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3.2. Allometric scaling laws. Allometry (greek: allos = diferent; metros = measure): How does a part change when the total size is varied?. Coordinaten transformations can capture changes in form. This can also be looked at in the same individual.
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Allometry (greek: allos = diferent; metros = measure): How does a part change when the total size is varied?
But also for populations of different people to basically determine the ideal weight in terms of size...
Plot this on a double logarithmic scale and it becomes simpler – and you can see where the BMI comes from…
Independent dimensions: SI units Any quantity can be written as a power-law monomial in the independent units
A (in)famous example: The energy of a nuclear explosion US government wanted to keep energy yield of nuclear blasts a secret. Pictures of nuclear blast were released in Life magazine Using Dimensional Analysis, G.I. Taylor determined energy of blast and government was upset because they thought there had been a leak of information
Radius, R, of blast depends on time since explosion, t, energy of explosion, E, and density of medium, , that explosion expands into • [R]=m, [t]=s,[E]=kg*m2/s2, =kg/m3 • R=tpEq k q=1/5, k=-1/5, p=2/5
Rowing speed for different numbers of Oarsmen Fdrag = r v2 l2 f(Re) from DA
Power = r v3 l2 f(Re) ~ N N ~ Volume ~ l3 => N ~ v3 N2/3 => v ~ N1/9 Can be tested from results of olympic games in different rowing categories
3 10 2 10 1 10 0 10 -5 -3 -1 1 3 5 7 9 10 10 10 10 10 10 10 10 Boeing 747 F-16 Beech Baron Cruising speed (m/s) goose sailplane starling eagle hummingbird house wren bee crane fly fruit fly dragonfly damsel fly Mass (grams) Cruise speeds at sea level
3 10 2 10 1 10 0 10 -5 -3 -1 1 3 5 7 9 10 10 10 10 10 10 10 10 Boeing 747 F-16 Beech Baron Cruising speed (m/s) goose sailplane starling eagle hummingbird house wren bee crane fly fruit fly dragonfly damsel fly Mass (grams) Cruise speeds at sea level
Consider a simple explanation L A=Area W
3 10 2 10 1 10 0 10 -5 -3 -1 1 3 5 7 9 10 10 10 10 10 10 10 10 Boeing 747 F-16 Beech Baron Cruising speed (m/s) goose sailplane starling eagle hummingbird house wren bee crane fly fruit fly dragonfly damsel fly Mass (grams) Fits pretty well!
3 10 2 10 1 10 0 10 -5 -3 -1 1 3 5 7 9 10 10 10 10 10 10 10 10 What do variations from nominalimply? Boeing 747 Short wings, maneuverable F-16 Beech Baron Cruising speed (m/s) goose sailplane starling eagle hummingbird house wren bee Long wings, soaring and gliding crane fly fruit fly dragonfly damsel fly Mass (grams)
More biological: how are shape and size connected? Elephant (6000 kg) Fox (5 kg)
Simple scaling argument (Gallilei) Load is proportional to weight Weight is proportional to Volume ~ L3 Load is limited by yield stress and leg area; I.e. L3 ~ d2sY This implies d ~ L3/2 Or d/L ~ L1/2 ~ M1/6
Only true for leg bones and land animals... Vogel, Comparative Biomechanics (2003)
Bone calcification is dependent on applied stresses – self regulatory mechanism Wolff’s Law
Can also be seen in the legs of football players Food & Nutrition Research, 52 (2008)
Similar for the size of the stem in trees – the bigger the tree the bigger its stem
Another example: divisions in “fractal” systems (blood vessels) Metabolism works by nutrients, which are transported through pipes in a network. This forms a fractal structure, so what are fractals?
What’s special about fractals is that the “dimension” is not necessarily a whole number
1 dP = - - 2 2 u ( )( r z ) h 4 dx p 4 r = - D Q ( ) P h 8 L Most vessels are laminar, i.e. governed by Poiseuille Flow • Take the Navier Stokes equation without external force and uniform flow along the tube u= u(r ) : ¶ æ ö P 1 d du = h Ñ = h 2 ç ÷ u z ¶ x z dz dz è ø
= + 2 Cost Q p K ( r L ) p p 3 Û 2 Min. cost KLr 2 The power needed to create a flow in a tube At optimal flow, costs are minimal ¶ - C 32 L h 1 / 6 h æ ö 16 L = + = 2 o Q 2 K rL 0 p = 1 / 3 ç ÷ r Q ¶ 5 p r r 2 p K è ø Thus for an optimal system:
What does that imply for the divisions? continuity Optimal Flow Q ~ r3 So on every level, the cube of the vessel size needs to be constant: Sr3 = konst Cecil Murray,PNAS 12, 207 (1926).
This fits the experimental observation (here from a dog) Science, 249 992 (1990)
Again there’s a self-regulatory mechanism behind this. The shearing force on the vessel is constant if the size is given by the flow1/3 h K h 1 / 2 r dp 4 ö æ t = - = - = - Q è ø w p 3 2 dx r L This is true over the whole length of the system. Science, 249 992 (1990)
Thus deviations from Q ~ r3 give shearing forces, inducing growth via e.g. K+ channels Nature, 331 168 (1988)
But also via gene expression and protein synthesis Nature, 459 1131 (2009)
This regulates the growth and leads to Murray’s Law Shearing force at a division
These things are age dependent in humans (wall thickness and radius)
Profile of blood speed (dog’s aorta)
...or the lifespan as a function of weight i.e. There’s only a constant number of heart beats
