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880 results on '"MANZONI, LUCA"'

1. Computing eulerian magnitude homology

Author

Menara, Giuliamaria and Manzoni, Luca

Subjects
Computer Science - Computational Complexity, Mathematics - Combinatorics
Abstract

In this paper tackle the problem of computing the ranks of certain eulerian magnitude homology groups of a graph G. First, we analyze the computational cost of our problem and prove that it is #W[1]-complete. Then we develop the first diagonal algorithm, a breadth-first-search-based algorithm parameterized by the diameter of the graph to calculate the ranks of the homology groups of interest. To do this, we leverage the close relationship between the combinatorics of the homology boundary map and the substructures appearing in the graph. We then discuss the feasibility of the presented algorithm and consider future perspectives.

Published
2024

2. A Discrete Particle Swarm Optimizer for the Design of Cryptographic Boolean Functions

Author

Mariot, Luca, Leporati, Alberto, and Manzoni, Luca

Subjects
Computer Science - Neural and Evolutionary Computing, Computer Science - Cryptography and Security
Abstract

A Particle Swarm Optimizer for the search of balanced Boolean functions with good cryptographic properties is proposed in this paper. The algorithm is a modified version of the permutation PSO by Hu, Eberhart and Shi which preserves the Hamming weight of the particles positions, coupled with the Hill Climbing method devised by Millan, Clark and Dawson to improve the nonlinearity and deviation from correlation immunity of Boolean functions. The parameters for the PSO velocity equation are tuned by means of two meta-optimization techniques, namely Local Unimodal Sampling (LUS) and Continuous Genetic Algorithms (CGA), finding that CGA produces better results. Using the CGA-evolved parameters, the PSO algorithm is then run on the spaces of Boolean functions from $n=7$ to $n=12$ variables. The results of the experiments are reported, observing that this new PSO algorithm generates Boolean functions featuring similar or better combinations of nonlinearity, correlation immunity and propagation criterion with respect to the ones obtained by other optimization methods., Comment: Extended version of the poster paper "Heuristic Search by Particle Swarm Optimization of Boolean Functions for Cryptographic Applications" published in GECCO 2015

Published
2024

5. Fixed Points and Attractors of Reactantless and Inhibitorless Reaction Systems

Author

Ascone, Rocco, Bernardini, Giulia, and Manzoni, Luca

Subjects
Computer Science - Computational Complexity, Mathematics - Dynamical Systems
Abstract

Reaction systems are discrete dynamical systems that model biochemical processes in living cells using finite sets of reactants, inhibitors, and products. We investigate the computational complexity of a comprehensive set of problems related to the existence of fixed points and attractors in two constrained classes of reaction systems, in which either reactants or inhibitors are disallowed. These problems have biological relevance and have been extensively studied in the unconstrained case; however, they remain unexplored in the context of reactantless or inhibitorless systems. Interestingly, we demonstrate that although the absence of reactants or inhibitors simplifies the system's dynamics, it does not always lead to a reduction in the complexity of the considered problems., Comment: 32 pages. The previous version contained major mistakes. The wrong results are the former Corollaries 9, 10, 15, 17, 23, 25, 25, 32 and 36, Proposition 31 and Remark 30 (all following from a single mistake). We have now corrected all these results

Published
2023

6. Enhancing Large Language Models-Based Code Generation by Leveraging Genetic Improvement

Author

Pinna, Giovanni, Ravalico, Damiano, Rovito, Luigi, Manzoni, Luca, De Lorenzo, Andrea, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Giacobini, Mario, editor, Xue, Bing, editor, and Manzoni, Luca, editor

Published
2024
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8. Local Search, Semantics, and Genetic Programming: a Global Analysis

Author

Anselmi, Fabio, Castelli, Mauro, d'Onofrio, Alberto, Manzoni, Luca, Mariot, Luca, and Saletta, Martina

