Based on explicit numerical constructions for Kolmogorov’s superpositions (KS) linear size circuits are possible. Because classical Boolean as well as threshold logic implementations require exponential size in the worst case, it follows that size-optimal solutions for arbitrary Boolean functions (BFs) should rely (at least partly) on KS. In this paper, we will present previous theoretical results while examining the particular case of 3-input BFs in detail. This shows that there is still room for improvement on the synthesis of BFs. Such size reductions (which can be achieved systematically) could help alleviate the challenging power consumption problem, and advocate for the design of Kolmogorov-inspired gates, as well as for the developme...
Computational complexity theory and algorithms are two major areas in theoretical computer science. ...
Emerging reconfigurable nanotechnologies allow the implementation of self-dual functions with a fewe...
'~le introduce a geometric approach for investigating the power of threshold circuits. Viewing ...
The paper overviews results dealing with the approximation capabilities of neural networks, as well ...
This paper starts by overviewing results dealing with the approximation capabilities of neural netwo...
AbstractA unate gate is a logical gate computing a unate Boolean function, which is monotone in each...
This paper proposes novel universal logic gates using the current quantization characteristics of na...
In this paper, we revisit Boole's expansion theorem to propose a new synthesis method for implicatio...
The paper will show that in order to obtain minimum size neural networks (i.e., size-optimal) for im...
Reversible logic circuit synthesis has applications in various modern computational problems, low po...
Abstract. We introduce a new method for obtaining optimal architec-tures that implement arbitrary Bo...
The paper presents an application of a constructive learning algorithm to optimization of circuits. ...
We examine the power of constant depth circuits with sigmoid (i.e. smooth) threshold gates for compu...
This paper presents a method for generating optimum multi-level implementations of Boolean functions...
The paper overviews results dealing with the approximation capabilities of neural networks, and boun...
Computational complexity theory and algorithms are two major areas in theoretical computer science. ...
Emerging reconfigurable nanotechnologies allow the implementation of self-dual functions with a fewe...
'~le introduce a geometric approach for investigating the power of threshold circuits. Viewing ...
The paper overviews results dealing with the approximation capabilities of neural networks, as well ...
This paper starts by overviewing results dealing with the approximation capabilities of neural netwo...
AbstractA unate gate is a logical gate computing a unate Boolean function, which is monotone in each...
This paper proposes novel universal logic gates using the current quantization characteristics of na...
In this paper, we revisit Boole's expansion theorem to propose a new synthesis method for implicatio...
The paper will show that in order to obtain minimum size neural networks (i.e., size-optimal) for im...
Reversible logic circuit synthesis has applications in various modern computational problems, low po...
Abstract. We introduce a new method for obtaining optimal architec-tures that implement arbitrary Bo...
The paper presents an application of a constructive learning algorithm to optimization of circuits. ...
We examine the power of constant depth circuits with sigmoid (i.e. smooth) threshold gates for compu...
This paper presents a method for generating optimum multi-level implementations of Boolean functions...
The paper overviews results dealing with the approximation capabilities of neural networks, and boun...
Computational complexity theory and algorithms are two major areas in theoretical computer science. ...
Emerging reconfigurable nanotechnologies allow the implementation of self-dual functions with a fewe...
'~le introduce a geometric approach for investigating the power of threshold circuits. Viewing ...