Apr 25 (Thu)
13:00 MCS2068 G&TLuc Vrancken (KU Leuven/Université Polytechnique Hauts-de-France): Homogeneous 6 dimensional nearly Kaehler manifolds and their
submanifolds
We present a survey of how the curvature tensor of all known
homogeneous 6 dimensional nearly Kähler spaces (both in the definite and
in the pseudo Riemannian case) can be expressed in an invariant way
using the induced geometric structures on the 6 dimensional nearly
Kähler space.
As an application we show how this can be used to study special classes
of submanifolds in these spaces. In the latter case we will in
particular focus on totally geodesic Lagrangian submanifolds and
equivariant Lagrangian immersions.
Venue: MCS2068
Apr 26 (Fri)
13:00 online ( ProbSimon Wittmann (Hong Kong Polytechnic University): Construction of a Diffusion on the Wasserstein Space
For stochastic analysis on the Wasserstein space, it is crucial to construct a diffusion process which plays a role of Brownian motion in finite-dimensions, or the Ornstein-Uhlenbeck process on a separable Hilbert space. This has been a long standing open problem due to the lack of a volume or Gaussian measure on the Wasserstein space, which could serve as an invariant measure.
To study diffusion processes on the $p$-Wasserstein space $\mathcal P_p $ for $p\in [1,\infty)$ over a separable, reflexive Banach space $X$, we present a criterion on the quasi-regularity of Dirichlet forms in $L^2(\mathcal P_p,\Lambda)$ for a reference probability $\Lambda$ on $\mathcal P_p$ by using an upper bound condition with the uniform norm of the intrinsic derivative. The condition is easy to check in applications. As a consequence, a class of quasi-regular local Dirichlet forms are constructed on $\mathcal P_p$ by using image of Dirichlet forms on the tangent space $L^p(X\to X,\mu_0)$ at a reference point $\mu_0\in \mathcal P_p$. In particular, the quasi-regularity is confirmed for Ornstein-Uhlenbeck type Dirichlet forms, and an explicit heat kernel estimate is derived based on the eigenvalues of the covariance operator of the underlying Gaussian measure.
Venue: online (streamed into MCS2068)
Apr 30 (Tue)
15:00 MCS3070 APDEEugene Shargorodsky (King's College London): Variations on Liouville's theorem
The talk discusses generalisations of Liouville's theorem to nonlocal translation-invariant operators. It is based on a joint work with D. Berger and R.L. Schilling, and a further joint work with the same co-authors and T. Sharia. We consider operators with continuous but not necessarily infinitely smooth symbols.
It follows from our results that if $\left\{\eta \in \mathbb{R}^n \mid m(\eta) = 0\right\} \subseteq \{0\}$, then, under suitable conditions,
every polynomially bounded weak solution $f$ of the equation $m(D)f=0$ is in fact a polynomial, while sub-exponentially growing solutions admit analytic continuation to entire functions on $\mathbb{C}^n$.
Venue: MCS3070
May 01 (Wed)
13:30 zoom A&CSachin Jain (IISER Pune): Exploring cosmological correlators in alpha-vacua
de-Sitter(dS) space allows for a generalized class of vacua, known as α−vacua, described by some parameters. The Bunch-Davies (BD) vacuum is a point in this parameter space. We show that the correlation function in the α−vacua (for rigid dS space) can be related to three-dimensional CFT correlation functions if we relax the requirement of consistency with OPE limit. We then explore inflationary correlators in α−vacua. Working within the leading slow-roll approximation, we compute the four-point scalar correlator (the trispectrum). We check that the conformal Ward identities are met between the three and four-point scalar α-vacua correlators. Surprisingly, this contrasts the previously reported negative result of the Ward identities being violated between the two and the three-point correlators.