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

Geometric Semantic Geometric Programming (GSGP) is one of the most prominent Genetic Programming (GP) variants, thanks to its solid theoretical background, the excellent performance achieved, and the execution time significantly smaller than standard syntax-based GP. In recent years, a new mutation operator, Geometric Semantic Mutation with Local Search (GSM-LS), has been proposed to include a local search step in the mutation process based on the idea that performing a linear regression during the mutation can allow for a faster convergence to good-quality solutions. While GSM-LS helps the convergence of the evolutionary search, it is prone to overfitting. Thus, it was suggested to use GSM-LS only for a limited number of generations and, subsequently, to switch back to standard geometric semantic mutation. A more recently defined variant of GSGP (called GSGP-reg) also includes a local search step but shares similar strengths and weaknesses with GSM-LS. Here we explore multiple possibilities to limit the overfitting of GSM-LS and GSGP-reg, ranging from adaptive methods to estimate the risk of overfitting at each mutation to a simple regularized regression. The results show that the method used to limit overfitting is not that important: providing that a technique to control overfitting is used, it is possible to consistently outperform standard GSGP on both training and unseen data. The obtained results allow practitioners to better understand the role of local search in GSGP and demonstrate that simple regularization strategies are effective in controlling overfitting., Comment: 22 pages, 4 figures, 1 table

Published
2023

9. A classification of S-boxes generated by Orthogonal Cellular Automata

Author

Mariot, Luca and Manzoni, Luca

Subjects
Computer Science - Cryptography and Security, Computer Science - Information Theory, Mathematics - Combinatorics
Abstract

Most of the approaches published in the literature to construct S-boxes via Cellular Automata (CA) work by either iterating a finite CA for several time steps, or by a one-shot application of the global rule. The main characteristic that brings together these works is that they employ a single CA rule to define the vectorial Boolean function of the S-box. In this work, we explore a different direction for the design of S-boxes that leverages on Orthogonal CA (OCA), i.e. pairs of CA rules giving rise to orthogonal Latin squares. The motivation stands on the facts that an OCA pair already defines a bijective transformation, and moreover the orthogonality property of the resulting Latin squares ensures a minimum amount of diffusion. We exhaustively enumerate all S-boxes generated by OCA pairs of diameter $4 \le d \le 6$, and measure their nonlinearity. Interestingly, we observe that for $d=4$ and $d=5$ all S-boxes are linear, despite the underlying CA local rules being nonlinear. The smallest nonlinear S-boxes emerges for $d=6$, but their nonlinearity is still too low to be used in practice. Nonetheless, we unearth an interesting structure of linear OCA S-boxes, proving that their Linear Components Space (LCS) is itself the image of a linear CA, or equivalently a polynomial code. We finally classify all linear OCA S-boxes in terms of their generator polynomials., Comment: 22 pages. Extended version of "On the Linear Components Space of S-boxes Generated by Orthogonal Cellular Automata" arXiv:2203.14365v, presented at ACRI 2022. Currently under submission at Natural Computing

Published
2023

11. Evolutionary Strategies for the Design of Binary Linear Codes

Author

Carlet, Claude, Mariot, Luca, Manzoni, Luca, and Picek, Stjepan

Subjects
Computer Science - Neural and Evolutionary Computing, Computer Science - Cryptography and Security, Computer Science - Discrete Mathematics, Computer Science - Information Theory, Mathematics - Combinatorics
Abstract

The design of binary error-correcting codes is a challenging optimization problem with several applications in telecommunications and storage, which has also been addressed with metaheuristic techniques and evolutionary algorithms. Still, all these efforts focused on optimizing the minimum distance of unrestricted binary codes, i.e., with no constraints on their linearity, which is a desirable property for efficient implementations. In this paper, we present an Evolutionary Strategy (ES) algorithm that explores only the subset of linear codes of a fixed length and dimension. To that end, we represent the candidate solutions as binary matrices and devise variation operators that preserve their ranks. Our experiments show that up to length $n=14$, our ES always converges to an optimal solution with a full success rate, and the evolved codes are all inequivalent to the Best-Known Linear Code (BKLC) given by MAGMA. On the other hand, for larger lengths, both the success rate of the ES as well as the diversity of the evolved codes start to drop, with the extreme case of $(16,8,5)$ codes which all turn out to be equivalent to MAGMA's BKLC., Comment: 15 pages, 3 figures, 3 tables

Published
2022

13. Building Correlation Immune Functions from Sets of Mutually Orthogonal Cellular Automata

Author

Mariot, Luca and Manzoni, Luca

Subjects
Computer Science - Cryptography and Security, Mathematics - Combinatorics
Abstract

