We give various equivalent formulations to the (partially) open problem about L(p)-boundedness of Bergman projections in tubes over cones. Namely, we show that such boundedness is equivalent to the duality identity between Bergman spaces, A(p)' = (Ap)*, and also to a Hardy type inequality related to the wave operator. We introduce analytic Besov spaces in tubes over cones, for which such Hardy inequalities play an important role. For p >= 2 we identify as a Besov space the range of the Bergman projection acting on L(p), and also the dual of A(p)'. For the Bloch space B(infinity) we give in addition new necessary conditions on the number of derivatives required in its definition.

• 出版日期2010-10