Designing and interpreting 4D tumour spheroid experiments
Murphy, R
Browning, A
Gunasingh, G
Haass, N
Simpson, M
A Bayesian sequential learning framework to parameterise continuum models of melanoma invasion into human skin
Browning, A
Haridas, P
Simpson, M
Model-based data analysis of tissue growth in thin 3D printed scaffolds
Browning, A
Maclaren, O
Buenzli, P
Lanaro, M
Allenby, M
Woodruff, M
Simpson, M
Three-dimensional experiments and individual based simulations show that cell proliferation drives melanoma nest formation in human skin tissue
Haridas, P
Browning, A
McGovern, J
McElwain, D
Simpson, M
A Bayesian Sequential Learning Framework to Parameterise Continuum Models of Melanoma Invasion into Human Skin
Browning, A
Haridas, P
Simpson, M
Bulletin of Mathematical Biology
volume 81
issue 3
676-698
(15 Mar 2019)
Identifying density-dependent interactions in collective cell behaviour
Browning, A
Jin, W
Plank, M
Simpson, M
Journal of The Royal Society Interface
volume 17
issue 165
20200143
(29 Apr 2020)
Model-based data analysis of tissue growth in thin 3D printed scaffolds
Browning, A
Maclaren, O
Buenzli, P
Lanaro, M
Allenby, M
Woodruff, M
Simpson, M
Journal of Theoretical Biology
volume 528
110852
(03 Nov 2021)
Designing and interpreting 4D tumour spheroid experiments
Murphy, R
Browning, A
Gunasingh, G
Haass, N
Simpson, M
Communications Biology
volume 5
issue 1
91
(24 Jan 2022)
A stochastic mathematical model of 4D tumour spheroids with real-time fluorescent cell cycle labelling
Klowss, J
Browning, A
Murphy, R
Carr, E
Plank, M
Gunasingh, G
Haass, N
Simpson, M
Journal of The Royal Society Interface
volume 19
issue 189
20210903
(06 Apr 2022)
Thu, 09 Mar 2023
16:00
16:00
L4
Mass equidistribution for Siegel cusp forms of degree 2
Abhishek Saha
(Queen Mary University of London)
Abstract
I will talk about some current work with Jesse Jaasaari and Steve Lester where we investigate the analogue of the Quantum Unique Ergodicity (QUE) conjecture in the weight aspect for Siegel cusp forms of degree 2 and full level. Assuming the Generalized Riemann Hypothesis (GRH) we establish QUE for Saito–Kurokawa lifts as the weight tends to infinity. As an application, we prove the equidistribution of zero divisors.