Correlation immune Boolean functions play an important role in the implementation of efficient masking countermeasures for side-channel attacks in cryptography. In this paper, we investigate a method to construct correlation immune functions through families of mutually orthogonal cellular automata (MOCA). First, we show that the orthogonal array (OA) associated to a family of MOCA can be expanded to a binary OA of strength at least 2. To prove this result, we exploit the characterization of MOCA in terms of orthogonal labelings on de Bruijn graphs. Then, we use the resulting binary OA to define the support of a second-order correlation immune function. Next, we perform some computational experiments to construct all such functions up to $n=12$ variables, and observe that their correlation immunity order is actually greater, always at least 3. We conclude by discussing how these results open up interesting perspectives for future research, with respect to the search of new correlation-immune functions and binary orthogonal arrays., Comment: 15 pages, 1 figure, 1 table

Published
2022

14. The Influence of Local Search over Genetic Algorithms with Balanced Representations

Author

Manzoni, Luca, Mariot, Luca, and Tuba, Eva

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

We continue the study of Genetic Algorithms (GA) on combinatorial optimization problems where the candidate solutions need to satisfy a balancedness constraint. It has been observed that the reduction of the search space size granted by ad-hoc crossover and mutation operators does not usually translate to a substantial improvement of the GA performances. There is still no clear explanation of this phenomenon, although it is suspected that a balanced representation might yield a more irregular fitness landscape, where it could be more difficult for GA to converge to a global optimum. In this paper, we investigate this issue by adding a local search step to a GA with balanced operators, and use it to evolve highly nonlinear balanced Boolean functions. In particular, we organize our experiments around two research questions, namely if local search (1) improves the convergence speed of GA, and (2) decreases the population diversity. Surprisingly, while our results answer affirmatively the first question, they also show that adding local search actually \emph{increases} the diversity among the individuals in the population. We link these findings to some recent results on fitness landscape analysis for problems on Boolean functions., Comment: 14 pages, 4 figures

Published
2022

15. The Effect of Multi-Generational Selection in Geometric Semantic Genetic Programming

Author

Castelli, Mauro, Manzoni, Luca, Mariot, Luca, Menara, Giuliamaria, and Pietropolli, Gloria

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

Among the evolutionary methods, one that is quite prominent is Genetic Programming, and, in recent years, a variant called Geometric Semantic Genetic Programming (GSGP) has shown to be successfully applicable to many real-world problems. Due to a peculiarity in its implementation, GSGP needs to store all the evolutionary history, i.e., all populations from the first one. We exploit this stored information to define a multi-generational selection scheme that is able to use individuals from older populations. We show that a limited ability to use "old" generations is actually useful for the search process, thus showing a zero-cost way of improving the performances of GSGP., Comment: 19 pages, 4 figures, 5 tables. Submitted to Applied Sciences

Published
2022

16. On the Linear Components Space of S-boxes Generated by Orthogonal Cellular Automata

Author

Mariot, Luca and Manzoni, Luca

Subjects
Computer Science - Cryptography and Security, Computer Science - Formal Languages and Automata Theory, Mathematics - Combinatorics
Abstract

We investigate S-boxes defined by pairs of Orthogonal Cellular Automata (OCA), motivated by the fact that such CA always define bijective vectorial Boolean functions, and could thus be interesting for the design of block ciphers. In particular, we perform an exhaustive search of all nonlinear OCA pairs of diameter $d=4$ and $d=5$, which generate S-boxes of size $6\times 6$ and $8\times 8$, respectively. Surprisingly, all these S-boxes turn out to be linear, and thus they are not useful for the design of confusion layers in block ciphers. However, a closer inspection of these S-boxes reveals a very interesting structure. Indeed, we remark that the linear components space of the OCA-based S-boxes found by our exhaustive search are themselves the kernels of linear CA, or, equivalently, \emph{polynomial codes}. We finally classify the polynomial codes of the S-boxes obtained in our exhaustive search and observe that, in most cases, they actually correspond to the cyclic code with generator polynomial $X^{b}+1$, where $b=d-1$. Although these findings rule out the possibility of using OCA to design good S-boxes in block ciphers, they give nonetheless some interesting insights for a theoretical characterization of nonlinear OCA pairs, which is still an open question in general., Comment: 13 pages, updated version accepted in ACRI 2022