Venue: zoom
Zoom: https://durhamuniversity.zoom.us/j/99116644259?pwd=Q0xLa0ZHdkxZeVRxVXZkNFJCa2Y1Zz09
16:00 MCS0001 D&PLEndre Süli (Oxford): Hilbert’s 19th problem and discrete De Giorgi–Nash–Moser theory: analysis and applications
Mathematical models of non-Newtonian fluids play an important role in science and engineering, and their analysis has been an active field of research over the past decade. This talk is concerned with the mathematical analysis of numerical methods for the approximate solution of systems of nonlinear elliptic partial differential equations that arise in models of chemically reacting viscous incompressible non-Newtonian fluids, such as the synovial fluid found in the cavities of synovial joints. The synovial fluid consists of an ultra filtrate of blood plasma that contains hyaluronic acid, whose concentration influences the shear-thinning property and helps to maintain a high viscosity; its function is to reduce friction during movement. The shear-stress appearing in the model involves a power-law type nonlinearity, where, instead of being a fixed constant, the power law-exponent is a function of a spatially varying nonnegative concentration function, which, in turn, solves a nonlinear
convection-diffusion equation. In order to prove the convergence of the sequence of numerical approximations to a solution of this coupled system of nonlinear partial differential equations, a uniform Hölder norm bound needs to be derived for the sequence of numerical approximations to the concentration in a setting, where the diffusion coefficient in the convection-diffusion equation satisfied by the concentration is merely an L^∞ function. This necessitates the development of a discrete counterpart of the De Giorgi–Nash–Moser theory. Motivated by an early paper by Aguilera and Caffarelli (1986) in the simpler setting of Laplace’s equation, we derive such uniform Hölder norm bounds on the sequence of continuous piecewise linear finite element approximations to the concentration. We then use these to deduce the convergence of the sequence of approximations to a weak solution of the coupled system of nonlinear partial differential equations under consideration.
Venue: MCS0001
May 02 (Thu)
13:00 MCS2068 G&THendrik Süß (INI/Jena): Three-dimensional Calabi-Yau cones with 2-torus action
There are two main constructions of Calabi-Yau cones in
dimension 3. Firstly, the anticanonical cones over (log) del Pezzo
surfaces and secondly via Gorenstein toric singularities. The toric
construction automatically comes with the action of a 3-dimensional
torus and the Calabi-Yau condition is automatically fulfilled. For the
construction from del Pezzo surfaces we only obtain a 1-dimensional
torus action and the Kähler-Einstein condition for the del Pezzo
surfaces is crucial to obtain a Calabi-Yau cone metric. In my talk I
will address the remaining cases with 2-torus action by discussing a
combinatorial approach which interpolates between the two previous
constructions and also explain how the Calabi-Yau property is reflected
in this combinatorial language.
Venue: MCS2068
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Usual Venue: zoom
Contact: arthur.lipstein@durham.ac.uk
May 01 13:30 Sachin Jain (IISER Pune): Exploring cosmological correlators in alpha-vacua
de-Sitter(dS) space allows for a generalized class of vacua, known as α−vacua, described by some parameters. The Bunch-Davies (BD) vacuum is a point in this parameter space. We show that the correlation function in the α−vacua (for rigid dS space) can be related to three-dimensional CFT correlation functions if we relax the requirement of consistency with OPE limit. We then explore inflationary correlators in α−vacua. Working within the leading slow-roll approximation, we compute the four-point scalar correlator (the trispectrum). We check that the conformal Ward identities are met between the three and four-point scalar α-vacua correlators. Surprisingly, this contrasts the previously reported negative result of the Ward identities being violated between the two and the three-point correlators.
Venue: zoom
Usual Venue: MCS3070
Contact: alpar.r.meszaros@durham.ac.uk
Apr 30 15:00 Eugene Shargorodsky (King's College London): Variations on Liouville's theorem
The talk discusses generalisations of Liouville's theorem to nonlocal translation-invariant operators. It is based on a joint work with D. Berger and R.L. Schilling, and a further joint work with the same co-authors and T. Sharia. We consider operators with continuous but not necessarily infinitely smooth symbols.
It follows from our results that if $\left\{\eta \in \mathbb{R}^n \mid m(\eta) = 0\right\} \subseteq \{0\}$, then, under suitable conditions,
every polynomially bounded weak solution $f$ of the equation $m(D)f=0$ is in fact a polynomial, while sub-exponentially growing solutions admit analytic continuation to entire functions on $\mathbb{C}^n$.
Venue: MCS3070
Usual Venue: MCS2052
Contact: andrew.krause@durham.ac.uk
No upcoming seminars have been scheduled (not unusual outside term time).
Usual Venue: OC218
Contact: mohamed.anber@durham.ac.uk
For more information, see HERE.
No upcoming seminars have been scheduled (not unusual outside term time).
