We are interested by the spectral analysis of the anisotropic discrete Maxwell operator $\hat H^D$ defined on the square lattice $\rm Z\!\!\! Z^3$. In aim to prove that the limiting absorption principle holds we construct a conjugate operator to the Fourier series of $\hat H^D$ at any not-zero real value. In addition we show that at some particular thresholds the conjugate operator is essentially self-adjoint.
Spectral analysis of semigroups and growth-fragmentation equations
Spectral analysis of the Neumann-Poincaré operator and characterization of the gradient blow-up
Spectral Analysis of hypoelliptic random walks
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