Local noncommutative De Leeuw Theorems beyond reductive Lie groups
Abstract
Let be a discrete subgroup of a unimodular locally compact group G. In Math. Ann. 388, 4251-4305 (2024), it was shown that the Lp norm of a Fourier multiplier m on can be bounded locally by its Lp-norm on G, modulo a constant c(A) which depends on the support A of m. In the context where G is a connected Lie group with Lie algebra g, we develop tools to find explicit bounds on c(A). We show that the problem reduces to: 1) The adjoint representation of the semisimple quotient s = g/r of g by the radical r of g (which was handled in the paper mentioned above). 2) The action of s on a set of real irreducible representations that arise from quotients of the commutator series of r. In particular, we show that c(G) = 1 for unimodular connected solvable Lie groups.
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