Global well-posedness and critical norm concentration for inhomogeneous biharmonic NLS

We consider the inhomogeneous biharmonic nonlinear Schr o dinger (IBNLS) equation in R-N, i partial derivative(t)u + Delta(2)u - vertical bar x vertical bar(-b)vertical bar u vertical bar(2 sigma) u = 0, where sigma > 0 and b > 0. We first study the local well-posedness in (H)over dot(sc) boolean AND (H)over dot(2), for N >= 5 and 0 < s(c) < 2, where s(c) = N/2 - 4-b/2 sigma. Next, we established a Gagliardo-Nirenberg type inequality in order to obtain sufficient conditions for global existence of solutions in (H)over dot(sc) boolean AND (H)over dot(2) with 0 <= s(c) < 2. Finally, we study the phenomenon of L-sigma c-norm concentration for finite time blow up solutions with bounded (H)over dot(sc)-norm, where sigma(c) = 2N sigma/4-b. Our main tool is the compact embedding of (L)over dot(p) boolean AND (H)over dot(2) into a weighted L2 sigma+2 space, which may be seen of independent interest. (AU)