比利时vs摩洛哥足彩
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university of california san diego
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math 211 - group actions seminar
prasuna bandi
tata institute of fundamental research
density at integer points of an inhomogeneous quadratic form and linear form
abstract:
in 1987, margulis solved an old conjecture of oppenheim which states that for a nondegenerate, indefinite and irrational quadratic form $q$ in $n \geq 3$ variables, $q(\mathbb{z}^n)$ is dense in $\mathbb{r}$. following this, dani and margulis proved the simultaneous density at integer points for a pair consisting of quadratic and linear form in $3$ variables when certain conditions are satisfied. we prove an analogue of this for the case of an inhomogeneous quadratic form and a linear form. \\ \\ this is based on joint work with anish ghosh.
host: brandon seward
april 27, 2021
10:00 am
zoom id 967 4109 3409 (email nattalie tamam or brandon seward for the password)
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