Published
2022

18. Heuristic Search of (Semi-)Bent Functions based on Cellular Automata

Author

Mariot, Luca, Saletta, Martina, Leporati, Alberto, and Manzoni, Luca

Subjects
Computer Science - Cryptography and Security
Abstract

An interesting thread in the research of Boolean functions for cryptography and coding theory is the study of secondary constructions: given a known function with a good cryptographic profile, the aim is to extend it to a (usually larger) function possessing analogous properties. In this work, we continue the investigation of a secondary construction based on cellular automata, focusing on the classes of bent and semi-bent functions. We prove that our construction preserves the algebraic degree of the local rule, and we narrow our attention to the subclass of quadratic functions, performing several experiments based on exhaustive combinatorial search and heuristic optimization through Evolutionary Strategies (ES). Finally, we classify the obtained results up to permutation equivalence, remarking that the number of equivalence classes that our CA-XOR construction can successfully extend grows very quickly with respect to the CA diameter., Comment: 29 pages, 2 figures, 2 tables, preprint submitted to Natural Computing

Published
2021

21. Salp Swarm Optimization: a Critical Review

Author

Castelli, Mauro, Manzoni, Luca, Mariot, Luca, Nobile, Marco S., and Tangherloni, Andrea

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

In the crowded environment of bio-inspired population-based metaheuristics, the Salp Swarm Optimization (SSO) algorithm recently appeared and immediately gained a lot of momentum. Inspired by the peculiar spatial arrangement of salp colonies, which are displaced in long chains following a leader, this algorithm seems to provide an interesting optimization performance. However, the original work was characterized by some conceptual and mathematical flaws, which influenced all ensuing papers on the subject. In this manuscript, we perform a critical review of SSO, highlighting all the issues present in the literature and their negative effects on the optimization process carried out by this algorithm. We also propose a mathematically correct version of SSO, named Amended Salp Swarm Optimizer (ASSO) that fixes all the discussed problems. We benchmarked the performance of ASSO on a set of tailored experiments, showing that it is able to achieve better results than the original SSO. Finally, we performed an extensive study aimed at understanding whether SSO and its variants provide advantages compared to other metaheuristics. The experimental results, where SSO cannot outperform simple well-known metaheuristics, suggest that the scientific community can safely abandon SSO., Comment: 25 pages, 6 figures. Published in Expert Systems with Applications

Published
2021
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22. Parallel Sandpiles or Spurious Bidirectional Icepiles?

Author

Cattaneo, Gianpiero and Manzoni, Luca

Subjects
Computer Science - Formal Languages and Automata Theory
Abstract

In a recent paper E. Formenti and K. Perrot (FP) introduce a global rule assumed to describe the discrete time dynamics associated with a sandpile model under the parallel application of a suitable local rule acting on d dimensional lattices of cells equipped with uniform neighborhood. In this paper we submit this approach to a critical analysis, in the simplest elementary particular case of a one-dimensional lattice, which can be divided in two parts. In the first part we prove that the FP global rule does not describe the dynamics of standard sandpiles, but rather furnishes a description of the quite different situation of height difference between consecutive piles. This is a semantic uncorrect difference of interpretation. In the second part we investigate the consequences of the uncorrect FP assumption proving that their global rule describes a bidirectional spurious dynamics of icepiles (rather than sandpiles), in the sense that this latter is the consequence of application of three local rules: bidirectional vertical rule, bidirectional horizontal rule (typical of icepiles), and a granule jump from the bottom to the top (spurious rule of the dynamics).

Published
2021

23. Evolutionary Strategies for the Design of Binary Linear Codes

Author

Carlet, Claude, Mariot, Luca, Manzoni, Luca, Picek, Stjepan, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Pérez Cáceres, Leslie, editor, and Stützle, Thomas, editor

Published
2023
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24. A Self-Adaptive Approach to Exploit Topological Properties of Different GAs’ Crossover Operators

Author

Ferreira, José, Castelli, Mauro, Manzoni, Luca, Pietropolli, Gloria, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Pappa, Gisele, editor, Giacobini, Mario, editor, and Vasicek, Zdenek, editor

Published
2023
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26. Preface

Author

Adorna, Henry, Bernardini, Giulia, Manzoni, Luca, and Zandron, Claudio

Published
2023
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27. Exploring Semi-bent Boolean Functions Arising from Cellular Automata

Author

Mariot, Luca, Saletta, Martina, Leporati, Alberto, and Manzoni, Luca

Subjects
Nonlinear Sciences - Cellular Automata and Lattice Gases, Computer Science - Cryptography and Security
Abstract

