Sharp estimates for biorthogonal families to exponential functions associated to complex sequences without gap conditions

Abstract: The general goal of this work is to obtain upper and lower bounds for the L 2 -norm of biorthogonal families to complex exponential functions associated to sequences {Λ k } k≥1 ⊂ C which satisfy appropriate assumptions but without imposing a gap condition on the elements of the sequence. As a consequence, we also present new results on the cost of the boundary null controllability of parabolic systems at time T > 0. In this case, the eigenvalues of the generator of the C 0 -semigroup associated to this parabol… Show more

“…Under a weak-gap condition of the form (23), that is when the eigenvalues can be gathered in blocks of bounded cardinality with a gap between blocks (which is the setting of the present article), uniform estimates on biorthogonal sequences follow from the uniform estimates for the resolution of block moment problems proved in [9]. Similar estimates, but where the sharp dependency with respect to T of the different constants is tracked, were obtained in [23]. Using the strategy detailed in [12], the estimates of [9] can also be supplemented with such dependency with respect to T (see Theorem 46).…”

Analysis of non scalar control problems for parabolic systems by the block moment method

“…Under a weak-gap condition of the form (23), that is when the eigenvalues can be gathered in blocks of bounded cardinality with a gap between blocks (which is the setting of the present article), uniform estimates on biorthogonal sequences follow from the uniform estimates for the resolution of block moment problems proved in [9]. Similar estimates, but where the sharp dependency with respect to T of the different constants is tracked, were obtained in [23]. Using the strategy detailed in [12], the estimates of [9] can also be supplemented with such dependency with respect to T (see Theorem 46).…”

Analysis of non scalar control problems for parabolic systems by the block moment method

Local exact controllability to the steady states of a parabolic system with coupled nonlinear boundary conditions