Add to ORKGA combinatorial proof of the Gaussian product inequality (GPI) is given under the assumption that each component of a centered Gaussian random vector $\boldsymbol{X} = (X_1, \ldots, X_d)$ of arbitrary length can be written as a linear combination, with coefficients of identical sign, of the components of a standard Gaussian random vector. This condition on $\boldsymbol{X}$ is shown to be strictly weaker than the assumption that the density of the random vector $(|X_1|, \ldots, |X_d|)$ is multivariate totally positive of order $2$, abbreviated MTP${}_2$, for which the GPI is already known to hold. Under this condition, the paper highlights a new link between the GPI and the monotonicity of a certain ratio of gamma functions.Comment: 9 pages,...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
AbstractConsider the number of cycles in a random permutation or a derangement, the number of compon...
The classical Gaussian concentration inequality for Lipschitz functions is adapted to a setting wher...
The Gaussian product inequality is a long-standing conjecture. In this paper, we investigate the thr...
We prove the three-dimensional Gaussian product inequality (GPI) $E[X_1^{2}X_2^{2m_2}X_3^{2m_3}]\ge ...
This note reports partial results related to the Gaussian product inequality (GPI) conjecture for th...
Abstract. Slepian and Sudakov-Fernique type inequalities, which com-pare expectations of maxima of G...
The Gaussian inequality is proven for multicomponent rotators with negative correlations between two...
In the paper, the authors introduce a matrix-parametrized generalization of the multinomial probabil...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
Exact upper and lower bounds on the ratio $\mathsf{E}w(\mathbf{X}-\mathbf{v})/\mathsf{E}w(\mathbf{X}...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
AbstractConsider the number of cycles in a random permutation or a derangement, the number of compon...
The classical Gaussian concentration inequality for Lipschitz functions is adapted to a setting wher...
The Gaussian product inequality is a long-standing conjecture. In this paper, we investigate the thr...
We prove the three-dimensional Gaussian product inequality (GPI) $E[X_1^{2}X_2^{2m_2}X_3^{2m_3}]\ge ...
This note reports partial results related to the Gaussian product inequality (GPI) conjecture for th...
Abstract. Slepian and Sudakov-Fernique type inequalities, which com-pare expectations of maxima of G...
The Gaussian inequality is proven for multicomponent rotators with negative correlations between two...
In the paper, the authors introduce a matrix-parametrized generalization of the multinomial probabil...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
Exact upper and lower bounds on the ratio $\mathsf{E}w(\mathbf{X}-\mathbf{v})/\mathsf{E}w(\mathbf{X}...
An important connection between the finite dimensional Gaussian Wick products and Lebesgue convolut...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
AbstractConsider the number of cycles in a random permutation or a derangement, the number of compon...
The classical Gaussian concentration inequality for Lipschitz functions is adapted to a setting wher...