Semi-bent Boolean functions are interesting from a cryptographic standpoint, since they possess several desirable properties such as having a low and flat Walsh spectrum, which is useful to resist linear cryptanalysis. In this paper, we consider the search of semi-bent functions through a construction based on cellular automata (CA). In particular, the construction defines a Boolean function by computing the XOR of all output cells in the CA. Since the resulting Boolean functions have the same algebraic degree of the CA local rule, we devise a combinatorial algorithm to enumerate all quadratic Boolean functions. We then apply this algorithm to exhaustively explore the space of quadratic rules of up to 6 variables, selecting only those for which our CA-based construction always yields semi-bent functions of up to 20 variables. Finally, we filter the obtained rules with respect to their balancedness, and remark that the semi-bent functions generated through our construction by the remaining rules have a constant number of linear structures., Comment: 12 pages, 1 figure, submitted to ACRI 2020

Published
2020

28. Towards an evolutionary-based approach for natural language processing

Author

Manzoni, Luca, Jakobovic, Domagoj, Mariot, Luca, Picek, Stjepan, and Castelli, Mauro

Subjects
Computer Science - Computation and Language, Computer Science - Artificial Intelligence, Computer Science - Neural and Evolutionary Computing
Abstract

Tasks related to Natural Language Processing (NLP) have recently been the focus of a large research endeavor by the machine learning community. The increased interest in this area is mainly due to the success of deep learning methods. Genetic Programming (GP), however, was not under the spotlight with respect to NLP tasks. Here, we propose a first proof-of-concept that combines GP with the well established NLP tool word2vec for the next word prediction task. The main idea is that, once words have been moved into a vector space, traditional GP operators can successfully work on vectors, thus producing meaningful words as the output. To assess the suitability of this approach, we perform an experimental evaluation on a set of existing newspaper headlines. Individuals resulting from this (pre-)training phase can be employed as the initial population in other NLP tasks, like sentence generation, which will be the focus of future investigations, possibly employing adversarial co-evolutionary approaches., Comment: 18 pages, 7 figures, 2 tables. Accepted for publication at the Genetic and Evolutionary Computation Conference (GECCO 2020)

Published
2020

29. Tip the Balance: Improving Exploration of Balanced Crossover Operators by Adaptive Bias

Author

Manzoni, Luca, Mariot, Luca, and Tuba, Eva

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

The use of balanced crossover operators in Genetic Algorithms (GA) ensures that the binary strings generated as offsprings have the same Hamming weight of the parents, a constraint which is sought in certain discrete optimization problems. Although this method reduces the size of the search space, the resulting fitness landscape often becomes more difficult for the GA to explore and to discover optimal solutions. This issue has been studied in this paper by applying an adaptive bias strategy to a counter-based crossover operator that introduces unbalancedness in the offspring with a certain probability, which is decreased throughout the evolutionary process. Experiments show that improving the exploration of the search space with this adaptive bias strategy is beneficial for the GA performances in terms of the number of optimal solutions found for the balanced nonlinear Boolean functions problem., Comment: 13 pages, 4 figures

Published
2020

30. CoInGP: Convolutional Inpainting with Genetic Programming

Author

Jakobovic, Domagoj, Manzoni, Luca, Mariot, Luca, Picek, Stjepan, and Castelli, Mauro

Subjects
Computer Science - Neural and Evolutionary Computing, Computer Science - Computer Vision and Pattern Recognition, Computer Science - Machine Learning
Abstract

We investigate the use of Genetic Programming (GP) as a convolutional predictor for missing pixels in images. The training phase is performed by sweeping a sliding window over an image, where the pixels on the border represent the inputs of a GP tree. The output of the tree is taken as the predicted value for the central pixel. We consider two topologies for the sliding window, namely the Moore and the Von Neumann neighborhood. The best GP tree scoring the lowest prediction error over the training set is then used to predict the pixels in the test set. We experimentally assess our approach through two experiments. In the first one, we train a GP tree over a subset of 1000 complete images from the MNIST dataset. The results show that GP can learn the distribution of the pixels with respect to a simple baseline predictor, with no significant differences observed between the two neighborhoods. In the second experiment, we train a GP convolutional predictor on two degraded images, removing around 20% of their pixels. In this case, we observe that the Moore neighborhood works better, although the Von Neumann neighborhood allows for a larger training set., Comment: 21 pages, 8 figures, updated pre-print accepted at GECCO 2021

