Project description
The ‘homotopy’ of algebra as a geometric object: looking for a connection
Homotopy in geometry expresses topological equivalence. For example, a sphere with no holes drilled through it belongs to the trivial first homotopy group (it is 'simply connected') and is not topologically 'the same' as a doughnut. With the support of the Marie Skłodowska-Curie Actions programme, the HADG project is investigating how such notions can be extended to algebra, particularly in the context of quantum differential geometry and related algebraic developments. The project will also explore applications to algebraic models of quantum gravity.
Objective
While cohomology theories of various kinds are known on algebras, here we explore the much harder problem of what is the ‘homotopy’ of an algebra as a geometric object? For example, when is an algebra ‘simply connected’? The project will make sense of this notion using a constructive approach to noncommutative differential geometry in which the possibly noncommutative algebra A is extended to a graded algebra of ‘differential forms’. The Experienced Researcher will first develop and study a recent proposal of a Hopf algebroid D_A of ‘differential operators’ associated to this data, the existence of which is implied by the More-Eilenberg theorem applied to the category of bimodules on A equipped with flat bimodule connections. In the classical case of functions on a smooth manifold, this would be a version of the path groupoid and Morita equivalent to π_1. He will then relate it to a proposed new construction of a universal (co)measuring bialgebra adapted to the differential graded case as a generalised ‘diffeomorphism group’ and to a proposed new notion of differential ‘character variety’ defined by each Hopf algebra H as the moduli of flat connections up to equivalence on quantum principal bundles over A with fibre H. Classically, the holonomy associated to a flat connection identifies this as maps from π_1 to the fibre group modulo conjugation. Using these ingredients, the further aim will be to arrive at a quantum differential geometric picture of the Turaev-Viro invariant of 3-manifolds and generalise it to a suitable class of differential algebras A. The project will also study an analogue of D_A in Connes’ spectral triple approach to noncommutative geometry based on an axiomatic ‘Dirac operator’, explore generalisations at the level of 2-categories and Hopf monads and look for applications to algebraic models of quantum gravity, where both diffeomorphism invariance and ‘loops’ are expected to play a fundamental role.
Fields of science (EuroSciVoc)
CORDIS classifies projects with EuroSciVoc, a multilingual taxonomy of fields of science, through a semi-automatic process based on NLP techniques. See: The European Science Vocabulary.
CORDIS classifies projects with EuroSciVoc, a multilingual taxonomy of fields of science, through a semi-automatic process based on NLP techniques. See: The European Science Vocabulary.
- natural sciences mathematics pure mathematics algebra
- natural sciences mathematics pure mathematics geometry
- natural sciences physical sciences theoretical physics
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Keywords
Project’s keywords as indicated by the project coordinator. Not to be confused with the EuroSciVoc taxonomy (Fields of science)
Project’s keywords as indicated by the project coordinator. Not to be confused with the EuroSciVoc taxonomy (Fields of science)
Programme(s)
Multi-annual funding programmes that define the EU’s priorities for research and innovation.
Multi-annual funding programmes that define the EU’s priorities for research and innovation.
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H2020-EU.1.3. - EXCELLENT SCIENCE - Marie Skłodowska-Curie Actions
MAIN PROGRAMME
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H2020-EU.1.3.2. - Nurturing excellence by means of cross-border and cross-sector mobility
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Topic(s)
Calls for proposals are divided into topics. A topic defines a specific subject or area for which applicants can submit proposals. The description of a topic comprises its specific scope and the expected impact of the funded project.
Calls for proposals are divided into topics. A topic defines a specific subject or area for which applicants can submit proposals. The description of a topic comprises its specific scope and the expected impact of the funded project.
Funding Scheme
Funding scheme (or “Type of Action”) inside a programme with common features. It specifies: the scope of what is funded; the reimbursement rate; specific evaluation criteria to qualify for funding; and the use of simplified forms of costs like lump sums.
Funding scheme (or “Type of Action”) inside a programme with common features. It specifies: the scope of what is funded; the reimbursement rate; specific evaluation criteria to qualify for funding; and the use of simplified forms of costs like lump sums.
MSCA-IF - Marie Skłodowska-Curie Individual Fellowships (IF)
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Call for proposal
Procedure for inviting applicants to submit project proposals, with the aim of receiving EU funding.
Procedure for inviting applicants to submit project proposals, with the aim of receiving EU funding.
(opens in new window) H2020-MSCA-IF-2020
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Net EU financial contribution. The sum of money that the participant receives, deducted by the EU contribution to its linked third party. It considers the distribution of the EU financial contribution between direct beneficiaries of the project and other types of participants, like third-party participants.
E1 4NS LONDON
United Kingdom
The total costs incurred by this organisation to participate in the project, including direct and indirect costs. This amount is a subset of the overall project budget.