Cartan geometry, Lie and representation theory, Integrable Systems, quantum Groups and quantum computing towards the understanding of the geometry of deep Learning and its Applications

MSCA (Marie Skłodowska-Curie)HORIZON-TMA-MSCA-SEID: 101086123
EC Contribution
€8,740
Consortium Size
21 orgs
Start Year
2023
Summary

CaLIGOLA aims at advancing the research in Cartan Geometry, Lie Theory, Integrable Systems and Quantum Groups to provide insight into a variety of multidisciplinary fields oriented towards the applications with a special interest in machine learning and quantum computing. Sound mathematical models for quantum computing, vision and more generally machine learning are a priority for Horizon Europe and strategic to include Europe among the leading actors in such fields. Through the theory of symmetric spaces from the Cartan Geometric and Lie theoretic point of view, we shall implement the Erlangen philosophy for mathematical and physical questions (integrable systems and SUSY gauge field theory), but also for more applied themes including Quantum Computing and (geometric) Deep Learning. Quantum symmetric spaces and quantum representations will be the key to approach the questions of fault tolerant quantum algorithms in topological quantum computing and quantum information geometry on homogeneous spaces. With the language of Cartan geometry and Quantum Groups, we shall reformulate group invariant neural network models. Persistent homology and topological data analysis will take a step forward towards a metric theory on the space of observers. With the help of Lie group thermodynamic, we shall push the understanding of symmetries at a deeper level. Overall, the new algorithms of Deep Learning and Geometric Deep Learning will find a better modeling and understanding towards a comprehensive theory of dimensionality reduction of parameter space via group equivariance.

Consortium (21)

Project Results (30)

Source: CORDIS, the EU research results database.

Publications (16)
A new perspective on border completion in visual cortex as bicycle rear wheel geodesics paths via sub Riemannian Hamiltonian formalism
Diff. Geom. and Applications· 2024DOI
R. Fioresi; A. Marraffa; J. Petkovic
A novel iterative algorithm to improve segmentations with deep convolutional neural networks trained with synthetic X-ray computed tomography data (i.S.Sy.Da.T.A)
Computational Materials Science· 2024DOI
A. Tsamos, S. Evsevleev, R. Fioresi, F. Faglioni, G. Bruno
Black hole perturbation theory and multiple polylogarithms
Journal of High Energy Physics· 2024DOI
Gleb Aminov, Paolo Arnaudo, Giulio Bonelli, Alba Grassi, Alessandro Tanzini
Black Hole Perturbation Theory Meets CFT$_2$: Kerr Compton Amplitudes from Nekrasov-Shatashvili Functions
Phys. Rev. D· 2024DOI
Bautista, Yilber Fabian; Bonelli, Giulio; Iossa, Cristoforo; Tanzini, Alessandro; Zhou, Zihan
Boundary Structure of the Standard Model Coupled to Gravity
Annales Henri Poincaré· 2024DOI
Giovanni Canepa, Alberto S. Cattaneo, Filippo Fila-Robattino, Manuel Tecchiolli
Cartan moving frames and the data manifolds
Information Geometry· 2024DOI
Eliot Tron, Rita Fioresi, Nicolas Couëllan, Stéphane Puechmorel
CONFORMALLY COMPACT AND HIGHER CONFORMAL YANG–MILLS EQUATIONS
· 2024
A. Rod Gover, Emanuele Latini, Andrew Waldron, Yongbing Zhang
Effect of noisy environment on secure quantum teleportation of unimodal Gaussian states
Quantum Information Processing· 2024DOI
Mehrabankar, S.; Mahmoudi, P. (Payman); Abbasnezhad, F.; Afshar, D.; Isar, A.
Levi-Civita connection on the irreducible quantum flag manifolds
· 2024DOI
J. Bhowmick, B. Ghosh, A. Krutov, R. Buachalla
One loop effective actions in Kerr-(A)dS black holes
Physical Review D· 2024DOI
Paolo Arnaudo, Giulio Bonelli, Alessandro Tanzini
Reducing the number of qubits by a half in one dimensional quantum simulations of Ising chains
New Journal of Physics· 2024DOI
Mehrabankar, Somayeh; Garca-March, Miguel ngel; Almudver, Carmen G.; Prez, Armando
Semiholonomic jets and induced modules in Cartan geometry calculus
Archivum Mathematicum· 2024DOI
Jan Slovák, Vladimír Souček
Spontaneous Emergence of Robustness to Light Variation in CNNs With a Precortically Inspired Module
Neural Computation· 2024DOI
J. Petkovic, R. Fioresi
Deep learning and geometric deep learning: An introduction for mathematicians and physicists
International Journal of Geometric Methods in Modern Physics· 2023DOI
R. Fioresi, F. Zanchetta
Generalized root systems
Transactions of the AMS· 2023DOI
Dimitrov, Ivan; Fioresi, Rita
Geometric Science of Information
Lecture Notes in Computer Science· 2023DOI
Deliverables (13)
Other Results (1)
Periodic Reporting for period 1 - CaLIGOLA (Cartan geometry, Lie and representation theory, Integrable Systems, quantum Groups and quantum computing towards the understanding of the geometry of deep Learning and its Applications)