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The description for this book, K-Theory of Forms. (AM-98), Volume 98, will be forthcoming.
Category theory. Homological algebra --- 515.14 --- Algebraic topology --- 515.14 Algebraic topology --- Forms (Mathematics) --- K-theory --- Modules (Algebra) --- Finite number systems --- Modular systems (Algebra) --- Algebra --- Finite groups --- Rings (Algebra) --- Homology theory --- Quantics --- Mathematics --- K-theory. --- Abelian group. --- Addition. --- Algebraic K-theory. --- Algebraic topology. --- Approximation. --- Arithmetic. --- Canonical map. --- Coefficient. --- Cokernel. --- Computation. --- Coprime integers. --- Coset. --- Direct limit. --- Direct product. --- Division ring. --- Elementary matrix. --- Exact sequence. --- Finite group. --- Finite ring. --- Free module. --- Functor. --- General linear group. --- Global field. --- Group homomorphism. --- Group ring. --- Homology (mathematics). --- Integer. --- Invertible matrix. --- Isomorphism class. --- Linear map. --- Local field. --- Matrix group. --- Maxima and minima. --- Mayer–Vietoris sequence. --- Module (mathematics). --- Monoid. --- Morphism. --- Natural transformation. --- Normal subgroup. --- P-group. --- Parameter. --- Power of two. --- Product category. --- Projective module. --- Quadratic form. --- Requirement. --- Ring of integers. --- Semisimple algebra. --- Sesquilinear form. --- Special case. --- Steinberg group (K-theory). --- Steinberg group. --- Subcategory. --- Subgroup. --- Subspace topology. --- Surjective function. --- Theorem. --- Theory. --- Topological group. --- Topological ring. --- Topology. --- Torsion subgroup. --- Triviality (mathematics). --- Unification (computer science). --- Unitary group. --- Witt group. --- K-théorie
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A new group of contributions to the development of this theory by leading experts in the field. The contributors include L. D. Berkovitz, L. E. Dubins, H. Everett, W. H. Fleming, D. Gale, D. Gillette, S. Karlin, J. G. Kemeny, R. Restrepo, H. E. Scarf, M. Sion, G. L. Thompson, P. Wolfe, and others.
Game theory. --- Almost surely. --- American Mathematical Society. --- Axiom of choice. --- Bayes estimator. --- Big O notation. --- Binomial coefficient. --- Binomial theorem. --- Boundary value problem. --- C0. --- Calculation. --- Cartesian product. --- Characteristic function (probability theory). --- Coefficient. --- Complete metric space. --- Composition series. --- Continuous function (set theory). --- Continuous game. --- Counterexample. --- Decision problem. --- Decision theory. --- Determinacy. --- Diagram (category theory). --- Differential equation. --- Differential game. --- Distribution function. --- Elementary matrix. --- Equation. --- Existence theorem. --- Expected utility hypothesis. --- Extended real number line. --- Family of sets. --- Finitary. --- Function (mathematics). --- Functional equation. --- Fundamenta Mathematicae. --- Fundamental theorem. --- Inequality (mathematics). --- Infimum and supremum. --- Integral equation. --- Interval (mathematics). --- Joint probability distribution. --- Kakutani fixed-point theorem. --- Kakutani's theorem. --- Laplace's equation. --- Lipschitz continuity. --- Loss function. --- Markov chain. --- Martingale (probability theory). --- Mathematical analysis. --- Mathematical induction. --- Mathematical optimization. --- Mathematics. --- Maxima and minima. --- Measure (mathematics). --- Metric space. --- Monotonic function. --- N-vector. --- Ordinal number. --- Outcome (probability). --- Parametric statistics. --- Parity (mathematics). --- Partial differential equation. --- Polynomial. --- Preference (economics). --- Probability distribution. --- Probability measure. --- Probability theory. --- Probability. --- Product topology. --- Proportionality (mathematics). --- Randomization. --- Rate of convergence. --- Real projective plane. --- Recurrence relation. --- Recursive set. --- Recursively enumerable set. --- Reductio ad absurdum. --- Restriction (mathematics). --- Scientific notation. --- Series (mathematics). --- Set (mathematics). --- Sigma-algebra. --- Sign (mathematics). --- Solution set. --- Special case. --- Stochastic game. --- Stochastic process. --- Stochastic. --- Strategy (game theory). --- Subharmonic function. --- Summation. --- Theorem. --- Topological game. --- Topological space. --- Topology. --- Transfinite induction. --- Turing machine. --- Utility. --- Variable (mathematics). --- Zorn's lemma.
