Conductors and newforms for U(1,1)
Abstract
Let F be a non-Archimedean local field whose residue characteristic is odd. In this paper we develop a theory of newforms for U(1,1)(F), building on previous work on SL2(F). This theory is analogous to the results of Casselman for GL2(F) and Jacquet, Piatetski-Shapiro, and Shalika for GLn(F). To a representation π of U(1,1)(F), we attach an integer c(π) called the conductor of π, which depends only on the L-packet containing π. A newform is a vector in π which is essentially fixed by a congruence subgroup of level c(π). We show that our newforms are always test vectors for some standard Whittaker functionals, and, in doing so, we give various explicit formulae for newforms.
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