Local well-posedness for the nonlinear Schr\"odinger equation in the intersection of modulation spaces Mp, qs(Rd) M∞, 1(Rd)

Abstract

We introduce a Littlewood-Paley characterization of modulation spaces and use it to give an alternative proof of the algebra property, somehow implicitly contained in Sugimoto (2011), of the intersection Msp,q(Rd) M∞, 1(Rd) for d ∈ N, p, q ∈ [1, ∞] and s ≥ 0. We employ this algebra property to show the local well-posedness of the Cauchy problem for the cubic nonlinear Schr\"odinger equation in the above intersection. This improves Theorem 1.1 by B\'enyi and Okoudjou (2009), where only the case q = 1 is considered, and closes a gap in the literature. If q > 1 and s > d (1 - 1q) or if q = 1 and s ≥ 0 then Msp,q(Rd) M∞, 1(Rd) and the above intersection is superfluous. For this case we also reobtain a H\"older-type inequality for modulation spaces.