AbstractConditions and a criterion for the presence of minimal components in the foliation of a Morse form ω on a smooth closed oriented manifold M are given in terms of (1) the maximum rank of a subgroup in H1(M,Z) with trivial cup-product, (2) ker[ω], and (3) rkω=defrkim[ω], where [ω] is the integration map
summary:We study the topology of foliations of close cohomologous Morse forms (smooth closed 1-forms...
In this paper we prove, using the Poincare-Hopf inequalities, that a minimal number of non-degenerat...
Abstract. We study the topology of foliations of close cohomologous Morse forms on a smooth closed o...
Conditions and a criterion for the presence of minimal components in the foliation of a Morse form ω...
AbstractConditions and a criterion for the presence of minimal components in the foliation of a Mors...
Abstract. On a closed orientable surface M2g of genus g, we consider the foliation of a weakly gener...
summary:The foliation of a Morse form $\omega$ on a closed manifold $M$ is considered. Its maximal c...
We study the geometry of compact singular leaves γ and minimal components Cmin of the foliation Fω o...
AbstractWe study the geometry of compact singular leaves γ and minimal components Cmin of the foliat...
Abstract. On a compact oriented manifold without boundary, we consider a closed 1-form with singular...
On a smooth closed n-manifold, we consider Morse forms with wedge-product zero; we call such forms c...
Let (M,g) be a compact, connected, without boundary riemannian manifold that is homogeneous, i.e. ea...
AbstractLet M be a smooth manifold and let F be a codimension one, C∞ foliation on M, with isolated ...
TIB: RN 4020 (696) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Informationsbibliot...
Let f be a Morse function on a closed surface Σ such that zero is a regular value and such that f ad...
summary:We study the topology of foliations of close cohomologous Morse forms (smooth closed 1-forms...
In this paper we prove, using the Poincare-Hopf inequalities, that a minimal number of non-degenerat...
Abstract. We study the topology of foliations of close cohomologous Morse forms on a smooth closed o...
Conditions and a criterion for the presence of minimal components in the foliation of a Morse form ω...
AbstractConditions and a criterion for the presence of minimal components in the foliation of a Mors...
Abstract. On a closed orientable surface M2g of genus g, we consider the foliation of a weakly gener...
summary:The foliation of a Morse form $\omega$ on a closed manifold $M$ is considered. Its maximal c...
We study the geometry of compact singular leaves γ and minimal components Cmin of the foliation Fω o...
AbstractWe study the geometry of compact singular leaves γ and minimal components Cmin of the foliat...
Abstract. On a compact oriented manifold without boundary, we consider a closed 1-form with singular...
On a smooth closed n-manifold, we consider Morse forms with wedge-product zero; we call such forms c...
Let (M,g) be a compact, connected, without boundary riemannian manifold that is homogeneous, i.e. ea...
AbstractLet M be a smooth manifold and let F be a codimension one, C∞ foliation on M, with isolated ...
TIB: RN 4020 (696) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Informationsbibliot...
Let f be a Morse function on a closed surface Σ such that zero is a regular value and such that f ad...
summary:We study the topology of foliations of close cohomologous Morse forms (smooth closed 1-forms...
In this paper we prove, using the Poincare-Hopf inequalities, that a minimal number of non-degenerat...
Abstract. We study the topology of foliations of close cohomologous Morse forms on a smooth closed o...