St. Petersburg Mathematical Journal, 10. cilt,1-575. sayfalarAmerican Mathematical Society, 1999 |
Kitabın içinden
56 sonuçtan 1-3 arası sonuçlar
Sayfa 174
... convex polyhedron Q ( \ , μ ) and a convex polyhedral cone S ° ; these sets are defined as follows : Q ( A , μ ) = K ( \ , μ ) ^ K ( μ , λ ) , where K ( A , μ ) is the convex polyhedron with vertices ( 2.34 ) ( μ1 + Ak1 , Hp + λk2 , Hp ...
... convex polyhedron Q ( \ , μ ) and a convex polyhedral cone S ° ; these sets are defined as follows : Q ( A , μ ) = K ( \ , μ ) ^ K ( μ , λ ) , where K ( A , μ ) is the convex polyhedron with vertices ( 2.34 ) ( μ1 + Ak1 , Hp + λk2 , Hp ...
Sayfa 190
... convex polyhedral set ( 4.23 ) , and L. is the convex polyhedral set { x € Rm : x - 4 } . The localizing set Ĩ ( y , v ) admits the dual representation Ĩ ( 4,4 ) ( L ( 4 , 4 ) NL ( 4 , 4 ) ) + R , where L ( 4 , 4 ) is the convex ...
... convex polyhedral set ( 4.23 ) , and L. is the convex polyhedral set { x € Rm : x - 4 } . The localizing set Ĩ ( y , v ) admits the dual representation Ĩ ( 4,4 ) ( L ( 4 , 4 ) NL ( 4 , 4 ) ) + R , where L ( 4 , 4 ) is the convex ...
Sayfa 344
... convex set . Theorem 1.2 ( Dines ) . Let X be a real linear space , and let B1 ( · ) , B2 ( · ) : X → R be quadratic forms . The image of X under the mapping x → [ B1 ( x ) , B2 ( x ) ] € R2 is a convex set . ← Theorem 1.3 ( [ 27 ] ...
... convex set . Theorem 1.2 ( Dines ) . Let X be a real linear space , and let B1 ( · ) , B2 ( · ) : X → R be quadratic forms . The image of X under the mapping x → [ B1 ( x ) , B2 ( x ) ] € R2 is a convex set . ← Theorem 1.3 ( [ 27 ] ...
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A₁ Abelian group anisotropic arbitrary assume asymptotic boundary bounded C*-algebra coefficients compact condition cone conformal map consider constant construction convex Corollary corresponding decompositions defined definition denote dimension domain eigenvalues elements endomorphism English transl entire functions equation equivalent estimate exists exponential type F-algebra field finite formula geodesic Hadamard space harmonic measure Hence Hilbert space homomorphism homotopy II(m implies inequality integral isomorphism isotropic J-unitary k₁ Lemma linear Math Mathematical Mathematics Subject Classification matrices minimum-link module morphism multidegree obtain operator algebra operator space parameters Pfister form Pfister neighbor polynomial problem proof of Theorem properties Proposition proved quadratic form relation representation result satisfies segment sequence solution spectrum strongly stable subgroup Subsection subspace Theorem Theorem 2.1 theory topology unital homomorphism v₁ vector whence