Universal quadratic zero forms in four variables

Sparks, Fred Winchell,

January 1933

Thesis (Ph. D.)--University of Chicago, 1931. / Vita. Lithoprinted. "Private edition distributed by the University of Chicago libraries, Chicago, Illinois."

Forms, Quadratic.

Zur theorie der quadratischen formen ...

Beinhorn, Johannes Dietrich Hermann,

January 1900

Inaug.-dis.--Marburg. / Lebenslauf.

Forms, Quadratic.

Über die Darstellung von positiven, ganzen Zahlen durch die primitiven, binären quadratischen Formen einer nicht quadratischen Discriminante

Bernays, Paul,

January 1912

Inaug.-diss.--Göttingen. / Vita.

Forms, Quadratic.

Die Theorie der binären quadratischen Formen mit Koeffizienten und Unbestimmten in einem beliebigen Zahlkörper

Speiser, Andreas,

January 1909

Inaug.-diss.--Georg-August-Universität. / Lebenslauf. Bibliographical foot-notes.

Forms, Quadratic.

The integers represented by sets of positive ternary quadratic non-classic forms

Sagen, Oswald Karl,

January 1936

Thesis (Ph. D.)--University of Chicago, 1934. / Vita. Lithoprinted. "Private edition distributed by the University of Chicago libraries, Chicago, Illinois."

Forms, Quadratic.

Positive Formen der Gestalt ax²by²cz²dt²mit zwei und drei Ausnahmewerten

Wolf, Adolf,

January 1963

Inaug.-Diss.-Tübingen. / Vita. Includes bibliographical references.

Forms, Quadratic.

Contribution a l'étude des formes quadratiques a indéterminées conjuguées

Le Corbeiller, Ph.

January 1926

Thèse--Université de Paris.

Forms, Quadratic.

Ternäre positiv definite quadratische Formen mit gleichen Darstellungszahlen

Schiemann, Alexander.

January 1994

Thesis (doctoral)--Universität Bonn, 1993. / Includes bibliographical references (p. 41).

Forms, Quadratic.

The Canonical types of nets of modular conics ...

Wilson, Albert Harris,

January 1900

Thesis (Ph. D.)--University of Chicago, 1911. / Life. "Reprinted from American Journal of mathematics, vol. XXXVI, no. 2, April, 1914." Includes bibliographical references.

Forms, Quadratic.

Maximum and minimum problems in functions of quadratic forms

Westwick, Roy

January 1957

Let A be an n x n hermitian matrix, let E₂(a₁, …, a_k) be the second elementary symmetric function of the letters a₁, …, a_k and let C₂(A) be the second compound matrix of A. In this thesis the maximum and minimum of det {(Ax_█, x_j)} and E₂ [(Ax₁, x₁), …, (Ax_█(k@), x_k)] the minimum of [formula omitted] (C₂(A)x_i ₁⋀x_i₂ , x_i₁ ⋀ax_i₂) are calculated. The maxima and minima are taken over all sets of k orthonormal vectors in unitary n-space and x_█(i@)₁ ⋀ x_i ₂ designates the Grassman exterior product. These results depend on the inequality E₂(a₁, …, a_k ) ≤ (k/2 ) [formula omitted] which is here established for arbitrary real numbers, and on the minimum of E₂ (x₁, …, x_(k)) where the minimum is taken over all values of x₁, …, x_█(k@) such that ∑_(i=1)^k▒xi = ∑_(i=1)^k▒〖∝i〗 and ∑_(i=1)^q▒xsi ≤ ∑_(i=1)^q▒〖∝i〗 for all sets of q distinct integers s₁, …, s_q taken from 1, …, k. Here α₁ ≥ … ≥ ∝_k. / Science, Faculty of / Mathematics, Department of / Graduate

Forms, Quadratic