Leonardo Forero Mendoza scite author profile

ABSTRACT, In this paper we study the topological entropy of certain invariant sets of diffeomorphisms, namely the closure of the set of transverse homoclinic points associated with a hyperbolic periodic point, in terms of the growth rate of homoclinic orbits, First we study homoclinic closures which are hyperbolic in n-dimensional compact manifolds, Using the pseudo-orbit shadowing property of basic sets we prove a formula similar to Bowen's one on the growth of periodic points. For the nonuniformly hyperbolic case we restrict our attention to compact surfaces,

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The entropy of C² surface diffeomorphisms in terms of Hausdorff dimension and a Lyapunov exponent

Mendoza¹

1985

Ergod. Th. Dynam. Sys.

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Deep Convolutional Neural Networks for Weed Detection in Agricultural Crops Using Optical Aerial Images

Ramírez

Achanccaray

Mendoza

et al. 2020

Int. Arch. Photogramm. Remote Sens. Spatial Inf. Sci.

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Abstract. The presence of weeds in agricultural crops has been one of the problems of greatest interest in recent years as they consume natural resources and negatively affect the agricultural process. For this purpose, a model has been implemented to segment weed in aerial images. The proposed model relies on DeepLabv3 architecture trained upon patches extracted from high-resolution aerial imagery. The dataset employed consisted in 5 high-resolution images that describes a sugar beet agricultural field in Germany. SegNet and U-Net architectures were selected for comparison purposes. Our results demonstrate that balancing of data, together with a greater spatial context leads better results with DeepLabv3 achieving up to 0.89 and 0.81 in terms of AUC and F1-score, respectively.

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