AbstractWe prove that the convolution of two ultra-logconcave sequences is ultra-log-concave. This was conjectured recently by Pemantle and implies that a natural negative dependence property is preserved under the operation of “joining” families of exchangeable Bernoulli random variables
AbstractWe introduce the antipodal pairs property for probability measures on finite Boolean algebra...
We consider nonnegative infinitely divisible random variables whose Levy measures are either absolut...
We utilize and extend a simple and classical mechanism, combining log-concavity and majorization in ...
AbstractWe prove that the convolution of two ultra-logconcave sequences is ultra-log-concave. This w...
This thesis is concerned with negative correlation and log-concavity properties and relations betwee...
We investigate random variables arising in occupancy problems, and show the variables to be negative...
The probabilistic characterization of the relationship between two or more random variables calls fo...
AbstractGiven a sequence (ak)=a0,a1,a2,… of real numbers, define a new sequence L(ak)=(bk) where bk=...
We investigate random variables arising in occupancy problems, and show the variables to be negative...
AbstractDependence properties of occupancy numbers in the balls and bins experiment are studied. App...
AbstractIt is shown how a log concave sequence generates a log super-modular function on the lattice...
AbstractIn some situations, it is difficult and tedious to check notions of dependence properties an...
The strong Rayleigh property is a new and robust negative dependence property that implies negative ...
The strong Rayleigh property is a new and robust negative dependence property that implies negative ...
AbstractA 1996 result of Bender and Canfield showed that passing a log-concave sequence through the ...
AbstractWe introduce the antipodal pairs property for probability measures on finite Boolean algebra...
We consider nonnegative infinitely divisible random variables whose Levy measures are either absolut...
We utilize and extend a simple and classical mechanism, combining log-concavity and majorization in ...
AbstractWe prove that the convolution of two ultra-logconcave sequences is ultra-log-concave. This w...
This thesis is concerned with negative correlation and log-concavity properties and relations betwee...
We investigate random variables arising in occupancy problems, and show the variables to be negative...
The probabilistic characterization of the relationship between two or more random variables calls fo...
AbstractGiven a sequence (ak)=a0,a1,a2,… of real numbers, define a new sequence L(ak)=(bk) where bk=...
We investigate random variables arising in occupancy problems, and show the variables to be negative...
AbstractDependence properties of occupancy numbers in the balls and bins experiment are studied. App...
AbstractIt is shown how a log concave sequence generates a log super-modular function on the lattice...
AbstractIn some situations, it is difficult and tedious to check notions of dependence properties an...
The strong Rayleigh property is a new and robust negative dependence property that implies negative ...
The strong Rayleigh property is a new and robust negative dependence property that implies negative ...
AbstractA 1996 result of Bender and Canfield showed that passing a log-concave sequence through the ...
AbstractWe introduce the antipodal pairs property for probability measures on finite Boolean algebra...
We consider nonnegative infinitely divisible random variables whose Levy measures are either absolut...
We utilize and extend a simple and classical mechanism, combining log-concavity and majorization in ...
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