<oai_dc:dc xmlns:oai_dc="http://www.openarchives.org/OAI/2.0/oai_dc/" xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xsi:schemaLocation="http://www.openarchives.org/OAI/2.0/oai_dc/ http://www.openarchives.org/OAI/2.0/oai_dc.xsd">
<dc:title>Tangential Markov inequalities on real algebraic varieties</dc:title>
<dc:creator>L. Bos</dc:creator><dc:creator>Norm Levenberg</dc:creator><dc:creator>Pierre Milman</dc:creator><dc:creator>B. Taylor</dc:creator>
<dc:subject>Markov inequalities</dc:subject><dc:subject>Bernstein inequalities</dc:subject>
<dc:description>We say that a smooth compact submanifold $M$ of $\mathbb{R}^n$ admits a tangential Markov inequality of exponent $\ell$ if there is a constant $C &gt; 0$ such that for all polynomials $P \in \mathbb{R}[x_1 , \ldots , x_n]$ and points $a \in M$, \[ |D_TP(a)| \leq C(\text{deg}(P))^{\ell} \sup_{x \in M} |P(x)| .\] In a previous paper, the authors have shown that $M$ admits a tangential Markov inequality of exponent $\ell = 1$ if and only if $M$ is algebraic. Here we show that if $M$ is a smooth, locally closed manifold, then $M$ is algebraic iff $M$ admits a local weighted version of this inequality with $\ell = 1$.  We also give an example to show that in the non-smooth case, the exponent $\ell$ must depend on the singularities.</dc:description>
<dc:publisher>Indiana University Mathematics Journal</dc:publisher>
<dc:date>1998</dc:date>
<dc:type>text</dc:type>
<dc:format>pdf</dc:format>
<dc:identifier>10.1512/iumj.1998.47.1558</dc:identifier>
<dc:source>10.1512/iumj.1998.47.1558</dc:source>
<dc:language>en</dc:language>
<dc:relation>Indiana Univ. Math. J. 47 (1998) 1257 - 1272</dc:relation>
<dc:coverage>state-of-the-art mathematics</dc:coverage>
<dc:rights>http://iumj.org/access/</dc:rights>
</oai_dc:dc>