Bilinear embedding for divergence-form operators with negative potentials

Abstract

Let ⊂eq Rd be open, A a complex uniformly strictly accretive d× d matrix-valued function on with L∞ coefficients, and V a locally integrable function on whose negative part is subcritical. We consider the operator L = -div(A∇) + V with mixed boundary conditions on . We extend the bilinear inequality of Carbonaro and Dragicevi\'c [15], originally established for nonnegative potentials, by introducing a novel condition on the coefficients that reduces to standard p-ellipticity when V is nonnegative. As a consequence, we show that the solution to the parabolic problem u'(t) + L u(t) = f(t) with u(0)=0 has maximal regularity on Lp(), in the same spirit as [13]. Moreover, we study mapping properties of the semigroup generated by -L under this new condition, thereby extending classical results for the Schr\"odinger operator - + V on Rd [8,47].

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