D K spaces and Carleson measures
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1 D K spaces and Carleson measures Joint with Hasi Wulan and Ruhan Zhao The College at Brockport, State University of New York, Mathematics Department March 17, 2017
2 Notations Let D denote the unit disc and Hol(D) be the space of all analytic functions in D. The Dirichlet space, denote by D, consists of all f Hol(D) such as D(f ) := D f (z) 2 da(z) <. Let K : [0, ) [0, ) be right continuous and nondecreasing. We say a f Hol(D) belongs to the space D K if f 2 D K = f (0) 2 + f (z) 2 K(1 z 2 )da(z) <. (1) If K = t s, 0 < s <, it is simply denoted as D s. D
3 Background: Carleson measure We say that a positive Borel measure µ on D is a Carleson measure if the embedding operator from the Hardy space H p into L p (dµ) is bounded, that is f (z) p dµ(z) C f p H (2) p D holds for all f H p. It is well known that µ is a Carleson measure if and only if there exists a constant C > 0 such that µ(s(i )) C I (3) for each arc I D. Here S(I ) = { z D : 1 I < z < 1, θ argz < I } 2 is the so-called Carleson box, where θ is the middle point of I.
4 Remark. We may extend the notion of the Carleson measure by replacing the right-hand side of (2) by the norm or the semi-norm of some other function spaces such as the Bergman space, the Bloch space, BMOA, etc. Geometrically, giving an increasing function ϕ : (0, 2π) (0, ), the classical Carleson one box condition µ(s(i )) = O( I ) can be generalized as µ(s(i )) = O(ϕ( I )). For example, if s > 0 by taking ϕ(x) = x s we may generalize the classical Carleson measure as follows: µ is an s-carleson measure on D if µ(s(i )) = O( I s ).
5 We say that a positive Borel measure µ on D is a Carleson measure for D K if there is a positive constant C such that f (z) 2 dµ(z) C f 2 D K. (4) D Especially, if K(t) = t s, then we say µ is a Carleson measure for D s. In 1980, Stegenga [5] obtained that for s 1, µ is an s-carleson measure if and only if µ is a Carleson measure for D s.
6 Motivation Let f (z) = n=0 a nz n and g(z) = n=0 b nz n. The Hadamard product of f and g is defined as f g(z) = n=0 a nb n z n. Aulaskari, Girela and Wulan, (2000),[1] characterized the classical Carleson measure by using f g. Namely, they obtained the following result. For 0 < s <, a positive Borel measure µ on D is a classical Carleson measure if and only if there exists a positive constant C such that f g(z) 2 dµ(z) C f 2 D s for all f D s, where g(z) = 1 + D n=1 n 1 s 2 z n. Our goal is to extend their result to the space D K and to find out the concrete representation of g(z).
7 Main results Theorem 1. A positive Borel measure µ on D is an s-carleson measure (s 1) if and only if there exists a constant C > 0 such that f g(z) 2 dµ(z) C f 2 D K for all f D K, where g(z) = 1 + D n=1 n s K( 1 n )zn.
8 Theorem 2. A positive Borel measure µ on D is an s-carleson measure (s > 1) if and only if there exists a constant C > 0 such that (f g) (z) 2 dµ(z) C f 2 D K D for all f D K, where g(z) = 1 + n=1 n s 2 K( 1 n )zn.
9 Idea of proof. We only talk about the Theorem 1 as an example. The proof of sufficiency consists of two steps. Step 1: Proving that f D K if and only if f g D s, and where g(z) = 1 + n=1 f g Ds C f DK, n s K( 1 n )zn. Step 2. Replacing f by f g in the following definition of s-carleson measure: f 2 dµ(z) C f 2 D s, D and then combining with the above inequality, we arrive at the desired result.
10 Necessary: We only need to choose a proper test function f a (which depends on a D and the function K) and use the fact that µ is s-carleson measure if and only if sup a D S(a) dµ(z) 1 az s <, where S(a) := {z D : a z < 1; arg z a < π(1 a )}, so-called Carleson window. a 0, is a
11 Recently, El-Fallah, Kellay and Mashreghi (2015) obtained the following one box sufficient condition for the Carleson measure for the Dirichlet space D : A finite positive Borel measure µ on D is a Carleson measure for D if µ(s(i )) = O(ϕ( I )), where ϕ : (0, 2π) (0, ) is an increasing function such that dx < 1. 2π 0 ϕ(x) x
12 Here we generalize the above result as follows. Theorem 4. Let µ be a finite positive Borel measure on D satisfying µ(s(i )) = O(ϕ( I )), where ϕ : (0, 2π) (0, ) is an increasing function such that 2π 0 ϕ(x)φ (x)dx < 1. Then µ is a Carleson measure for D K, where φ(x) = (1 x) n κ n, κ n = n 1 0 K(1 t 1 n )dt. k=1
13 The key of proof is the following dual formulation of the notion of Carleson measure (by Arcozzi, Rochberg, and Sawyer (2008) [2]): A finite positive measure µ on D is a Carleson measure for a Hilbert space H if sup k(z, w) dµ(z) <, (5) z D D where k(z, w) is the reproducing kernel of H. Our proof uses this result and the fact that the reproducing kernel of D K is (zw) n k DK (z, w) = 1 +. κ n n=1
14 References R. Aulaskari, D. Girela and Hasi Wulan, Q p spaces, Hadamard products and Carleson measures, Mathematical Report, Nicola Arcozzi, Richard Rochberg, and Eric Sawyer, CCarleson measures for the Drury-Arveson Hardy space and other Besov-Sobolev spaces on complex balls, Adv. Math. 218 (2008), no. 4, L. Carleson, Interpolations by bounded analytic functions and the corona problem, Ann. of Math. (2) 76(1962), El-Fallah O, Kellay K, Mashreghi J, et al. One-box conditions for Carleson measures for the Dirichlet space, Proceedings of the American Mathematical Society, 2015, 143(2): D. A. Stegenga, Multipliers of the Dirichlet space, Illinois J. Math. 24(1980),
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