Add to ORKGIn this paper we prove global univalence for C1 maps in Rn when the Jacobian matrix has its determinant of sign opposite to that of all its principal minors
AbstractConsider a mappingf:Cn→Cnof the form identity plus a term with polynomial components that ar...
AbstractIn 1939 Keller conjectured that any polynomial mapping ƒ : Cn → Cn with constant nonvanishin...
We study the global invertibility of non-smooth, locally Lipschitz maps between infinite-dimensional...
This note is to extend a well-known theorem due to Gale and Nikaido on the univalence of nonlinear m...
This paper proposes a method of establishing the global univalence of a mapping without theassumptio...
AbstractSuppose F is a differentiable mapping from a rectangle R⊂En into En. Gale and Nikaido proved...
This note is aimed at presenting an easy and simple proposition on the univalence of a given nonline...
This note is a sequel to the previous one published in this journal (Vol. 30, No.1). In that article...
AbstractA well known univalence result due to D. Gale and H. Nikaido (1965, Math. Ann.159, 81–93) as...
AbstractA Samuelson map is here defined as a differentiable self-mapping of n-space with the propert...
We study the global inversion of a continuous nonsmooth mapping f : R-n -> R-n, which may be non-loc...
AbstractAn almost N-matrix A is one with real entries whose determinant is positive and proper princ...
In this paper we prove global univalence results in R4 when the Jacobian matrices are of the Leontie...
This paper presents a geometrical approach to the univalence problem for a system of cost functions....
AbstractA differentiable self-mapping of n-space is Samuelson if the leading principal minors of its...
AbstractConsider a mappingf:Cn→Cnof the form identity plus a term with polynomial components that ar...
AbstractIn 1939 Keller conjectured that any polynomial mapping ƒ : Cn → Cn with constant nonvanishin...
We study the global invertibility of non-smooth, locally Lipschitz maps between infinite-dimensional...
This note is to extend a well-known theorem due to Gale and Nikaido on the univalence of nonlinear m...
This paper proposes a method of establishing the global univalence of a mapping without theassumptio...
AbstractSuppose F is a differentiable mapping from a rectangle R⊂En into En. Gale and Nikaido proved...
This note is aimed at presenting an easy and simple proposition on the univalence of a given nonline...
This note is a sequel to the previous one published in this journal (Vol. 30, No.1). In that article...
AbstractA well known univalence result due to D. Gale and H. Nikaido (1965, Math. Ann.159, 81–93) as...
AbstractA Samuelson map is here defined as a differentiable self-mapping of n-space with the propert...
We study the global inversion of a continuous nonsmooth mapping f : R-n -> R-n, which may be non-loc...
AbstractAn almost N-matrix A is one with real entries whose determinant is positive and proper princ...
In this paper we prove global univalence results in R4 when the Jacobian matrices are of the Leontie...
This paper presents a geometrical approach to the univalence problem for a system of cost functions....
AbstractA differentiable self-mapping of n-space is Samuelson if the leading principal minors of its...
AbstractConsider a mappingf:Cn→Cnof the form identity plus a term with polynomial components that ar...
AbstractIn 1939 Keller conjectured that any polynomial mapping ƒ : Cn → Cn with constant nonvanishin...
We study the global invertibility of non-smooth, locally Lipschitz maps between infinite-dimensional...