Alternating permutations and modified Ghandi-polynomials

In the Preamble I shall give a running summary of Sections 1}11 without changing item numbers. For instance Result (3.2) and Remark (3.3) from Section 3 will be reproduced with the same designations. I shall write (P1), 2 , (P11) to indicate that I am summarizing Section 1, 2 , Section 11 of Part I,

In the last century, Desire Andre obtained many remarkable properties of the numbers of alternating permutations, linking them to trigonometric functions among other things. By considering the probability that a random permutation is alternating and that a random sequence (from a uniform distributio

The paper establishes a connection between the theory of permutation polynomials and the question of whether a de Bruijn sequence over a general finite field of a given linear complexity exists. The connection is used both to construct span 1 de Bruijn sequences (permutations) of a range of linear c