@article{8ed4805e742047078268a242930cce6d, title = "Lp-Approximation of the Integrated Density of States for Schr{\"o}dinger Operators with Finite Local Complexity", abstract = "We study spectral properties of Schr{\"o}dinger operators on. ℝdThe electromagnetic potential is assumed to be determined locally by a colouring of the lattice points in ℤd, with the property that frequencies of finite patterns are well defined. We prove that the integrated density of states (spectral distribution function) is approximated by its finite volume analogues, i.e. the normalised eigenvalue counting functions. The convergence holds in the space Lp(I) where I is any finite energy interval and 1 ≤ p < ∞ is arbitrary.", keywords = "finite local complexity, Integrated density of states, random Schr{\"o}dinger operators", author = "Gruber, {Michael J.} and Lenz, {Daniel H.} and Ivan Veseli{\'c}", year = "2011", month = jan, day = "1", doi = "10.1007/s00020-010-1831-6", language = "English", volume = "69", pages = "217--232", journal = "Integral Equations and Operator Theory", issn = "0378-620X", publisher = "Birkhauser Verlag Basel", number = "2", }