Midpoint rule for variational integrators on Lie groups

We give the Bernstein polynomials for basic matrix entries of irreducible unitary Ž . representations of compact Lie group SU 2 . We also give an application to the Ž . analytic continuation of certain distributions on SU 2 , and finally we briefly describe the Bernstein polynomial for B = B-semi-in

We consider the stochastic heat equations on Lie groups, that is, equations of the form t u=2 x u+b(u)+F(u) W 4 on R + \_G, where G is a compact Lie group, 2 is the Laplace Beltrami operator on G, b and F are Lipschitz coefficients, and where W 4 is a Gaussian space-correlated noise, which is white-

This paper is concerned with a Chebyshev quadrature rule for approximating one sided finite part integrals with smooth density functions. Our quadrature rule is based on the Chebyshev interpolation polynomial with the zeros of the Chebyshev polynomial T N+1 ({)&T N&1 (t). We analyze the stability an

Let \(\mu\) be an invariant measure on a regular orbit in a compact Lie group or in a Lie algebra. We prove sharp \(L^{\prime \prime}-L^{4}\) estimates for the convolution operators defined through \(\mu\). We also obtain similar results for the related Radon transform on the Lie algebra. 1945 Acade

This paper reveals that the sub-Laplacian LO on two step stratified Lie groups has a Himilar behavior like elliptic operators on the Euclidean space, that is, the sub-Laplacian satisfies a ~I o u p elliptic estimate, called the Gelliptic estimate (or the L P -regularity), and the general left hivari