Published
2020

31. Balanced Crossover Operators in Genetic Algorithms

Author

Manzoni, Luca, Mariot, Luca, and Tuba, Eva

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

In several combinatorial optimization problems arising in cryptography and design theory, the admissible solutions must often satisfy a balancedness constraint, such as being represented by bitstrings with a fixed number of ones. For this reason, several works in the literature tackling these optimization problems with Genetic Algorithms (GA) introduced new balanced crossover operators which ensure that the offspring has the same balancedness characteristics of the parents. However, the use of such operators has never been thoroughly motivated, except for some generic considerations about search space reduction. In this paper, we undertake a rigorous statistical investigation on the effect of balanced and unbalanced crossover operators against three optimization problems from the area of cryptography and coding theory: nonlinear balanced Boolean functions, binary Orthogonal Arrays (OA) and bent functions. In particular, we consider three different balanced crossover operators (each with two variants: "left-to-right" and "shuffled"), two of which have never been published before, and compare their performances with classic one-point crossover. We are able to confirm that the balanced crossover operators performs better than all three balanced crossover operators. Furthermore, in two out of three crossovers, the "left-to-right" version performs better than the "shuffled" version., Comment: 26 pages, 9 figures. General revision of the original draft following reviews

Published
2019

32. The many roads to the simulation of reaction systems

Author

Ferretti, Claudio, Leporati, Alberto, Manzoni, Luca, and Porreca, Antonio E.

Subjects
Computer Science - Formal Languages and Automata Theory, Computer Science - Computational Engineering, Finance, and Science
Abstract

Reaction systems are a computational model inspired by the bio-chemical reactions that happen inside biological cells. They have been and currently are studied for their many nice theoretical properties. They are also a useful modeling tool for biochemical systems, but in order to be able to employ them effectively in the field the presence of efficient and widely available simulators is essential. Here we explore three different algorithms and implementations of the simulation, comparing them to the current state of the art. We also show that we can obtain performances comparable to GPU-based simulations on real-world systems by using a carefully tuned CPU-based simulator., Comment: Postprint, to appear in Fundamenta Informaticae

Published
2019
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33. Complexity of the dynamics of reaction systems

Author

Dennunzio, Alberto, Formenti, Enrico, Manzoni, Luca, and Porreca, Antonio E.

Subjects
Computer Science - Formal Languages and Automata Theory, Computer Science - Discrete Mathematics
Abstract

Reaction systems are discrete dynamical systems inspired by bio-chemical processes, whose dynamical behaviour is expressed by set-theoretic operations on finite sets. Reaction systems thus provide a description of bio-chemical phenomena that complements the more traditional approaches, for instance those based on differential equations. A comprehensive list of decision problems about the dynamical behavior of reaction systems (such as cycles and fixed/periodic points, attractors, and reachability) is provided along with the corresponding computational complexity, which ranges from tractable problems to PSPACE-complete problems., Comment: Preprint

Published
2019
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34. Characterizing PSPACE with shallow non-confluent P systems

Author

Leporati, Alberto, Manzoni, Luca, Mauri, Giancarlo, Porreca, Antonio E., and Zandron, Claudio

Subjects
Computer Science - Computational Complexity
Abstract

In P systems with active membranes, the question of understanding the power of non-confluence within a polynomial time bound is still an open problem. It is known that, for shallow P systems, that is, with only one level of nesting, non-confluence allows them to solve conjecturally harder problems than confluent P systems, thus reaching PSPACE. Here we show that PSPACE is not only a bound, but actually an exact characterization. Therefore, the power endowed by non-confluence to shallow P systems is equal to the power gained by confluent P systems when non-elementary membrane division and polynomial depth are allowed, thus suggesting a connection between the roles of non-confluence and nesting depth., Comment: Preprint. arXiv admin note: text overlap with arXiv:1902.03879

Published
2019
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35. On the dynamical behaviour of linear higher-order cellular automata and its decidability

Author

Dennunzio, Alberto, Formenti, Enrico, Manzoni, Luca, Margara, Luciano, and Porreca, Antonio E.

