The canonical stratification of jet spaces. Singularities occur everywhere in nature, from the formation and collapse of stars to the morphology of living embryos. They appear whenever the geometry of surfaces or spaces undergoes a process of twisting, folding, or collapsing on itself. Singularity Theory is the study of such phenomena, an important branch of modern mathematics which has close connections with many other branches of mathematics and applied sciences. Singularity Theory lies at the ....The canonical stratification of jet spaces. Singularities occur everywhere in nature, from the formation and collapse of stars to the morphology of living embryos. They appear whenever the geometry of surfaces or spaces undergoes a process of twisting, folding, or collapsing on itself. Singularity Theory is the study of such phenomena, an important branch of modern mathematics which has close connections with many other branches of mathematics and applied sciences. Singularity Theory lies at the crossroads of the paths connecting the most important areas of applications of mathematics with its most abstract parts. Analytic Singularity Theory is a central part of Singularity Theory. This project would lead to substantially new advancements in Analytic Singularity Theory.Read moreRead less
Protecting Against Malaria Through Liver-resident Memory T Cells
Funder
National Health and Medical Research Council
Funding Amount
$1,196,853.00
Summary
We have shown that formation of liver-resident memory T cells (Trm), a newly discovered type of immune cells, can be induced by an innovative vaccination strategy called prime and trap for highly efficient protection against malaria in mice. Here, we will enhance prime and trap vaccination efficacy by defining the conditions that maximize liver Trm-mediated protection and will characterize simian and human liver Trm cells, paving the way to create the most efficient human malaria vaccine to date
Development And Validation Of A Latent Tuberculosis Diagnostic
Funder
National Health and Medical Research Council
Funding Amount
$534,865.00
Summary
Globally, tuberculosis is a leading cause of death with 9.6 million new diagnoses in 2014. The diagnosis of latent TB infection is important, but is difficult to make because current assays are suboptimal. We have developed a very simple assay which detects responses to TB antigens by co-expression of two surface markers expressed by CD4+ T cells. We propose to develop this into a highly standardised kit for the diagnosis of TB with our commercial partner Cytognos.
Investigating Post-transcriptional Gene Regulation In Cancer
Funder
National Health and Medical Research Council
Funding Amount
$645,205.00
Summary
In this program, I will enhance our understanding of cancer gene regulation and provide novel avenues for the treatment of aggressive tumours. Using own data and that from collaborators, I will determine patterns of gene regulation in blood cancers and identify markers that predict disease outcome. I aim to understand how gene regulation can transform healthy cells into tumour cells and whether personalised treatment can kill tumour cells more effectively and prevent relapse and metastasis.
Ubiquitin And SUMO DNA Damage Response Signalling At Deprotected Telomeres During The Cell Cycle
Funder
National Health and Medical Research Council
Funding Amount
$302,627.00
Summary
Following genome damage cells stop the cell division process and initiate DNA repair. We discovered that at specific times during cell division his does not happen if the damage signals originate from the chromosome ends (i.e. “telomeres”). We anticipate this is necessary to prevent genomic instability in healthy cells and may be driving genomic instability in cancer cells. Experiments described here will elucidate the molecular mechanisms and biological significance of our observation.
