Mathematics – Analysis of PDEs
Scientific paper
2008-09-07
Mathematics
Analysis of PDEs
Scientific paper
Let $\Op_t(a)$, for $t\in \mathbf R$, be the pseudo-differential operator $$ f(x) \mapsto (2\pi)^{-n}\iint a((1-t)x+ty,\xi)f(y)e^{i\scal {x-y}\xi} dyd\xi $$ and let $\mathscr I_p$ be the set of Schatten-von Neumann operators of order $p\in [1,\infty ]$ on $L^2$. We are especially concerned with the Weyl case (i.{}e. when $t=1/2$). We prove that if $m$ and $g$ are appropriate metrics and weight functions respectively, $h_g$ is the Planck's function, $h_g^{k/2}m\in L^p$ for some $k\ge 0$ and $a\in S(m,g)$, then $\Op_t(a)\in \mathscr I_p$, iff $a\in L^p$. Consequently, if $0\le \delta <\rho \le 1$ and $a\in S^r_{\rho ,\delta}$, then $\Op_t(a)$ is bounded on $L^2$, iff $a\in L^\infty$.
Buzano Ernesto
Toft Joachim
No associations
LandOfFree
Schatten-von Neumann properties in the Weyl calculus does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with Schatten-von Neumann properties in the Weyl calculus, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Schatten-von Neumann properties in the Weyl calculus will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-322145