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There are two varieties of Special K Cereal Bars: Red Berries, and Chocolatey Pretzel. [15] There are five varieties of Special K Cracker Chips: Sea Salt, Cheddar, Sour Cream & Onion, Barbecue, and Salt & Vinegar. [16] There are two varieties of Special K Popcorn: Kettle Corn and White Cheddar. [17]
In mathematics, and in particular algebraic geometry, K-stability is an algebro-geometric stability condition for projective algebraic varieties and complex manifolds.K-stability is of particular importance for the case of Fano varieties, where it is the correct stability condition to allow the formation of moduli spaces, and where it precisely characterises the existence of Kähler–Einstein ...
In mathematics, and especially differential and algebraic geometry, K-stability is an algebro-geometric stability condition, for complex manifolds and complex algebraic varieties. The notion of K-stability was first introduced by Gang Tian [1] and reformulated more algebraically later by Simon Donaldson. [2]
This is a list of breakfast cereals. Many cereals are trademarked brands of large companies, such as Kellanova, WK Kellogg Co, General Mills, Malt-O-Meal, Nestlé, Quaker Oats and Post Consumer Brands, but similar equivalent products are often sold by other manufacturers and as store brands. This is a dynamic list and may never be able to satisfy particular standards for completeness. You can ...
By contrast, not every smooth Fano variety has a Kähler–Einstein metric (which would have constant positive Ricci curvature). However, Xiuxiong Chen, Simon Donaldson, and Song Sun proved the Yau–Tian–Donaldson conjecture: a smooth Fano variety has a Kähler–Einstein metric if and only if it is K-stable, a purely algebro-geometric ...
Some of the public health websites that the US government was ordered to restore involving gender and gender identity now carry a warning denying the existence of transgender people.
As was discovered by Beauville, [6] the Hilbert scheme of k points on a compact hyperkähler 4-manifold is a hyperkähler manifold of dimension 4k. This gives rise to two series of compact examples: Hilbert schemes of points on a K3 surface and generalized Kummer varieties.
However, many of its basic theorems carried the hypothesis that the ring or variety in question was regular. One of the basic expected relations was a long exact sequence (called the "localization sequence") relating the K-theory of a variety X and an open subset U. Quillen was unable to prove the existence of the localization sequence in full ...