Design and analysis of bent functions using M-subspaces

Abstract

In this article, we provide the first systematic analysis of bent functions f on F2n in the Maiorana-McFarland class MM regarding the origin and cardinality of their M-subspaces, i.e., vector subspaces on which the second-order derivatives of f vanish. By imposing restrictions on permutations π of F2n/2, we specify the conditions, such that Maiorana-McFarland bent functions f(x,y)=x· π(y) + h(y) admit a unique M-subspace of dimension n/2. On the other hand, we show that permutations π with linear structures give rise to Maiorana-McFarland bent functions that do not have this property. In this way, we contribute to the classification of Maiorana-McFarland bent functions, since the number of M-subspaces is invariant under equivalence. Additionally, we give several generic methods of specifying permutations π so that f∈MM admits a unique M-subspace. Most notably, using the knowledge about M-subspaces, we show that using the bent 4-concatenation of four suitably chosen Maiorana-McFarland bent functions, one can in a generic manner generate bent functions on F2n outside the completed Maiorana-McFarland class MM\# for any even n≥ 8. Remarkably, with our construction methods it is possible to obtain inequivalent bent functions on F28 not stemming from two primary classes, the partial spread class PS and MM. In this way, we contribute to a better understanding of the origin of bent functions in eight variables, since only a small fraction, of which size is about 276, stems from PS and MM, whereas the total number of bent functions on F28 is approximately 2106.