We prove several Paley–Wiener-type theorems related to the spherical transform on the Gelfand pair $$\big ({H_n}\rtimes {\text {U}(n)},{\text {U}(n)}\big )$$(Hn⋊U(n),U(n)), where $${H_n}$$Hn is the $$2n+1$$2n+1-dimensional Heisenberg group. Adopting the standard realization of the Gelfand spectrum as the Heisenberg fan in $$\mathbb {R}^2$$R2, we prove that spherical transforms of $${\text {U}(n)}$$U(n)-invariant functions and distributions with compact support in $${H_n}$$Hn admit unique entire extensions to $$\mathbb {C}^2$$C2, and we find real-variable characterizations of such transforms. Next, we characterize the inverse spherical transforms of compactly supported functions and distributions on the fan, giving analogous characterizations.
Di Blasio, B., Astengo, F., Ricci, F. (2015). Paley–Wiener theorems for the U(n)-spherical transform on the Heisenberg group. ANNALI DI MATEMATICA PURA ED APPLICATA, 194(6), 1751-1774 [10.1007/s10231-014-0442-2].
Paley–Wiener theorems for the U(n)-spherical transform on the Heisenberg group
Di Blasio, B
;
2015
Abstract
We prove several Paley–Wiener-type theorems related to the spherical transform on the Gelfand pair $$\big ({H_n}\rtimes {\text {U}(n)},{\text {U}(n)}\big )$$(Hn⋊U(n),U(n)), where $${H_n}$$Hn is the $$2n+1$$2n+1-dimensional Heisenberg group. Adopting the standard realization of the Gelfand spectrum as the Heisenberg fan in $$\mathbb {R}^2$$R2, we prove that spherical transforms of $${\text {U}(n)}$$U(n)-invariant functions and distributions with compact support in $${H_n}$$Hn admit unique entire extensions to $$\mathbb {C}^2$$C2, and we find real-variable characterizations of such transforms. Next, we characterize the inverse spherical transforms of compactly supported functions and distributions on the fan, giving analogous characterizations.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
