A5079691389- Advanced Topics in Algebra
- Advanced Operator Algebra Research
- Holomorphic and Operator Theory
- Cell Adhesion Molecules Research
- Algebraic structures and combinatorial models
- Angiogenesis and VEGF in Cancer
- Immune cells in cancer
- Immune Cell Function and Interaction
- T-cell and B-cell Immunology
- Advanced Algebra and Geometry
- Advanced Banach Space Theory
- Metabolism and Genetic Disorders
- Vascular Tumors and Angiosarcomas
- interferon and immune responses
- Kidney Stones and Urolithiasis Treatments
- Pharmacological Effects of Natural Compounds
- Immune Response and Inflammation
- Cytokine Signaling Pathways and Interactions
- Neuroscience of respiration and sleep
- Immunotherapy and Immune Responses
- Hyperglycemia and glycemic control in critically ill and hospitalized patients
- Pediatric Urology and Nephrology Studies
- Liver physiology and pathology
- Monoclonal and Polyclonal Antibodies Research
- CAR-T cell therapy research
School of the Art Institute of Chicago
1999-2025
California State University, Long Beach
2021-2023
Seattle Psychoanalytic Society and Institute
2021
NHS Greater Glasgow and Clyde
2020
University of Iowa
2017-2018
Science Applications International Corporation (United States)
1996-1999
National Cancer Institute
1996-1999
Care Resource
1990
Abstract The mechanisms that regulate the adhesion and migration of NK cells to across endothelium have been studied under nonflow conditions; however, involvement these processes in vivo is poorly understood. present studies investigated potential vascular ligand interactions determine recruitment pulmonary hepatic parenchyma, s.c. tumor after treatment mice with biologic response modifiers. Seventy-two hours a single injection cytokine-inducing agent poly-L-lysine stabilized carboxylmethyl...
This illustration represents how a patient's view of themselves can be altered while going through iatrogenic trauma. Figure. Inner Perspective
Isolated murine splenic NK cells and the cultured endothelioma cell line, eEND2, were used to study effects of cytokines on cell/endothelial adhesion. Treatment eEND2 with TNF-alpha induced a marked increase (four- sevenfold) in adherence cells, as compared control cultures or treated IL-1 alpha IL-6. induction was dose dependent rapid kinetics, reaching maximum at concentrations between 10 1000 U/ml after 2-h incubation. treatment L929 fibroblasts CL-2 hepatoma did not result increased The...
Abstract In this study four murine IL-12 naked DNA expression plasmids (pIL-12), containing both the p35 and p40 subunits, were shown to induce systemic biological effects in vivo after intradermal injection. Three of vectors augmented NK activity induced IFN-γ IFN-γ-inducible Mig genes. Both p70 heterodimer proteins documented serum within 24 h injection pIL-12o− plasmid, which also highest level spleen liver among constructs. Interestingly, mRNA at site protein levels followed a biphasic...
Abstract Fibroblast growth factor 1 (FGF-1)–coated collagen-gelatin sponges were affixed to various tissues generate vascular beds, in which the vessels originated tissue affixed. Organ-derived endothelium was obtained from vascularized implanted or on skin, peritoneal wall, abdominal mesentery, epimysium, spleen, and liver. Collagenase digestion yielded single-cell suspensions that analyzed by flow cytometry. Approximately 25% of cells positive for endothelial cell (EC) markers MECA-32...
Abstract In this note, we present criteria that are equivalent to a locally compact Hausdorff groupoid G being effective. One of these conditions is satisfies the C*-algebraic local bisection hypothesis ; is, every normaliser in reduced twisted C*-algebra supported on an open bisection. The semigroup normalisers plays fundamental role our proof, as does cyclic group C*-algebras.
We show how to recover a discrete twist over an ample Hausdorff groupoid from pair consisting of algebra and what we call quasi-Cartan subalgebra. identify precisely which twists arise in this way (namely, those that satisfy the local bisection hypothesis), prove assignment twisted Steinberg algebras such our construction are mutually inverse. algebraic pairs correspond effective groupoids principal groupoids. also indicate scope results by identifying large classes for hypothesis holds...
We prove that twisted groupoid C*-algebras are characterised, up to isomorphism, by having Cartan semigroups, a natural generalisation of normaliser semigroups subalgebras. This extends the classic Kumjian-Renault theory general \'etale C*-algebras, even non-reduced non-effective groupoids.
In this note, we present criteria that are equivalent to a locally compact Hausdorff groupoid $G$ being effective. One of these conditions is satisfies the "C*-algebraic local bisection hypothesis"; is, every normaliser in reduced twisted C*-algebra supported on an open bisection. The semigroup normalisers plays fundamental role our proof, as does cyclic group C*-algebras.
We classify certain algebras of matrix-valued cross-sections over an annulus up to complete isometric isomorphism, based on topological bundle invariants. In particular, we study sections matrix bundles which are continuous the closure and holomorphic its interior. Our strategy includes exploiting relationship between concomitants modulus automorphic functions, as well classification $n$-homogeneous $C^*$-algebras by Fell Tomiyama-Takesaki. Furthermore, describe a partial extension our...
This note presents an analysis of a class operator algebras constructed as cross-sectional flat holomorphic matrix bundles over finitely bordered Riemann surface. These are partly inspired by the bundle shifts Abrahamse and Douglas. The first objective is to understand boundary representations containing $C^*$-algebra, i.e. Arveson's noncommutative Choquet for each our algebras. their $C^*$-algebras calculated, it shown that they correspond evaluations on Secondly, we show Azumaya algebras,...
In this paper, we answer a question of Blecher-Muhly-Paulsen pertaining to identifying topological invariants for completely bounded Morita equivalences holomorphic cross-section algebras. Given certain natural subcontext strong context $n$-homogeneous $C^*$-algebras whose spectrum $T$ is an annulus, are able estimate the norm lifting identity subalgebra by conformal invariant annulus and property associated matrix bundle. We give generalization above example in which bordered Riemann...
Wigginton, J M1*; Park, W2; Back, T C3; Gieselhart, L4; Wiltrout, A3; Sayers, T3; McCormick, K3; R H4* Author Information