Usual Venue: MCS0001
Contact: sabine.boegli@durham.ac.uk,alpar.r.meszaros@durham.ac.uk
May 01 16:00 Endre Süli (Oxford): Hilbert’s 19th problem and discrete De Giorgi–Nash–Moser theory: analysis and applications
Mathematical models of non-Newtonian fluids play an important role in science and engineering, and their analysis has been an active field of research over the past decade. This talk is concerned with the mathematical analysis of numerical methods for the approximate solution of systems of nonlinear elliptic partial differential equations that arise in models of chemically reacting viscous incompressible non-Newtonian fluids, such as the synovial fluid found in the cavities of synovial joints. The synovial fluid consists of an ultra filtrate of blood plasma that contains hyaluronic acid, whose concentration influences the shear-thinning property and helps to maintain a high viscosity; its function is to reduce friction during movement. The shear-stress appearing in the model involves a power-law type nonlinearity, where, instead of being a fixed constant, the power law-exponent is a function of a spatially varying nonnegative concentration function, which, in turn, solves a nonlinear
convection-diffusion equation. In order to prove the convergence of the sequence of numerical approximations to a solution of this coupled system of nonlinear partial differential equations, a uniform Hölder norm bound needs to be derived for the sequence of numerical approximations to the concentration in a setting, where the diffusion coefficient in the convection-diffusion equation satisfied by the concentration is merely an L^∞ function. This necessitates the development of a discrete counterpart of the De Giorgi–Nash–Moser theory. Motivated by an early paper by Aguilera and Caffarelli (1986) in the simpler setting of Laplace’s equation, we derive such uniform Hölder norm bounds on the sequence of continuous piecewise linear finite element approximations to the concentration. We then use these to deduce the convergence of the sequence of approximations to a weak solution of the coupled system of nonlinear partial differential equations under consideration.
Venue: MCS0001
Usual Venue: MCS3052
Contact: andrew.krause@durham.ac.uk
No upcoming seminars have been scheduled (not unusual outside term time).
Usual Venue: MCS2068
Contact: martin.p.kerin@durham.ac.uk
Recordings of past seminars can be found HERE.
Apr 25 13:00 Luc Vrancken (KU Leuven/Université Polytechnique Hauts-de-France): Homogeneous 6 dimensional nearly Kaehler manifolds and their
submanifolds
We present a survey of how the curvature tensor of all known
homogeneous 6 dimensional nearly Kähler spaces (both in the definite and
in the pseudo Riemannian case) can be expressed in an invariant way
using the induced geometric structures on the 6 dimensional nearly
Kähler space.
As an application we show how this can be used to study special classes
of submanifolds in these spaces. In the latter case we will in
particular focus on totally geodesic Lagrangian submanifolds and
equivariant Lagrangian immersions.
Venue: MCS2068
May 02 13:00 Hendrik Süß (INI/Jena): Three-dimensional Calabi-Yau cones with 2-torus action
There are two main constructions of Calabi-Yau cones in
dimension 3. Firstly, the anticanonical cones over (log) del Pezzo
surfaces and secondly via Gorenstein toric singularities. The toric
construction automatically comes with the action of a 3-dimensional
torus and the Calabi-Yau condition is automatically fulfilled. For the
construction from del Pezzo surfaces we only obtain a 1-dimensional
torus action and the Kähler-Einstein condition for the del Pezzo
surfaces is crucial to obtain a Calabi-Yau cone metric. In my talk I
will address the remaining cases with 2-torus action by discussing a
combinatorial approach which interpolates between the two previous
constructions and also explain how the Calabi-Yau property is reflected
in this combinatorial language.
Venue: MCS2068
May 09 13:00 Andrey Lazarev (Lancaster): TBA
Jun 13 10:00 Tirumala Venkata Chakradhar (Bristol): TBA
Jun 13 13:00 Asma Hassannezhad (Bristol): TBA
Jun 13 15:00 Georges Habib (Lebanese University/IECL Lorraine): TBA
Usual Venue: MCS2068
Contact: kohei.suzuki@durham.ac.uk
Apr 26 13:00 Simon Wittmann (Hong Kong Polytechnic University): Construction of a Diffusion on the Wasserstein Space
For stochastic analysis on the Wasserstein space, it is crucial to construct a diffusion process which plays a role of Brownian motion in finite-dimensions, or the Ornstein-Uhlenbeck process on a separable Hilbert space. This has been a long standing open problem due to the lack of a volume or Gaussian measure on the Wasserstein space, which could serve as an invariant measure.
To study diffusion processes on the $p$-Wasserstein space $\mathcal P_p $ for $p\in [1,\infty)$ over a separable, reflexive Banach space $X$, we present a criterion on the quasi-regularity of Dirichlet forms in $L^2(\mathcal P_p,\Lambda)$ for a reference probability $\Lambda$ on $\mathcal P_p$ by using an upper bound condition with the uniform norm of the intrinsic derivative. The condition is easy to check in applications. As a consequence, a class of quasi-regular local Dirichlet forms are constructed on $\mathcal P_p$ by using image of Dirichlet forms on the tangent space $L^p(X\to X,\mu_0)$ at a reference point $\mu_0\in \mathcal P_p$. In particular, the quasi-regularity is confirmed for Ornstein-Uhlenbeck type Dirichlet forms, and an explicit heat kernel estimate is derived based on the eigenvalues of the covariance operator of the underlying Gaussian measure.
Venue: online (streamed into MCS2068)