Related references
Note: Only part of the references are listed.Traditional allometric analysis fails to provide a valid predictive model for mammalian metabolic rates
Gary C. Packard et al.
JOURNAL OF EXPERIMENTAL BIOLOGY (2008)
Sizing Up Allometric Scaling Theory
Van M. Savage et al.
PLOS COMPUTATIONAL BIOLOGY (2008)
Allometric exponents do not support a universal metabolic allometry
Craig R. White et al.
ECOLOGY (2007)
Twenty-fold difference in hemodynamic wall shear stress between murine and human aortas
Peter D. Weinberg et al.
JOURNAL OF BIOMECHANICS (2007)
The scaling and temperature dependence of vertebrate metabolism
Craig R. White et al.
BIOLOGY LETTERS (2006)
Universal scaling of respiratory metabolism, size and nitrogen in plants
PB Reich et al.
NATURE (2006)
Shape and efficiency in spatial distribution networks
MT Gastner et al.
JOURNAL OF STATISTICAL MECHANICS-THEORY AND EXPERIMENT (2006)
Beyond the '3/4-power law': variation in the intra- and interspecific scaling of metabolic rate in animals
DS Glazier
BIOLOGICAL REVIEWS (2005)
Yes, West, Brown and Enquist's model of allometric scaling is both mathematically correct and biologically relevant
JH Brown et al.
FUNCTIONAL ECOLOGY (2005)
Allometric scaling of mammalian metabolism
CR White et al.
JOURNAL OF EXPERIMENTAL BIOLOGY (2005)
Mammalian basal metabolic rate is proportional to body mass2/3
CR White et al.
PROCEEDINGS OF THE NATIONAL ACADEMY OF SCIENCES OF THE UNITED STATES OF AMERICA (2003)
A note on metabolic rate dependence on body size in plants and animals
AM Makarieva et al.
JOURNAL OF THEORETICAL BIOLOGY (2003)
Supply-demand balance and metabolic scaling
JR Banavar et al.
PROCEEDINGS OF THE NATIONAL ACADEMY OF SCIENCES OF THE UNITED STATES OF AMERICA (2002)
Network allometry
A Maritan et al.
GEOPHYSICAL RESEARCH LETTERS (2002)
Scaling, optimality, and landscape evolution
JR Banavar et al.
JOURNAL OF STATISTICAL PHYSICS (2001)
Re-examination of the '3/4-law of metabolism
PS Dodds et al.
JOURNAL OF THEORETICAL BIOLOGY (2001)
Geometry of river networks. I. Scaling, fluctuations, and deviations
PS Dodds et al.
PHYSICAL REVIEW E (2001)