Add to ORKGLet the random variable X be distributed over the non-negative integers and let Lm and Rm be the quotient and the remainder in the division of X by m. It is shown that X is geometric if and only if Lm and Rm are independent for m=2,3, . . . . In similar terms is also characterized the exponential random variable
Let {N(t), t>0} be a homogeneous Poisson process with parameter λ=1. Let Z be a nonnegative random v...
The expectations E[X (1) ], E[Z (1) ], and E[Y (1) ] of the minimum of n independent geometric, modi...
Convolutions of random variables which are either exponential or geometric are studied with respect ...
Let the random variable X be distributed over the non-negative integers and let Lm and Rm be the quo...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
In this paper we resent some recent characterizations of the exponential distribution and its discre...
In this paper we resent some recent characterizations of the exponential distribution and its discre...
In this note, a necessary and sufficient condition for the n-divisibility of a random variable (r.v....
AbstractMany connections between geometric and exponential distributions are known. Characterization...
Let {N(t), t>0} be a homogeneous Poisson process with parameter λ=1. Let Z be a nonnegative random v...
The expectations E[X (1) ], E[Z (1) ], and E[Y (1) ] of the minimum of n independent geometric, modi...
Convolutions of random variables which are either exponential or geometric are studied with respect ...
Let the random variable X be distributed over the non-negative integers and let Lm and Rm be the quo...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
We use the independence of the integer and fractional parts of exponentially distributed random vari...
In this paper we resent some recent characterizations of the exponential distribution and its discre...
In this paper we resent some recent characterizations of the exponential distribution and its discre...
In this note, a necessary and sufficient condition for the n-divisibility of a random variable (r.v....
AbstractMany connections between geometric and exponential distributions are known. Characterization...
Let {N(t), t>0} be a homogeneous Poisson process with parameter λ=1. Let Z be a nonnegative random v...
The expectations E[X (1) ], E[Z (1) ], and E[Y (1) ] of the minimum of n independent geometric, modi...
Convolutions of random variables which are either exponential or geometric are studied with respect ...