AbstractIn 1983, Patterson and Wiedemann constructed Boolean functions on n=15 input variables having nonlinearity strictly greater than 2n-1-2(n-1)/2. Construction of Boolean functions on odd number of variables with such high nonlinearity was not known earlier and also till date no other construction method of such functions are known. We note that the Patterson–Wiedemann construction can be understood in terms of interleaved sequences as introduced by Gong in 1995 and subsequently these functions can be described as repetitions of a particular binary string. As example we elaborate the cases for n=15,21. Under this framework, we map the problem of finding Patterson–Wiedemann functions into a problem of solving a system of linear inequali...
AbstractNonlinear characteristics of (Boolean) functions is one of the important issues both in the ...
Abstract Given two non-weakly k-normal Boolean functions on n variables a method is proposed to cons...
Boolean nested canalizing functions (NCFs) have important applications inmolecular regulatory networ...
AbstractIn 1983, Patterson and Wiedemann constructed Boolean functions on n=15 input variables havin...
Nonlinearity is one of the most challenging combinatorial property in the domain of Boolean function...
For the first time we find Boolean functions on 9 variables having nonlinearity 241, that remained a...
For the first time Boolean functions on 9 variables having nonlinearity 241 are discovered, that rem...
The existence of 9-variable Boolean functions having nonlinearity strictly greater than 240 has been...
We introduce a steepest-descent-like search algorithm for the design of Boolean functions, yielding ...
AbstractWe give a new lower bound to the covering radius of the first order Reed–Muller code RM(1,n)...
We review and compare three algebraic methods to compute the nonlinearity of Boolean functions. Two ...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
AbstractIn this paper, we present a construction method of m-resilient Boolean functions with very h...
Recently, 9-variable Boolean functions having nonlinearity 241, which is strictly greater than the b...
An important tool in the study of the complexity of Constraint Satisfaction Problems (CSPs) is the n...
AbstractNonlinear characteristics of (Boolean) functions is one of the important issues both in the ...
Abstract Given two non-weakly k-normal Boolean functions on n variables a method is proposed to cons...
Boolean nested canalizing functions (NCFs) have important applications inmolecular regulatory networ...
AbstractIn 1983, Patterson and Wiedemann constructed Boolean functions on n=15 input variables havin...
Nonlinearity is one of the most challenging combinatorial property in the domain of Boolean function...
For the first time we find Boolean functions on 9 variables having nonlinearity 241, that remained a...
For the first time Boolean functions on 9 variables having nonlinearity 241 are discovered, that rem...
The existence of 9-variable Boolean functions having nonlinearity strictly greater than 240 has been...
We introduce a steepest-descent-like search algorithm for the design of Boolean functions, yielding ...
AbstractWe give a new lower bound to the covering radius of the first order Reed–Muller code RM(1,n)...
We review and compare three algebraic methods to compute the nonlinearity of Boolean functions. Two ...
We introduce the concept of nonlinear complexity, where the complexity of a function is determined b...
AbstractIn this paper, we present a construction method of m-resilient Boolean functions with very h...
Recently, 9-variable Boolean functions having nonlinearity 241, which is strictly greater than the b...
An important tool in the study of the complexity of Constraint Satisfaction Problems (CSPs) is the n...
AbstractNonlinear characteristics of (Boolean) functions is one of the important issues both in the ...
Abstract Given two non-weakly k-normal Boolean functions on n variables a method is proposed to cons...
Boolean nested canalizing functions (NCFs) have important applications inmolecular regulatory networ...