Bounding the number of stable homotopy types of a parametrized family of semi-algebraic sets defined by quadratic inequalities期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

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Bounding the number of stable homotopy types of a parametrized family of semi-algebraic sets defined by quadratic inequalities

Authors:	Basu Saugata; Kettner Michael

Institution:	School of Mathematics Georgia Institute of Technology Atlanta, GA 30332 USA mkettner@math.gatech.edu

Abstract:	We prove a nearly optimal bound on the number of stable homotopytypes occurring in a k-parameter semi-algebraic family of setsin R, each defined in terms of m quadratic inequalities. Ourbound is exponential in k and m, but polynomial in ${ell}$ . More precisely,we prove the following. Let R be a real closed field and let $P$ = {P₁, ... , P_m} $sub$ RY₁, ... ,Y,X₁, ... ,X_k], with deg_Y(P_i) $≤$ 2, deg_X(P_i) $≤$ d, 1 $≤$ i $≤$ m. Let S $sub$ R^+k be a semi-algebraic set,defined by a Boolean formula without negations, with atoms ofthe form P $≥$ 0, P $≤$ 0, P $isin$ $P$ . Let ${pi}$ : R^+k $->$ R^k be the projection onthe last k coordinates. Then the number of stable homotopy typesamongst the fibers S_x = ${pi}$ ^–1(x) ${cap}$ S is bounded by (2^m ${ell}$ kd)^O(mk).

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