Add to ORKGOrthogonal forms of positive Boolean functions play an important role in reliability theory, since the probability that they take value 1 can be easily computed. However, few classes of disjunctive normal forms are known for which orthogonalization can be efficiently performed. An interesting class with this property is the class of shellable disjunctive normal forms (DNFs). In this paper, we present some new results about shellability. We establish that every positive Boolean function can be represented by a shellable DNF, we propose a polynomial procedure to compute the dual of a shellable DNF, and we prove that testing the so-called lexico-exchange (LE) property (a strengthening of shellability) is NP-complete
The problem of calculating the probability of a complex event presented by a special form of Boolean...
Let f:{0,1}n→{0,1} be a monotone Boolean function whose value at any point x∈{0,1}n can be determine...
AbstractA new normal form of Boolean functions based on the sum (mod 2), product and negation is pre...
Orthogonal forms of positive Boolean functions play an important role in reliability theory, since t...
The orthogonal conjunctive normal form of a Boolean function is a conjunctive normal form in which a...
An approach to solving the problem of orthogonalization of a disjunctive normal form (DNF) of a Bool...
AbstractIn this paper, we define tree-shellable and ordered tree-shellable Boolean functions. A tree...
In this paper we compare various normal form representations of Boolean functions. We extend the stu...
AbstractWe consider the problem of dualizing a positive Boolean function ƒ: Bn → B given in irredund...
AbstractIn this paper we examine the problem of determining the self-duality of a monotone boolean f...
Boolean functions can be represented in many ways including logical forms, truth tables, and polynom...
International audienceA normal form system (NFS) for representing Boolean functions is thought of as...
AbstractAfter showing that every pseudo-Boolean function (i.e. real-valued function with binary vari...
International audienceThe sensitivity conjecture of Nisan and Szegedy [CC'94] asks whether for any B...
In discrete mathematics, minimizing Boolean functions in the class of disjunctive normal forms is on...
The problem of calculating the probability of a complex event presented by a special form of Boolean...
Let f:{0,1}n→{0,1} be a monotone Boolean function whose value at any point x∈{0,1}n can be determine...
AbstractA new normal form of Boolean functions based on the sum (mod 2), product and negation is pre...
Orthogonal forms of positive Boolean functions play an important role in reliability theory, since t...
The orthogonal conjunctive normal form of a Boolean function is a conjunctive normal form in which a...
An approach to solving the problem of orthogonalization of a disjunctive normal form (DNF) of a Bool...
AbstractIn this paper, we define tree-shellable and ordered tree-shellable Boolean functions. A tree...
In this paper we compare various normal form representations of Boolean functions. We extend the stu...
AbstractWe consider the problem of dualizing a positive Boolean function ƒ: Bn → B given in irredund...
AbstractIn this paper we examine the problem of determining the self-duality of a monotone boolean f...
Boolean functions can be represented in many ways including logical forms, truth tables, and polynom...
International audienceA normal form system (NFS) for representing Boolean functions is thought of as...
AbstractAfter showing that every pseudo-Boolean function (i.e. real-valued function with binary vari...
International audienceThe sensitivity conjecture of Nisan and Szegedy [CC'94] asks whether for any B...
In discrete mathematics, minimizing Boolean functions in the class of disjunctive normal forms is on...
The problem of calculating the probability of a complex event presented by a special form of Boolean...
Let f:{0,1}n→{0,1} be a monotone Boolean function whose value at any point x∈{0,1}n can be determine...
AbstractA new normal form of Boolean functions based on the sum (mod 2), product and negation is pre...