A Note on Simple Decomposition of Quadratic Forms over Linked Fields

Let F be a field of characteristic different from 2 and let φ be an anisotropic six-dimensional quadratic form over F. We study the last open cases in the problem of describing the quadratic forms ψ such that φ becomes isotropic over the function field F ψ .

Let N be the number of affine zeros of a pair of quadratic forms in n#1 variables defined over a finite field F O . We give upper and lower bounds for N and show that these bounds are optimal. One result states that if n#1510 and every quadratic form in the pencil has order at least three, then "N!q

## B as a modular constituent with non-zero multiplicity. This result suggests that we should investigate the decomposition modulo 2 of the irreducible characters in 1 G when G is a group of Lie type of odd characteristic and B see which real-valued irreducible Brauer characters occur as constitue

Suppose g > 2 is an odd integer. For real number X > 2, define S g ðX Þ the number of squarefree integers d4X with the class number of the real quadratic field Qð ffiffiffi d p Þ being divisible by g. By constructing the discriminants based on the work of Yamamoto, we prove that a lower bound S g ðX

Let Do0 be the fundamental discriminant of an imaginary quadratic field, and hðDÞ its class number. In this paper, we show that for any prime p > 3 and e ¼ À1; 0; or 1, ] ÀX oDo0 j hðDÞc0 ðmod pÞ and D p ¼ e 4 p ffiffiffiffi X p log X :

## Abstract We investigate stationarity of types over models in simple theories. In particular, we show that in simple theories with finite SU‐rank, any complete type over a model having Cantor‐Bendixson rank is stationary. (© 2008 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)