Results 261 to 270 of about 2,694 (314)

Modeling Pressure‐Dependent Wave and Vessel Compliance in the Brain Following Middle Cerebral Artery Occlusion

Microcirculation, Volume 33, Issue 1, January 2026.
ABSTRACT Objective This study demonstrates the impact of alterations in pressure, vascular compliance, arterial pulsatility, and autoregulation on tissue perfusion following middle cerebral artery (MCA) occlusion using mathematical modeling. Methods Our previous mathematical model of the cerebral circulation is expanded to include vessel compliance and
Erin Zhao, Jared Barber, Shomita S. Mathew‐Steiner, Savita Khanna, Chandan K. Sen, Julia Arciero   +5 more
wiley   +1 more source

Large-Scale Glass-Transition Temperature Prediction with an Equivariant Neural Network for Screening Polymers. [PDF]

ACS Omega
Long Z, Lu H, Zhang Z.
europepmc   +1 more source

The Category of Anyon Sectors for Non-Abelian Quantum Double Models. [PDF]

Commun Math Phys
Bols A, Hamdan M, Naaijkens P, Vadnerkar S.   +3 more
europepmc   +1 more source

On the Converse of Pansu's Theorem. [PDF]

Arch Ration Mech Anal
De Philippis G, Marchese A, Merlo A, Pinamonti A, Rindler F.   +4 more
europepmc   +1 more source

Dual Lie algebras of Heisenberg Poisson Lie groups

Dual Lie algebras of Heisenberg Poisson Lie groups
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Deformations of Lie group and Lie algebra representations

Journal of Mathematical Physics, 1993
A complete study of deformations of Lie group and Lie algebra representations, including differentiability and integrability results, is given. Adapted results are given in the semisimple case. A notion of induced deformations is introduced. Various examples are given, including deformations of indecomposable representations.
Lesimple, Marc, Pinczon, Georges
openaire   +3 more sources

Quantization of Lie Groups and Lie Algebras

1988
Publisher Summary This chapter focuses on the quantization of lie groups and lie algebras. The Algebraic Bethe Ansatz—the quantum inverse scattering method—emerges as a natural development of the various directions in mathematical physics: the inverse scattering method for solving nonlinear equations of evolution, the quantum theory of magnets, the ...
N. YU. RESHETIKHIN, L.A. TAKHTADZHYAN, L. D. FADDEEV   +2 more
openaire   +1 more source

Cohomology of Lie Algebras and Algebraic Groups

American Journal of Mathematics, 1986
Let \({\mathcal G}\) be a simple, simply connected algebraic group defined and split over the finite field of p elements, let G be the points of \({\mathcal G}\) in an algebraically closed field k and \(G_ 1\) the scheme theoretic kernel of the Frobenius morphism from G to itself.
Friedlander, Eric M., Parshall, Brian J.
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Lie-Nilpotency Indices of Group Algebras

Bulletin of the London Mathematical Society, 1992
For an associative ring \(A\), define \(A^{[1]}\) to be \(A\) and \(A^{[n]}\) (\(n>1\)) to be the two-sided ideal of \(A\) that is generated by all \(n\)- fold Lie commutators \([a_ 1,[a_ 2,\dots,[a_{n-1},a_ n]\dots]]\) (\(a_ i\in A\)). \(A\) is called Lie-nilpotent if \(A^{[n]}=0\) for some \(n\), in which case the smallest such \(n\) is denoted \(t_ ...
Bhandari, Ashwani K., Passi, I. B. S.
openaire   +1 more source