Subjects
Computer Science - Formal Languages and Automata Theory, Computer Science - Discrete Mathematics
Abstract

Higher-order cellular automata (HOCA) are a variant of cellular automata (CA) used in many applications (ranging, for instance, from the design of secret sharing schemes to data compression and image processing), and in which the global state of the system at time $t$ depends not only on the state at time $t-1$, as in the original model, but also on the states at time $t-2, \ldots, t-n$, where $n$ is the memory size of the HOCA. We provide decidable characterizations of two important dynamical properties, namely, sensitivity to the initial conditions and equicontinuity, for linear HOCA over the alphabet $\mathbb{Z}_m$. Such characterizations extend the ones shown in [23] for linear CA (LCA) over the alphabet $\mathbb{Z}^{n}_m$ in the case $n=1$. We also prove that linear HOCA of size memory $n$ over $\mathbb{Z}_m$ form a class that is indistinguishable from a specific subclass of LCA over $\mathbb{Z}_m^n$. This enables to decide injectivity and surjectivity for linear HOCA of size memory $n$ over $\mathbb{Z}_m$ using the decidable characterization provided in [2] and [19] for injectivity and surjectivity of LCA over $\mathbb{Z}^n_m$. Finally, we prove an equivalence between LCA over $\mathbb{Z}_m^n$ and an important class of non-uniform CA, another variant of CA used in many applications., Comment: Preprint

Published
2019
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36. A Turing machine simulation by P systems without charges

Author

Leporati, Alberto, Manzoni, Luca, Mauri, Giancarlo, Porreca, Antonio E., and Zandron, Claudio

Subjects
Computer Science - Computational Complexity
Abstract

It is well known that the kind of P systems involved in the definition of the P conjecture is able to solve problems in the complexity class $\mathbf{P}$ by leveraging the uniformity condition. Here we show that these systems are indeed able to simulate deterministic Turing machines working in polynomial time with a weaker uniformity condition and using only one level of membrane nesting. This allows us to embed this construction into more complex membrane structures, possibly showing that constructions similar to the one performed in [1] for P systems with charges can be carried out also in this case., Comment: Asian Branch of International Conference on Membrane Computing (ACMC 2018). arXiv admin note: text overlap with arXiv:1902.03879

Published
2019
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37. Solving QSAT in sublinear depth

Author

Leporati, Alberto, Manzoni, Luca, Mauri, Giancarlo, Porreca, Antonio E., and Zandron, Claudio

Subjects
Computer Science - Computational Complexity
Abstract

Among $\mathbf{PSPACE}$-complete problems, QSAT, or quantified SAT, is one of the most used to show that the class of problems solvable in polynomial time by families of a given variant of P systems includes the whole $\mathbf{PSPACE}$. However, most solutions require a membrane nesting depth that is linear with respect to the number of variables of the QSAT instance under consideration. While a system of a certain depth is needed, since depth 1 systems only allows to solve problems in $\mathbf{P^{\#P}}$, it was until now unclear if a linear depth was, in fact, necessary. Here we use P systems with active membranes with charges, and we provide a construction that proves that QSAT can be solved with a sublinear nesting depth of order $\frac{n}{\log n}$, where $n$ is the number of variables in the quantified formula given as input., Comment: 19th International Conference on Membrane Computing (CMC19)

Published
2019
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38. Search Space Reduction of Asynchrony Immune Cellular Automata by Center Permutivity

Author

Mariot, Luca, Manzoni, Luca, and Dennunzio, Alberto

Subjects
Nonlinear Sciences - Cellular Automata and Lattice Gases, Computer Science - Discrete Mathematics
Abstract

We continue the study of asynchrony immunity in cellular automata (CA), which can be considered as a weaker version of correlation immunity in the context of vectorial Boolean functions. The property could have applications as a countermeasure for side-channel attacks in CA-based cryptographic primitives, such as S-boxes and pseudorandom number generators. We first give some theoretical results on the necessary conditions that a CA rule must satisfy in order to meet asynchrony immunity, the most important one being center permutivity. Next, we perform an exhaustive search of all asynchrony immune CA rules of neighborhood size up to $5$, leveraging on the discovered theoretical properties to greatly reduce the size of the search space., Comment: 12 pages, 2 figures, extended version of the paper "Asynchrony Immune Cellular Automata" by L. Mariot presented at ACA 2016. Corrected small typos from previous version and added three bibliographical references

Published
2019

43. GANs for Integration of Deterministic Model and Observations in Marine Ecosystem

Author

Pietropolli, Gloria, Cossarini, Gianpiero, Manzoni, Luca, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Marreiros, Goreti, editor, Martins, Bruno, editor, Paiva, Ana, editor, Ribeiro, Bernardete, editor, and Sardinha, Alberto, editor

