The following pages link to An allometric model for trees (Q2187522):
Displaying 12 items.
- On the transposition and the improvement of an allometric model from river networks to trees: identification of analogous objects, variables and modellings (Q781197) (← links)
- The allometric quarter-power scaling model and its applicability to grand fir and \textit{eucalyptus} trees (Q1695274) (← links)
- Mathematical models arising in the fractal forest gap via local fractional calculus (Q1724954) (← links)
- Consequences of the fractal architecture of trees on their structural measures (Q1788624) (← links)
- Unifying constructal theory of tree roots, canopies and forests (Q1797577) (← links)
- Fractional approach for estimating sap velocity in trees (Q2017476) (← links)
- Development of a mathematical method for classifying and comparing tree architecture using parameters from a topological model of a trifurcating botanical tree (Q2177075) (← links)
- A similarity criterion for the forest stand growth (Q2836709) (← links)
- A STRUCTURALLY BASED ANALYTIC MODEL FOR ESTIMATION OF BIOMASS AND FUEL LOADS OF WOODLAND TREES (Q3653128) (← links)
- (Q4796277) (← links)
- MATHEMATICAL MODELS TO ESTIMATE THE MASS OF LEAF AND SKETCH THE SHAPE OF TREE (Q5299701) (← links)
- Arboreal models and their stability (Q6055556) (← links)
