Add to ORKGWe introduce the concept of nonlinear complexity, where the complexity of a function is determined by the number of nonlinear building blocks required for construction. We group functions by linear equivalence, and induce a complexity hierarchy for the affine equivalent double cosets. We prove multiple invariants of double cosets over the affine general linear group, and develop a specialized double coset equivalence test. This is used to classify the 16! permutations over 4 bits into 302 equivalence classes, which have a maximal nonlinear depth of 6. In addition, we present a new complexity class defined in terms of nonlinearity
torics. Of course, these two subjects are no strangers: combinatorics is often used as a tool in the...
This thesis expands on the notion of linear complexity for a graph as defined by Michael Orrison and...
The central focus of computational complexity theory is to measure the "hardness" of computing diffe...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
none1noReverse Complexity is a long term research program aiming at discovering the abstract, logica...
We review combinational results to enumerate and classify reversible functions and investigate the a...
AbstractIn this work, the general upper bound on the linear complexity given by Key is improved for ...
I will discuss the basic notions related to the complexity theory. The classes of P and NP problems ...
The linear complexity is an important and frequently used measure of unpredictability and pseudora...
AbstractTwo fundamental complexity measures for a Boolean function f are its circuit depth d(f) and ...
From 12.03.06 to 17.03.06, the Dagstuhl Seminar 06111 ``Complexity of Boolean Functions\u27\u27 was ...
AbstractIn this paper we investigate the combinational complexity of Boolean functions satisfying a ...
Complexity of Boolean functions satisfying the propagation criterion(PC), an extended notion of the ...
We review and compare three algebraic methods to compute the nonlinearity of Boolean functions. Two ...
This thesis studies computational complexity in concrete models of computation. We draw on a range o...
torics. Of course, these two subjects are no strangers: combinatorics is often used as a tool in the...
This thesis expands on the notion of linear complexity for a graph as defined by Michael Orrison and...
The central focus of computational complexity theory is to measure the "hardness" of computing diffe...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
none1noReverse Complexity is a long term research program aiming at discovering the abstract, logica...
We review combinational results to enumerate and classify reversible functions and investigate the a...
AbstractIn this work, the general upper bound on the linear complexity given by Key is improved for ...
I will discuss the basic notions related to the complexity theory. The classes of P and NP problems ...
The linear complexity is an important and frequently used measure of unpredictability and pseudora...
AbstractTwo fundamental complexity measures for a Boolean function f are its circuit depth d(f) and ...
From 12.03.06 to 17.03.06, the Dagstuhl Seminar 06111 ``Complexity of Boolean Functions\u27\u27 was ...
AbstractIn this paper we investigate the combinational complexity of Boolean functions satisfying a ...
Complexity of Boolean functions satisfying the propagation criterion(PC), an extended notion of the ...
We review and compare three algebraic methods to compute the nonlinearity of Boolean functions. Two ...
This thesis studies computational complexity in concrete models of computation. We draw on a range o...
torics. Of course, these two subjects are no strangers: combinatorics is often used as a tool in the...
This thesis expands on the notion of linear complexity for a graph as defined by Michael Orrison and...
The central focus of computational complexity theory is to measure the "hardness" of computing diffe...