Ron P's user avatar
Ron P's user avatar
Ron P's user avatar
Ron P
  • Member for 7 years
  • Last seen more than a week ago
7 votes
Accepted

What are the odds of a tie in a random election with k candidates?

6 votes

A probabilistic angle inequality

4 votes
Accepted

Chernoff-style concentration inequality for k-tuples

3 votes
Accepted

Prove that the following running average is monotonically decreasing

3 votes

Convex combination iid Bernoulli random variables

2 votes

Relationship between the core of the quotient game of a convex game G and the projection of the core of G onto the a priori coalitions?

2 votes
Accepted

The mean value of the reconstruction complexity of a random sequence

2 votes

A bound on the number of bilinear functions needed in order to obtain the minmax

2 votes
Accepted

Independent sampling of dependent random variables

2 votes

A question about asymptotic affinity and strict convexity with unbounded means

1 vote

If a joint density factorizes on a square, does this imply that the marginal random variables are locally independent?

1 vote

Correlation between the first and a random position of an ergodic bit sequence

0 votes
Accepted

Correlation between the first and a random position of an ergodic bit sequence

0 votes

In which cases $E(e^{t S_n S_m})$ converges to $E(e^{t X Y})$

0 votes

For a continuous function $f:\mathbb{R}^{+}\to\mathbb{R}^{+}$ does $(f(x)-f(y)) (f(\frac{x+y}{2}) - f(\sqrt{xy}))=0$ imply that $f$ is constant?

-1 votes

For a continuous function $f:\mathbb{R}^{+}\to\mathbb{R}^{+}$ does $(f(x)-f(y)) (f(\frac{x+y}{2}) - f(\sqrt{xy}))=0$ imply that $f$ is constant?