Remarks on the Jacobian Conjecture

We prove that a polynomial map from \(\mathbf{R}^{n}\) to itself with non-zero constant Jacobian determinant is a stably tame automorphism if its linear part is the identity and all the coefficients of its higher order terms are non-positive. We also prove that the Jacobian conjecture holds for any

have made a deep conjecture about the calculation of the K-theory of certain types of C \* -algebras [1,2]. In particular, for a discrete group Γ they have conjectured the calculation of K \* (C \* r (Γ)), the Ktheory of the reduced C \* -algebra of Γ. So far, there is quite little evidence for this

## Abstract C. Thomassen proposed a conjecture: Let __G__ be a __k__‐connected graph with the stability number α ≥ __k__, then __G__ has a cycle __C__ containing __k__ independent vertices and all their neighbors. In this paper, we will obtain the following result: Let __G__ be a __k__‐connected gr

Let KÂk be a normal extension of number fields, and / a character on its Galois group G. Stark's conjectures relate the lead term of the Taylor expansion of the Artin L-series L(s, /) at s=0 to the determinant of a matrix whose entries are linear combinations of logs of absolute values of units in K