Published
2022
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44. Combining Geometric Semantic GP with Gradient-Descent Optimization

Author

Pietropolli, Gloria, Manzoni, Luca, Paoletti, Alessia, Castelli, Mauro, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Medvet, Eric, editor, Pappa, Gisele, editor, and Xue, Bing, editor

Published
2022
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46. Exploring Semi-bent Boolean Functions Arising from Cellular Automata

Author

Mariot, Luca, Saletta, Martina, Leporati, Alberto, Manzoni, Luca, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Gwizdałła, Tomasz M., editor, Manzoni, Luca, editor, Sirakoulis, Georgios Ch., editor, Bandini, Stefania, editor, and Podlaski, Krzysztof, editor

Published
2021
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47. Pruning Techniques for Mixed Ensembles of Genetic Programming Models

Author

Castelli, Mauro, Gonçalves, Ivo, Manzoni, Luca, and Vanneschi, Leonardo

Subjects
Computer Science - Neural and Evolutionary Computing, Computer Science - Machine Learning, Statistics - Machine Learning
Abstract

The objective of this paper is to define an effective strategy for building an ensemble of Genetic Programming (GP) models. Ensemble methods are widely used in machine learning due to their features: they average out biases, they reduce the variance and they usually generalize better than single models. Despite these advantages, building ensemble of GP models is not a well-developed topic in the evolutionary computation community. To fill this gap, we propose a strategy that blends individuals produced by standard syntax-based GP and individuals produced by geometric semantic genetic programming, one of the newest semantics-based method developed in GP. In fact, recent literature showed that combining syntax and semantics could improve the generalization ability of a GP model. Additionally, to improve the diversity of the GP models used to build up the ensemble, we propose different pruning criteria that are based on correlation and entropy, a commonly used measure in information theory. Experimental results,obtained over different complex problems, suggest that the pruning criteria based on correlation and entropy could be effective in improving the generalization ability of the ensemble model and in reducing the computational burden required to build it.

Published
2018
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48. A Distance Between Populations for n-Points Crossover in Genetic Algorithms

Author

Castelli, Mauro, Cattaneo, Gianpiero, Manzoni, Luca, and Vanneschi, Leonardo

Subjects
Computer Science - Neural and Evolutionary Computing
Abstract

Genetic algorithms (GAs) are an optimization technique that has been successfully used on many real-world problems. There exist different approaches to their theoretical study. In this paper we complete a recently presented approach to model one-point crossover using pretopologies (or Cech topologies) in two ways. First, we extend it to the case of n-points crossover. Then, we experimentally study how the distance distribution changes when the number of crossover points increases.

Published
2017

49. PPCon 1.0: Biogeochemical-Argo profile prediction with 1D convolutional networks.

Author

Pietropolli, Gloria, Manzoni, Luca, and Cossarini, Gianpiero

Abstract

Effective observation of the ocean is vital for studying and assessing the state and evolution of the marine ecosystem and for evaluating the impact of human activities. However, obtaining comprehensive oceanic measurements across temporal and spatial scales and for different biogeochemical variables remains challenging. Autonomous oceanographic instruments, such as Biogeochemical (BGC)-Argo profiling floats, have helped expand our ability to obtain subsurface and deep-ocean measurements, but measuring biogeochemical variables, such as nutrient concentration, still remains more demanding and expensive than measuring physical variables. Therefore, developing methods to estimate marine biogeochemical variables from high-frequency measurements is very much needed. Current neural network (NN) models developed for this task are based on a multilayer perceptron (MLP) architecture, trained over point-wise pairs of input–output features. Although MLPs can produce smooth outputs if the inputs change smoothly, convolutional neural networks (CNNs) are inherently designed to handle profile data effectively. In this study, we present a novel one-dimensional (1D) CNN model to predict profiles leveraging the typical shape of vertical profiles of a variable as a prior constraint during training. In particular, the Predict Profiles Convolutional (PPCon) model predicts nitrate, chlorophyll, and backscattering (bbp700) starting from the date and geolocation and from temperature, salinity, and oxygen profiles. Its effectiveness is demonstrated using a robust BGC-Argo dataset collected in the Mediterranean Sea for training and validation. Results, which include quantitative metrics and visual representations, prove the capability of PPCon to produce smooth and accurate profile predictions improving upon previous MLP applications. [ABSTRACT FROM AUTHOR]

Published
2024
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