Esscher principle: Difference between revisions

Latest revision as of 11:58, 23 January 2014

In operator theory, von Neumann's inequality, due to John von Neumann, states that, for a contraction T acting on a Hilbert space and a polynomial p, then the norm of p(T) is bounded by the supremum of |p(z)| for z in the unit disk."^[1] In other words, for a fixed contraction T, the polynomial functional calculus map is itself a contraction. The inequality can be proved by considering the unitary dilation of T, for which the inequality is obvious.

This inequality is a specific case of Matsaev's conjecture. That is that for any polynomial P and contraction T on $L^{p}$

| | P (T) | |_{L^{p}} \leq | | P (S) | |_{ℓ^{p}}

where S is the right-shift operator. The von Neumann inequality proves it true for $p = 2$ and for $p = 1$ and $p = \infty$ it is true by straightforward calculation. S.W. Drury has recently shown that the conjecture fails in the general case.^[2]

References

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[1] Department of Mathematics, Vanderbilt University Colloquium, AY 2007-2008

[2] S.W. Drury, "A counterexample to a conjecture of Matsaev", Linear Algebra and its Applications, Volume 435, Issue 2, 15 July 2011, Pages 323-329

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+In [[operator theory]], '''von Neumann's inequality''', due to [[John von Neumann]], states that, for a [[Contraction (operator theory)|contraction]] ''T'' acting on a [[Hilbert space]] and a polynomial ''p'', then the norm of ''p''(''T'') is bounded by the [[supremum]] of |''p''(''z'')| for ''z'' in the [[unit disk]]."<ref>[http://www.math.vanderbilt.edu/~colloq/ Department of Mathematics, Vanderbilt University Colloquium, AY 2007-2008]</ref> In other words, for a fixed contraction ''T'', the [[polynomial functional calculus]] map is itself a contraction. The inequality can be proved by considering the [[unitary dilation]] of ''T'', for which the inequality is obvious.
+This inequality is a specific case of Matsaev's conjecture. That is that for any polynomial ''P'' and contraction ''T'' on <math>L^p</math>
+:<math>||P(T)||_{L^p} \le ||P(S)||_{\ell^p}</math>
+where ''S'' is the right-shift operator. The von Neumann inequality proves it true for <math>p=2</math> and for <math>p=1</math> and <math>p=\infty</math> it is true by straightforward calculation.
+S.W.&nbsp;Drury has recently shown that the conjecture fails in the general case.<ref>[http://www.sciencedirect.com/science/article/pii/S0024379511000589 S.W. Drury, "A counterexample to a conjecture of Matsaev",  Linear Algebra and its Applications, Volume 435, Issue 2, 15 July 2011, Pages 323-329 ]</ref>
+==References==
+<references/>
+[[Category:Operator theory]]
+[[Category:Inequalities]]
+{{mathanalysis-stub}}

Esscher principle: Difference between revisions

Latest revision as of 11:58, 23 January 2014

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