TY  - JOUR 
AU  - Sanz, Fernando
PY  - 1998
SN  - 0373-0956
UR  - https://uvadoc.uva.es/handle/10324/68191
AB  - Let \gamma be an integral solution of an analytic real vector field  defined in a neighbordhood of 
0\in R3. Suppose that \gamma has a single limit point at 0. We say that \gamma is non oscillating if, for any analytic surface H, either \gamma is...
LA  - eng
PB  - Centre Mersenne
KW  - Vector field - Gradient - Tangent - Oscillation - Blowing-up - Desingularization - Center manifold
TI  - Non oscillating solutions of analytic gradient vector fields
DO  - 10.5802/aif.1648
ER  -