System Upgrade on Tue, May 28th, 2024 at 2am (EDT)
Existing users will be able to log into the site and access content. However, E-commerce and registration of new users may not be available for up to 12 hours.For online purchase, please visit us again. Contact us at customercare@wspc.com for any enquiries.
Results: 1 - 2of2
Save this search
Please login to be able to save your searches and receive alerts for new content matching your search criteria.
Conformal super Virasoro algebra: Matrix model and quantum deformed algebra
Preview AbstractIn this paper, we construct the super Virasoro algebra with an arbitrary conformal dimension Δ from the generalized ℛ(p,q)-deformed quantum algebra and investigate the ℛ(p,q)-deformed super Virasoro algebra with the particular conformal dimension Δ=1. Furthermore, we perform the ℛ(p,q)-conformal Virasoro n-algebra, the ℛ(p,q)-conformal super Virasoro n-algebra (n-even) and discuss a toy model for the ℛ(p,q)-conformal Virasoro constraints and ℛ(p,q)-conformal super Virasoro constraints. Besides, we generalized the notion of the ℛ(p,q)-elliptic Hermitian matrix model with an arbitrary conformal dimension Δ. Finally, we deduce relevant particular cases generated by quantum algebras known in the literature.
Slowly converging Yamabe-type flow on manifolds with boundary
Preview AbstractCarlotto, Chodosh and Rubinstein studied the rate of convergence of the Yamabe flow on a closed (compact without boundary) manifold M:
∂∂tg(t)=−(Rg(t)−¯Rg(t))g(t)inM.In this paper, we prove the corresponding results on manifolds with boundary. More precisely, given a compact manifold M with smooth boundary ∂M, we study the convergence rate of the Yamabe flow with boundary:∂∂tg(t)=−(Rg(t)−¯Rg(t))g(t)inMandHg(t)=0on∂Mand the conformal mean curvature flow:∂∂tg(t)=−(Hg(t)−¯Hg(t))g(t)on∂MandRg(t)=0inM.