【摘 要】
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Ill describe the background and recent work on a micro and macro world connection in real,complex and p-harmonic geometry with wide-ranging applications.
【机 构】
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TheUniversityofOklahoma,USA
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Ill describe the background and recent work on a micro and macro world connection in real,complex and p-harmonic geometry with wide-ranging applications.
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There are two notions of scalar curvatures in Finsler geometry,one of which is the average of the Ricci curvature on the sphere fibre while another is the t
In this lecture,we will discuss a class of Finsler metrics of constant flag curvature.By using the properties of Weyl curvature and-curvature,we find two pa
In this talk,we prove the weak maximum principle in pointwise sense,Hopfs Lemma and the strong maximum principle for Q-subharmonic functions.
Randers metrics are natural and important Finsler metrics.In this lecture we review recent results in Randers geometry.In particular,we show a non-existence
In this talk,I start by introducing the concept of mean curvature for hypersurfaces in Minkowski space and also the anisotropic mean curvature.Then we discu
Chern classes are characteristic classes associated with vector bundles on a smooth manifold,they were introduced by Shiing-Shen Chern about seventy years a
An(α,β)-manifold(M,F)is a Finsler manifold with the Finsler metric F being defined by a Riemannian metric α and 1-form β on the manifold M.In this paper
In this talk we study Finsler submanifold theory from viewpoint of Chern connection.We introduce the notions of the second fundamental form and mean curvatu
The paper proposes extensions of the notions of Busemann-Hausdorff and Holmes-Thompson volume to Finslerian spacetime manifolds.These notions are designed t
We will discuss the isoperimetric problem in point of view of variation method in 2-dimensional the Finsler space forms with K=0 and K=-1.The circle centere