AbstractUsing order statistics, we prove Gauss' 2F1 identity probabilistically. As a consequence, we show that Gauss' 2F1 summation formula is related to an inverse Pólya distribution. We observe that a relationship exists between WZ-pairs and our probabilistic approach
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Computing the posterior distribution of a probabilistic program is a hard task for which no one-fit-...
AbstractUsing order statistics, we prove Gauss' 2F1 identity probabilistically. As a consequence, we...
AbstractA binomial coefficient identity equivalent to Saalschutz's summation of a 3F2 hypergeometric...
Abstract We present a stand-alone simple proof of a probabilistic interpretation of the Gaussian bin...
AbstractIn 1954, M. Kac discovered a probabilistic interpretation of a theorem of G. Szegö of Toepli...
AbstractIn many real-life situations, we know the probability distribution of two random variables x...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
This short expository paper outlines applications of computer algebra to the implication problem of ...
We offer some summation formulas that appear to have great utility in probability theory. The proofs...
We present algorithms for computing the probability density function of the sum of two independent d...
We present algorithms for computing the probability density function of the sum of two independent d...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Computing the posterior distribution of a probabilistic program is a hard task for which no one-fit-...
AbstractUsing order statistics, we prove Gauss' 2F1 identity probabilistically. As a consequence, we...
AbstractA binomial coefficient identity equivalent to Saalschutz's summation of a 3F2 hypergeometric...
Abstract We present a stand-alone simple proof of a probabilistic interpretation of the Gaussian bin...
AbstractIn 1954, M. Kac discovered a probabilistic interpretation of a theorem of G. Szegö of Toepli...
AbstractIn many real-life situations, we know the probability distribution of two random variables x...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
This short expository paper outlines applications of computer algebra to the implication problem of ...
We offer some summation formulas that appear to have great utility in probability theory. The proofs...
We present algorithms for computing the probability density function of the sum of two independent d...
We present algorithms for computing the probability density function of the sum of two independent d...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Assuming that a probability measure on ℝd has finite moments of any order, its moments are completel...
Computing the posterior distribution of a probabilistic program is a hard task for which no one-fit-...
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