%0 Journal Article %1 altenberg2012resolvent %A Altenberg, L %D 2012 %J Proc Natl Acad Sci U S A %K dispersal evolution_of_dispersal population_dynamics spatial_structure %N 10 %P 3705-3710 %R 10.1073/pnas.1113833109 %T Resolvent positive linear operators exhibit the reduction phenomenon %U http://www.ncbi.nlm.nih.gov/pubmed/22357763?dopt=Abstract %V 109 %X The spectral bound, s(αA + βV), of a combination of a resolvent positive linear operator A and an operator of multiplication V, was shown by Kato to be convex in β ∈ R. Kato's result is shown here to imply, through an elementary "dual convexity" lemma, that s(αA + βV) is also convex in α > 0, and notably, ∂s(αA + βV)/∂α ≤ s(A). Diffusions typically have s(A) ≤ 0, so that for diffusions with spatially heterogeneous growth or decay rates, greater mixing reduces growth. Models of the evolution of dispersal in particular have found this result when A is a Laplacian or second-order elliptic operator, or a nonlocal diffusion operator, implying selection for reduced dispersal. These cases are shown here to be part of a single, broadly general, "reduction" phenomenon.

@article{altenberg2012resolvent, abstract = {The spectral bound, s(αA + βV), of a combination of a resolvent positive linear operator A and an operator of multiplication V, was shown by Kato to be convex in β ∈ R. Kato's result is shown here to imply, through an elementary "dual convexity" lemma, that s(αA + βV) is also convex in α > 0, and notably, ∂s(αA + βV)/∂α ≤ s(A). Diffusions typically have s(A) ≤ 0, so that for diffusions with spatially heterogeneous growth or decay rates, greater mixing reduces growth. Models of the evolution of dispersal in particular have found this result when A is a Laplacian or second-order elliptic operator, or a nonlocal diffusion operator, implying selection for reduced dispersal. These cases are shown here to be part of a single, broadly general, "reduction" phenomenon.}, added-at = {2014-10-07T23:59:08.000+0200}, author = {Altenberg, L}, biburl = {https://www.bibsonomy.org/bibtex/2faf1dfc40484acd44bf823f419616e9d/peter.ralph}, doi = {10.1073/pnas.1113833109}, interhash = {2282d86a12ba3d9482a737bdf0c58182}, intrahash = {faf1dfc40484acd44bf823f419616e9d}, journal = {Proc Natl Acad Sci U S A}, keywords = {dispersal evolution_of_dispersal population_dynamics spatial_structure}, month = mar, number = 10, pages = {3705-3710}, pmid = {22357763}, timestamp = {2014-10-07T23:59:08.000+0200}, title = {Resolvent positive linear operators exhibit the reduction phenomenon}, url = {http://www.ncbi.nlm.nih.gov/pubmed/22357763?dopt=Abstract}, volume = 109, year = 2012 }