Normal forms and Chern-Moser connection in the study of Cauchy-Riemann Manifolds. This research project is aimed at a systematic study of Cauchy-Riemann manifolds, their holomorphic mappings and automorphisms, by means of a unifying approach based on
Chern-Moser type normal forms. The importance of Cauchy-Riemann manifolds stems from the fact that they bridge complex structure and holomorphy with the Riemannian nature of real manifolds. Construction of an analogue of the Chern-Moser normal form ....Normal forms and Chern-Moser connection in the study of Cauchy-Riemann Manifolds. This research project is aimed at a systematic study of Cauchy-Riemann manifolds, their holomorphic mappings and automorphisms, by means of a unifying approach based on
Chern-Moser type normal forms. The importance of Cauchy-Riemann manifolds stems from the fact that they bridge complex structure and holomorphy with the Riemannian nature of real manifolds. Construction of an analogue of the Chern-Moser normal form for multicodimensional Levi-nondegenerate CR-manifolds and extension of CR-mappings between them are major goals in complex analysis. Identification of Chern-Moser chains and equivariant linearisation of isotropy automorphisms are major goals in geometry.Read moreRead less
Initial Interactions Of Herpes Simplex Virus With Innate Immune Cells In Human Skin
Funder
National Health and Medical Research Council
Funding Amount
$522,589.00
Summary
Herpes simplex viruses 1 and 2 cause widespread and occasionally serious diseases including genital herpes, neonatal death and encephalitis. Current vaccine candidates are at best partially effective. This grant will examine the way that the virus enters, initially spreads within the skin and interacts with immune cells to help determine which cells should be stimulated by vaccines.
Links between DNA replication and chromosome end maintenance. This project aims to increase knowledge of the way in which cells maintain their genomes, including the ends of their chromosomes, to enable their own survival. The ends of chromosomes (telomeres) are essential for survival and proliferation of the cells of most organisms. This project aims to determine the molecular details of a recently discovered link between telomere maintenance and the way cells maintain the integrity of their ge ....Links between DNA replication and chromosome end maintenance. This project aims to increase knowledge of the way in which cells maintain their genomes, including the ends of their chromosomes, to enable their own survival. The ends of chromosomes (telomeres) are essential for survival and proliferation of the cells of most organisms. This project aims to determine the molecular details of a recently discovered link between telomere maintenance and the way cells maintain the integrity of their genome. This is likely to lead to increased understanding of the fundamental biological process of genome maintenance, representing a significant scientific advance. The project expects to have far-reaching implications for biotechnology applications that require the survival of cells.Read moreRead less
Understanding Mitotic Telomere Deprotection. This project aims to study telomeres, the DNA and protein structures that protect chromosome ends. During cell division, cells under stress intentionally uncap their telomeres. This project expects to generate new knowledge that challenges the conventional notion of telomeres as static elements, showing instead that telomeres can be dynamic signalling hubs. Expected outcomes of this project include an understanding of the genetic, proteomic, and signa ....Understanding Mitotic Telomere Deprotection. This project aims to study telomeres, the DNA and protein structures that protect chromosome ends. During cell division, cells under stress intentionally uncap their telomeres. This project expects to generate new knowledge that challenges the conventional notion of telomeres as static elements, showing instead that telomeres can be dynamic signalling hubs. Expected outcomes of this project include an understanding of the genetic, proteomic, and signalling pathways involved in this novel phenomenon. This should provide significant benefits to our fundamental understanding of biological processes that protect human genomes and provide a valuable dataset for research on telomere biology, DNA repair, and genome stability.Read moreRead less
Harmonic analysis of Laplacians in curved spaces. Harmonic Analysis is a branch of mathematics which is interrelated to other fields of mathematics like complex analysis, number theory and partial differential equations (pdes) with many applications in engineering and technology. This project aims to solve a number of difficult fundamental problems at the frontier of harmonic analysis in understanding Laplacians in curved spaces. Such Laplacians control the propagation of heat and waves on manif ....Harmonic analysis of Laplacians in curved spaces. Harmonic Analysis is a branch of mathematics which is interrelated to other fields of mathematics like complex analysis, number theory and partial differential equations (pdes) with many applications in engineering and technology. This project aims to solve a number of difficult fundamental problems at the frontier of harmonic analysis in understanding Laplacians in curved spaces. Such Laplacians control the propagation of heat and waves on manifolds and Lie groups, arising in mathematical physics and quantum mechanics. Expected outcomes are the solutions of dispersive equations and the framework of singular integrals in curved spaces; new ideas and techniques in harmonic analysis developed; and training of Australian future mathematicians.Read moreRead less