English

Blowup for Biharmonic NLS

Analysis of PDEs 2015-04-22 v2 Mathematical Physics math.MP

Abstract

We consider the Cauchy problem for the biharmonic (i.\,e.~fourth-order) NLS with focusing nonlinearity given by itu=Δ2uμΔuu2σui \partial_t u = \Delta^2 u - \mu \Delta u -|u|^{2 \sigma} u for (t,x)[0,T)×Rd(t,x) \in [0,T) \times \mathbb{R}^d, where 0<σ<0 < \sigma <\infty for d4d \leq 4 and 0<σ4/(d4)0 < \sigma \leq 4/(d-4) for d5d \geq 5; and μR\mu \in \mathbb{R} is some parameter to include a possible lower-order dispersion. In the mass-supercritical case σ>4/d\sigma > 4/d, we prove a general result on finite-time blowup for radial data in H2(Rd)H^2(\mathbb{R}^d) in any dimension d2d \geq 2. Moreover, we derive a universal upper bound for the blowup rate for suitable 4/d<σ<4/(d4)4/d < \sigma < 4/(d-4). In the mass-critical case σ=4/d\sigma=4/d, we prove a general blowup result in finite or infinite time for radial data in H2(Rd)H^2(\mathbb{R}^d). As a key ingredient, we utilize the time evolution of a nonnegative quantity, which we call the (localized) Riesz bivariance for biharmonic NLS. This construction provides us with a suitable substitute for the variance used for classical NLS problems. In addition, we prove a radial symmetry result for ground states for the biharmonic NLS, which may be of some value for the related elliptic problem.

Keywords

Cite

@article{arxiv.1503.01741,
  title  = {Blowup for Biharmonic NLS},
  author = {Thomas Boulenger and Enno Lenzmann},
  journal= {arXiv preprint arXiv:1503.01741},
  year   = {2015}
}

Comments

Revised version. Corrected some minor typos, added some remarks and included reference [12]

R2 v1 2026-06-22T08:45:30.278Z