Limit distributions of orbits of unipotent flows and values of quadratic forms

@inproceedings{Dani1993LimitDO,
  title={Limit distributions of orbits of unipotent flows and values of quadratic forms},
  author={S. G. Dani and G. A. Margulis},
  year={1993}
}
DYNAMICS FOR DISCRETE SUBGROUPS OF SL2(C)
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [30]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
DYNAMICS FOR DISCRETE SUBGROUPS OF SL2(C)
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [30]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
DYNAMICS FOR DISCRETE SUBGROUPS OF SL 2 ( C )
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [30]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
DYNAMICS FOR DISCRETE SUBGROUPS OF SL 2 ( C )
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [30]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
Dynamics for discrete subgroups of $\operatorname{SL}_2(\mathbb C)$
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups that "A number of important topics have been omitted. The most significant of these is the theory of Kleinian
DYNAMICS FOR DISCRETE SUBGROUPS OF SL 2 ( C )
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [29]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
DYNAMICS FOR DISCRETE SUBGROUPS OF SL2(C)
Margulis wrote in the preface of his book Discrete subgroups of semisimple Lie groups [27]: “A number of important topics have been omitted. The most significant of these is the theory of Kleinian
Asymptotic distribution of values of isotropic quadratic forms at $S$-integral points
We prove an analogue of a theorem of Eskin-Margulis-Mozes: suppose we are given a finite set of places $S$ over $\mathbb{Q}$ containing the archimedean place and excluding the prime $2$, an
Asymptotic distribution for pairs of linear and quadratic forms at integral vectors
We study the joint distribution of values of a pair consisting of a quadratic form q and a linear form l over the set of integral vectors, a problem initiated by Dani-Margulis [10]. In the spirit of
Equidistribution of higher dimensional polynomial trajectories on homogeneous spaces
We study the limit distribution of $k$-dimensional polynomial trajectories on homogeneous spaces, where $k\geq 2$. When the averaging is taken on certain expanding boxes on $\mathbb{R}^k$ and assume
...
...