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"Assante Wealth Management was founded in 1995 in Winnipeg, Manitoba by Marty Weinberg and has managed the assets of several celebrities including Toronto Blue Jay Shawn Green. Marty's father was an actuary for the Great-West Lifeco. It is one of the largest wealth management firms in Canada and has 830 professional advisors one of which is former NHL player Byron Briske. Winnipeg Free Press, Show him the money - $846-M! https://www.winnipegfreepress.com/historic/31385004.html History Assante acquired Steinberg, Moorad & Dunn for $120 million in 1999. At that time, the company was managed by Leigh Steinberg. Leigh is the sports agent the lead character of the 1996 movie Jerry Maguire is based. Winnipeg Free Press, Show him the money - $846-M! https://www.winnipegfreepress.com/historic/31385004.html Assante was purchased by CI Financial in 2003 for $846 Million and spun off its U.S. arm called Loring Ward International Ltd. It also has partnered with Sierra Systems in 2002 and WealthBar in 2019. References Category:Canadian companies established in 1995 Category:Companies based in Winnipeg Category:1995 establishments in Manitoba Category:Asset management associations "
"Daniel Malescha (born April 28, 1994 in Munich) is a German volleyball player, a member of the club United Volleys Frankfurt.United Volleys holen Nationalspieler Malescha – http://www.hessenschau.de – 10-07-2020 Sporting achievements = Clubs German Cup: * 16px 2016, 2017, 2018 German SuperCup: * 16px 2017, 2018, 2019 Deutsche Championship: * 16px 2017, 2018, 2019 ReferencesExternal links *VFB-Volleyball profile *Volleyball- Verband profile *Volleyball.World profile *Volleybox profile *CEV profile Category:1994 births Category:Living people Category:German men's volleyball players "
"Toshiki Mabuchi (kanji: 満渕俊樹, hiragana: マブチ トシキ, Mabuchi Toshiki, born in 1950) is a Japanese mathematician, specializing in complex differential geometry and algebraic geometry. In 2006 in Madrid he was an invited speaker at the International Congress of Mathematicians. (published in vol. 2 of the Proceedings of the ICM, Madrid 2006, pages 813–826) Education and career In 1972 Mabuchi graduated from the University of Tokyo Faculty of Science and became a graduate student in mathematics at the University of California, Berkeley. (translated form the original Japanese by Hisashi Kobayashi) There he graduated with a Ph.D. in 1977 with thesis C3-Actions and Algebraic Threefolds with Ample Tangent Bundle and advisor Shoshichi Kobayashi As a postdoc Mabuchi was from 1977 to 1978 a guest researcher at the University of Bonn. Since 1978 he is a faculty member of the Department of Mathematics of Osaka University. His research deals with complex differential geometry, extremal Kähler metrics, stability of algebraic varieties, and the Hitchin–Kobayashi correspondence. In 2006 Toshiki Mabuchi and Takashi Shioya received the Geometry Prize of the Mathematical Society of Japan. Research contributions Mabuchi is well-known for his introduction, in 1986, of the Mabuchi energy, which gives a variational interpretation to the problem of Kähler metrics of constant scalar curvature. In particular, the Mabuchi energy is a real-valued function on a Kähler class whose Euler-Lagrange equation is the constant scalar curvature equation. In the case that the Kähler class represents the first Chern class of the complex manifold, one has a relation to the Kähler-Einstein problem, due to the fact that constant scalar curvature metrics in such a Kähler class must be Kähler-Einstein. Owing to the second variation formulas for the Mabuchi energy, every critical point is stable. Furthermore, if one integrates a holomorphic vector field and pulls back a given Kähler metric by the corresponding one-parameter family of diffeomorphisms, then the corresponding restriction of the Mabuchi energy is a linear function of one real variable; its derivative is the Futaki invariant discovered a few years earlier by Akito Futaki.A. Futaki. An obstruction to the existence of Einstein Kähler metrics. Invent. Math. 73 (1983), no. 3, 437–443. The Futaki invariant and Mabuchi energy are fundamental in understanding obstructions to the existence of Kähler metrics which are Einstein or which have constant scalar curvature. A year later, by use of the -lemma, Mabuchi considered a natural Riemannian metric on a Kähler class, which allowed him to define length, geodesics, and curvature; the sectional curvature of Mabuchi's metric is nonpositive. Along geodesics in the Kähler class, the Mabuchi energy is convex. So the Mabuchi energy has strong variational properties. Selected publications=Articles Books * * References Category:Differential geometers Category:University of Tokyo alumni Category:University of California, Berkeley alumni Category:Osaka University faculty Category:1950 births Category:Living people Category:20th-century Japanese mathematicians Category:21st-century Japanese mathematicians "