We 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
We study Boolean circuits as a representation of Boolean functions and conskier different equivalenc...
We investigate the computational complexity of the Boolean isomorphism problem (BI): on input of two...
. Highly nonlinear Boolean functions occupy an important position in the design of secure block as w...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
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 ...
In FSE 2010, Rønjom and Cid put forward a nonlinear equivalence for Boolean functions and demonstrat...
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 ...
AbstractA quadratic upper bound is obtained for the complexity of symbol sequences generated by symm...
AbstractIn 1983, Patterson and Wiedemann constructed Boolean functions on n=15 input variables havin...
AbstractThe paper establishes a connection between the theory of permutation polynomials and the que...
This paper presents two algorithms for solving the linear and the affine equivalence problem for arb...
AbstractAn infinite sequence F = {fn}n = 1∞ of one-output Boolean functions with the following two p...
Any attempt to find connections between mathematical properties and complexity has a strong relevanc...
We study Boolean circuits as a representation of Boolean functions and conskier different equivalenc...
We investigate the computational complexity of the Boolean isomorphism problem (BI): on input of two...
. Highly nonlinear Boolean functions occupy an important position in the design of secure block as w...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
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 ...
In FSE 2010, Rønjom and Cid put forward a nonlinear equivalence for Boolean functions and demonstrat...
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 ...
AbstractA quadratic upper bound is obtained for the complexity of symbol sequences generated by symm...
AbstractIn 1983, Patterson and Wiedemann constructed Boolean functions on n=15 input variables havin...
AbstractThe paper establishes a connection between the theory of permutation polynomials and the que...
This paper presents two algorithms for solving the linear and the affine equivalence problem for arb...
AbstractAn infinite sequence F = {fn}n = 1∞ of one-output Boolean functions with the following two p...
Any attempt to find connections between mathematical properties and complexity has a strong relevanc...
We study Boolean circuits as a representation of Boolean functions and conskier different equivalenc...
We investigate the computational complexity of the Boolean isomorphism problem (BI): on input of two...
. Highly nonlinear Boolean functions occupy an important position in the design of secure block as w...