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Appendix C Notation

The following table defines the notation used in this book. Page numbers or references refer to the first appearance of each symbol.

Symbol Description Location
\(a \in A\) \(a\) is in the set \(A\) Paragraph
\({\mathbb N}\) the natural numbers Paragraph
\({\mathbb Z}\) the integers Paragraph
\({\mathbb Q}\) the rational numbers Paragraph
\({\mathbb R}\) the real numbers Paragraph
\({\mathbb C}\) the complex numbers Paragraph
\(A \subset B\) \(A\) is a subset of \(B\) Paragraph
\(\emptyset\) the empty set Paragraph
\(A \cup B\) the union of sets \(A\) and \(B\) Paragraph
\(A \cap B\) the intersection of sets \(A\) and \(B\) Paragraph
\(A'\) complement of the set \(A\) Paragraph
\(A \setminus B\) difference between sets \(A\) and \(B\) Paragraph
\(A \times B\) Cartesian product of sets \(A\) and \(B\) Paragraph
\(A^n\) \(A \times \cdots \times A\) (\(n\) times) Paragraph
\(id\) identity mapping Paragraph
\(f^{-1}\) inverse of the function \(f\) Paragraph
\(a \equiv b \pmod{n}\) \(a\) is congruent to \(b\) modulo \(n\) Example 1.30
\(n!\) \(n\) factorial Example 1.34
\(\binom{n}{k}\) binomial coefficient \(n!/(k!(n-k)!)\) Example 1.34
\(\mathcal P(X)\) power set of \(X\) Exercise 1.5.37
\(\mathbb Z_n\) the integers modulo \(n\) Paragraph
\(U(n)\) group of units in \(\mathbb Z_n\) Example 2.11
\(\mathbb M_n(\mathbb R)\) the \(n \times n\) matrices with entries in \(\mathbb R\) Example 2.14
\(\det A\) the determinant of \(A\) Example 2.14
\(GL_n(\mathbb R)\) the general linear group Example 2.14
\(Q_8\) the group of quaternions Example 2.15
\(\mathbb C^*\) the multiplicative group of complex numbers Example 2.16
\(|G|\) the order of a group Paragraph
\(\mathbb R^*\) the multiplicative group of real numbers Example 2.24
\(\mathbb Q^*\) the multiplicative group of rational numbers Example 2.24
\(SL_n(\mathbb R)\) the special linear group Example 2.26
\(\langle a \rangle\) cyclic group generated by \(a\) Theorem 2.34
\(|a|\) the order of an element \(a\) Paragraph
\(S_n\) the symmetric group on \(n\) letters Paragraph
\((a_1, a_2, \ldots, a_k )\) cycle of length \(k\) Paragraph
\(A_n\) the alternating group on \(n\) letters Paragraph
\(D_n\) the dihedral group Paragraph
\(Z(G)\) the center of a group Exercise 2.7.42
\([G:H]\) index of a subgroup \(H\) in a group \(G\) Paragraph
\(\mathcal L_H\) the set of left cosets of a subgroup \(H\) in a group \(G\) Theorem 3.8
\(\mathcal R_H\) the set of right cosets of a subgroup \(H\) in a group \(G\) Theorem 3.8
\(G/N\) factor group of \(G\) mod \(N\) Paragraph
\(G'\) commutator subgroup of \(G\) Exercise 3.3.31
\(G \cong H\) \(G\) is isomorphic to a group \(H\) Paragraph
\(\ker \phi\) kernel of \(\phi\) Paragraph
\(\aut(G)\) automorphism group of a group \(G\) Exercise 4.4.37
\(i_g\) \(i_g(x) = gxg^{-1}\) Exercise 4.4.41
\(\inn(G)\) inner automorphism group of a group \(G\) Exercise 4.4.41
\(\rho_g\) right regular representation Exercise 4.4.44
\(\mathbb H\) the ring of quaternions Example 5.7
