Functons of perturbed pairs of dissipative operators
Abstract
Let f be a function in the inhomogeneous analytic Besov space B∞,11. For a pair (L,M) of not necessarily commuting maximal dissipative operators, we define the function f(L,M) of L and M as a densely defined linear operator. We prove for p∈[1,2] that if (L1,M1) and (L2,M2) are pairs of not necessarily commuting maximal dissipative operators such that both differences L1-L2 and M1-M2 belong to the Schatten--von Neumann class Sp than for an arbitrary function f in the inhomogeneous analytic Besov space B∞,11, the operator difference f(L1,M1)-f(L2,M2) belongs to Sp and the following Lipschitz type estimate holds: \|f(L1,M1)-f(L2,M2)\|Sp const\|f\|B∞,11\\|L1-L2\|Sp,\|M1-M2\|Sp\.
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