Knowls

Kevin Keating has contributed to these Knowls: $p$-adic family invariants, $p$-adic field family diagrams, Ambiguity of a family, Associated inertia, Base field of a family of $p$-adic field extensions, Data that varies within families, Degree of a local field extension, Eisenstein diagram, Families of extensions of local fields, Family labels, Field count, Galois mean slope, Heights of an extension, Herbrand function of a family, Herbrand invariant, Hidden slopes of an extension, Indices of inseparability, Inertia group, Invariants of the Galois closure, Jump set, Local field, Mass of a family, Means of an extension, Number of wild segments of a family, Packets in a family, Ramification index of an extension of $p$-adic fields, Ramification polygon, Ramification polygon diagram, Rams, Residual polynomials, Residue field degree of a local field, Roots of unity, Slope content of an extension of $p$-adic fields, Slopes, Subfamily of a family of $p$-adic fields, Swan slopes, Tame degree of a local field extension, The canonical tower of a local field, Top Artin slope for an extension of local fields, Top slope, Unramified degree of a local field, Unramified subfield, p-adic field label