\(\mathbb Z[i]\) the Gaussian integers Example 5.12
\(\chr R\) characteristic of a ring \(R\) Paragraph
\(\mathbb Z_{(p)}\) ring of integers localized at \(p\) Exercise 5.6.33
\(a \mid b\) \(a\) divides \(b\) Paragraph
\(\gcd(a, b)\) greatest common divisor of \(a\) and \(b\) Paragraph
\(\lcm(m,n)\) the least common multiple of \(m\) and \(n\) Exercise 6.1.5.8
\(\deg f(x)\) degree of a polynomial Paragraph
\(R[x]\) ring of polynomials over a ring \(R\) Paragraph
\(R[x_1, x_2, \ldots, x_n]\) ring of polynomials in \(n\) indeterminants Paragraph
\(\phi_\alpha\) evaluation homomorphism at \(\alpha\) Theorem 6.12
\(\cis \theta\) \(\cos \theta + i \sin \theta\) Paragraph
\(\mathbb T\) the circle group Paragraphs
\(\mathbb Q(x)\) field of rational functions over \(\mathbb Q\) Example 7.5
\(\nu(a)\) Euclidean valuation of \(a\) Paragraph
\(F(x)\) field of rational functions in \(x\) Item 7.4.7.a
\(F(x_1, \dots, x_n)\) field of rational functions in \(x_1, \ldots, x_n\) Item 7.4.7.b
\(F( \alpha_1, \ldots, \alpha_n)\) smallest field containing \(F\) and \(\alpha_1, \ldots, \alpha_n\) Paragraph
\(\dim V\) dimension of a vector space \(V\) Paragraph
\([E:F]\) dimension of a field extension of \(E\) over \(F\) Paragraph
\(G(E/F)\) Galois group of \(E\) over \(F\) Paragraph
\(F_{\{\sigma_i \}}\) field fixed by the automorphism \(\sigma_i\) Proposition 9.19
\(F_G\) field fixed by the automorphism group \(G\) Corollary 9.20
\(G \cong H\) \(G\) is isomorphic to a group \(H\) Paragraph
\(S_n\) the symmetric group on \(n\) letters Paragraph
\((a_1, a_2, \ldots, a_k )\) cycle of length \(k\) Paragraph
\(A_n\) the alternating group on \(n\) letters Paragraph
\(\langle a \rangle\) cyclic group generated by \(a\) Theorem 11.3
\(|a|\) the order of an element \(a\) Paragraph
\(a \notdivide b\) \(a\) does not divide \(b\) Theorem 11.26
\({\mathcal O}_x\) orbit of \(x\) Paragraph
\(X_g\) fixed point set of \(g\) Paragraph
\(G_x\) isotropy subgroup of \(x\) Paragraph
\(N(H)\) normalizer of s subgroup \(H\) Paragraph
\((a_{ij})\) matrix Paragraph
\(O(n)\) orthogonal group Paragraph
\(\| {\mathbf x} \|\) length of a vector \(\mathbf x\) Paragraph
\(SO(n)\) special orthogonal group Paragraph
\(E(n)\) Euclidean group Paragraph
\(d(\mathbf x, \mathbf y)\) Hamming distance between \(\mathbf x\) and \(\mathbf y\) Paragraph
\(d_{\min}\) the minimum distance of a code Paragraph
\(w(\mathbf x)\) the weight of \(\mathbf x\) Paragraph
\(\mathbb M_{m \times n}(\mathbf Z_2)\) the set of \(m \times n\) matrices with entries in \(\mathbb Z_2\) Paragraph
\(\Null(H)\) null space of a matrix \(H\) Paragraph
\(\delta_{ij}\) Kronecker delta Lemma 16.27
\(\gf(p^n)\) Galois field of order \(p^n\) Paragraph
\(F^*\) multiplicative group of a field \(F\) Paragraph
\(a \preceq b\) \(a\) is less than \(b\) Paragraph
\(a \vee b\) join of \(a\) and \(b\) Paragraph
\(a \wedge b\) meet of \(a\) and \(b\) Paragraph
\(I\) largest element in a lattice Paragraph
\(O\) smallest element in a lattice Paragraph
\(a'\) complement of \(a\) in a lattice Paragraph