About the Book
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 147. Chapters: Mathematical axioms, Mathematical objects, Mathematical principles, Mathematical structures, Vector space, Group, Metric space, Topology, Set, Ring, Number, Fractal, Peano axioms, Probability axioms, Monoid, Measure, Algebraic structure, Pigeonhole principle, Plane, Hausdorff maximal principle, Well-ordering principle, Lattice, Uniform boundedness principle, Mereology, Building, Principle of maximum entropy, Relation algebra, Inclusion-exclusion principle, Tarski's axioms, Predicate functor logic, Module, Transfer principle, Line, Maupertuis' principle, Mereotopology, Whitehead's point-free geometry, Biordered set, Huzita-Hatori axioms, Axiomatic system, Homotopy principle, Gluing axiom, Periodic matrix set, Reflection principle, Cavalieri's principle, Hasse principle, Duhamel's principle, Superslow process, Hume's principle, Combinatorial principles, Tarski's axiomatization of the reals, Markov's principle, Maximum modulus principle, Maximum principle, Eilenberg-Steenrod axioms, Phragmen-Lindelof principle, Blum axioms, Degeneracy, Racetrack principle, Weakly o-minimal structure, Least upper bound axiom, Ekeland's variational principle, Littlewood's three principles of real analysis, Kuratowski closure axioms, Axiom schema, Splitting principle, Natural topology, Laplace principle, Hopf maximum principle, Contraction principle, List of axioms, Courant minimax principle, Cut locus, Tilted large deviation principle, Dirichlet's principle, Schwarz reflection principle, Vop nka's principle, Prosolvable group, Ideal ring bundle, Axiom of countability, Teakettle principle, Null, Cantor-Dedekind axiom, Axiom S5, Invertible module, Harnack's principle, Argand system, Higraph, Bernstein set, Condensation point, Radial line. Excerpt: A vector space is a mathematical structure formed by a collection of vectors: objects that m...
