DOIAbstract
AbstractA Sheffer function is a function which can produce by superposition all functions of a considered set. In this paper we give an exact formula for the number of n-ary Sheffer symmetric functions in three-valued logic
AbstractA Sheffer function is a function which can produce by superposition all functions of a considered set. In this paper we give an exact formula for the number of n-ary Sheffer symmetric functions in three-valued logic
AbstractNew subsets of symmetric balanced and symmetric correlation immune functions are identified....
With the aid of multivariate Sheffer-type polynomials and differ-ential operators, this paper provid...
With the aid of multivariate Sheffer-type polynomials and differential operators, this paper provide...
AbstractA Sheffer function is a function which can produce by superposition all functions of a consi...
AbstractNecessary and sufficient conditions for a one variable function to be the main diagonal of a...
Multiple-valued logic is an important branch of the computer science and technology. Multiple-valued...
AbstractThe well-known relationship between linear functionals and Sheffer sequences is extended to ...
A function of boolean arguments is symmetric if its value depends solely on the number of 1's among ...
peer reviewedWe determine the minimal covering of maximal partial clones in 4-valued logic. That mea...
A function of boolean arguments is symmetric if its value depends solely on the number of 1's among ...
A partial operation f on a finite set A is called Sheffer if the partial algebra 〈A, f〉 is complete,...
http://www.ieee.org/We present an extensive study of symmetric Boolean functions, especially of thei...
summary:We introduce the concept of Sheffer operation in ortholattices and, more generally, in latti...
AbstractWe establish a combinatorial interpretation for various operations on symmetric functions, s...
AbstractThe multiplicative complexity of a Boolean function f is defined as the minimum number of bi...
AbstractNew subsets of symmetric balanced and symmetric correlation immune functions are identified....
With the aid of multivariate Sheffer-type polynomials and differ-ential operators, this paper provid...
With the aid of multivariate Sheffer-type polynomials and differential operators, this paper provide...
AbstractA Sheffer function is a function which can produce by superposition all functions of a consi...
AbstractNecessary and sufficient conditions for a one variable function to be the main diagonal of a...
Multiple-valued logic is an important branch of the computer science and technology. Multiple-valued...
AbstractThe well-known relationship between linear functionals and Sheffer sequences is extended to ...
A function of boolean arguments is symmetric if its value depends solely on the number of 1's among ...
peer reviewedWe determine the minimal covering of maximal partial clones in 4-valued logic. That mea...
A function of boolean arguments is symmetric if its value depends solely on the number of 1's among ...
A partial operation f on a finite set A is called Sheffer if the partial algebra 〈A, f〉 is complete,...
http://www.ieee.org/We present an extensive study of symmetric Boolean functions, especially of thei...
summary:We introduce the concept of Sheffer operation in ortholattices and, more generally, in latti...
AbstractWe establish a combinatorial interpretation for various operations on symmetric functions, s...
AbstractThe multiplicative complexity of a Boolean function f is defined as the minimum number of bi...
AbstractNew subsets of symmetric balanced and symmetric correlation immune functions are identified....
With the aid of multivariate Sheffer-type polynomials and differ-ential operators, this paper provid...
With the aid of multivariate Sheffer-type polynomials and differential operators, this paper provide...
Add to ORKG