mrow&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt;, &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\lambda \in \mathbb {C}$$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mrow&gt;
                    &lt;mml:mi&gt;λ&lt;/mml:mi&gt;
                    &lt;mml:mo&gt;∈&lt;/mml:mo&gt;
                    &lt;mml:mi&gt;C&lt;/mml:mi&gt;
                  &lt;/mml:mrow&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt;, is slowly decreasing. As an application, we prove that certain averages over spheres are surjective on the space of smooth &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\mathfrak {v}$$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;v&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt;-radial functions.&lt;/jats:p&gt;</dc:description>
   	<dc:publisher>Springer Science and Business Media LLC</dc:publisher>
   	<dc:date>2024</dc:date>
   	<dc:type>info:eu-repo/semantics/article</dc:type>
   	<dc:type>doc-type:article</dc:type>
   	<dc:type>text</dc:type>
   	<dc:type>http://purl.org/coar/resource_type/c_6501</dc:type>
   	<dc:identifier>https://ris.uni-paderborn.de/record/63502</dc:identifier>
   	<dc:source>Papageorgiou E. Surjectivity of Convolution Operators on Harmonic NA Groups. &lt;i&gt;The Journal of Geometric Analysis&lt;/i&gt;. 2024;35(1). doi:&lt;a href=&quot;https://doi.org/10.1007/s12220-024-01837-w&quot;&gt;10.1007/s12220-024-01837-w&lt;/a&gt;</dc:source>
   	<dc:language>eng</dc:language>
   	<dc:relation>info:eu-repo/semantics/altIdentifier/doi/10.1007/s12220-024-01837-w</dc:relation>
   	<dc:relation>info:eu-repo/semantics/altIdentifier/issn/1050-6926</dc:relation>
   	<dc:relation>info:eu-repo/semantics/altIdentifier/issn/1559-002X</dc:relation>
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