Finite 1D-Lattice Physics as Induced by Dirac–Markov Operators

Abstract: Measuring distances on a lattice in noncommutative geometry involves square, symmetric and real "three-diagonal" matrices, with the sum of their elements obeying a supremum condition, together with a constraint forcing the absolute value of the maximal eigenvalue to be equal to 1. In even dimensions, these matrices are unipotent of order two, while in odd dimensions only their squares are Markovian. We suggest that these bi-graded Markovian matrices (i.e. consisting in the square roots of Markovian matrices) c… Show more