Exponential formulas for the Jacobians and Jacobian matrices of analytic maps

It is shown that if the real-analytic map f(x) : Ill2 + BP2 has a Jacobian matrix whose eigenvaluee are always both one, then the map ls a diffeemorphism. An explicit form of the inverse ls given. The proof relies on a result which says that the only global solutions to the quasi-linear partial diff

In this paper, we establish some global weighted integral estimates for the Jacobians J(x,f) of an orlentation-preserving mapping f = (]1,f2 ..... in) : £/ \_\_, R,~ of the Sobolev class WI,n(~,R ") in John domains and L~(p)-domains. ~) 2005 Elsevier Ltd. All rights reserved.

In this paper we compute the compactified Jacobian of the singularity E . By 6 Ž . G. M. Greuel and H. Knorrer 1985, Math. Ann. 270, 417᎐425 this singularity has önly a finite number of isomorphism classes of rank 1 torsionfree modules. Using the theory of Matric Massey products, in an earlier work

The matrix exponential plays a very important role in many fields of mathematics and physics. It can be computed by many methods. This work is devoted to the study of some explicit formulas for computing e A , where A is a special square matrix. The main results are based on the convergent power ser