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Algebraic K-theory describes a branch of algebra that centers about two functors. K0 and K1, which assign to each associative ring ∧ an abelian group K0∧ or K1∧ respectively. Professor Milnor sets out, in the present work, to define and study an analogous functor K2, also from associative rings to abelian groups. Just as functors K0 and K1 are important to geometric topologists, K2 is now considered to have similar topological applications. The exposition includes, besides K-theory, a considerable amount of related arithmetic.
Algebraic geometry --- Ordered algebraic structures --- Associative rings --- Abelian groups --- Functor theory --- Anneaux associatifs --- Groupes abéliens --- Foncteurs, Théorie des --- 512.73 --- 515.14 --- Functorial representation --- Algebra, Homological --- Categories (Mathematics) --- Functional analysis --- Transformations (Mathematics) --- Commutative groups --- Group theory --- Rings (Algebra) --- Cohomology theory of algebraic varieties and schemes --- Algebraic topology --- Abelian groups. --- Associative rings. --- Functor theory. --- 515.14 Algebraic topology --- 512.73 Cohomology theory of algebraic varieties and schemes --- Groupes abéliens --- Foncteurs, Théorie des --- Abelian group. --- Absolute value. --- Addition. --- Algebraic K-theory. --- Algebraic equation. --- Algebraic integer. --- Banach algebra. --- Basis (linear algebra). --- Big O notation. --- Circle group. --- Coefficient. --- Commutative property. --- Commutative ring. --- Commutator. --- Complex number. --- Computation. --- Congruence subgroup. --- Coprime integers. --- Cyclic group. --- Dedekind domain. --- Direct limit. --- Direct proof. --- Direct sum. --- Discrete valuation. --- Division algebra. --- Division ring. --- Elementary matrix. --- Elliptic function. --- Exact sequence. --- Existential quantification. --- Exterior algebra. --- Factorization. --- Finite group. --- Free abelian group. --- Function (mathematics). --- Fundamental group. --- Galois extension. --- Galois group. --- General linear group. --- Group extension. --- Hausdorff space. --- Homological algebra. --- Homomorphism. --- Homotopy. --- Ideal (ring theory). --- Ideal class group. --- Identity element. --- Identity matrix. --- Integral domain. --- Invertible matrix. --- Isomorphism class. --- K-theory. --- Kummer theory. --- Lattice (group). --- Left inverse. --- Local field. --- Local ring. --- Mathematics. --- Matsumoto's theorem. --- Maximal ideal. --- Meromorphic function. --- Monomial. --- Natural number. --- Noetherian. --- Normal subgroup. --- Number theory. --- Open set. --- Picard group. --- Polynomial. --- Prime element. --- Prime ideal. --- Projective module. --- Quadratic form. --- Quaternion. --- Quotient ring. --- Rational number. --- Real number. --- Right inverse. --- Ring of integers. --- Root of unity. --- Schur multiplier. --- Scientific notation. --- Simple algebra. --- Special case. --- Special linear group. --- Subgroup. --- Summation. --- Surjective function. --- Tensor product. --- Theorem. --- Topological K-theory. --- Topological group. --- Topological space. --- Topology. --- Torsion group. --- Variable (mathematics). --- Vector space. --- Wedderburn's theorem. --- Weierstrass function. --- Whitehead torsion. --- K-théorie
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